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w i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 0 7 9 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . A = V o l t a g e s u p p l y , s t a r t i n g s y s t e m . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e A = O n - b o a r d c o m p u t e r v o l t a g e s u p p l y / B = E B S v o l t a g e s u p p l y / C = V e h i c l e m a n a g e m e n t c o m p u t e r v o l t a g e s u p p l y . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e A = C h a s s i s e a r t h d i s t r i b u t o r . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e A = O n - b o a r d d i a g n o s i s ( O B D ) d i a g n o s i s s o c k e t / B = Z D R i n t e r f a c e ( F F R ) ( M D B , H G B ) . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e A = F l a m e s t a r t s y s t e m / B = F a n c l u t c h / C = E D C c o o l a n t t e m p e r a t u r e / D = C o o l a n t l e v e l / E = A i r  l t e r p r e s s u r e s e n s o r / F = P o w e r s t e e r i n g o i l l e v e .l . . . . s h e A = P r o b e f o r c l u t c h  u i d l e v e l / B = M u l t i f u n c t i o n a l s t e e r i n g w h e e l / C = S t e e r i n g c o l u m n s t a l k / D = S u s t a i n e d - a c t i o n b r a k e / E = D i ts r i b u t o r , l i n e 6 0 0 2 8 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e A = A i r d r y e r / b r a k e c i r c u i t m o n i t o r i n g / B = C a b l o c k c h e c k / C = F u e l g a u g e . s h e A = S i g n a l h o r n / B = F u e l  l t e r h e a t e r p r e p a r a t i o n / C = E n g i n e b r a k e / D = O i l l e v e l s e n s o r / E = M - C A N / F = O u t s i d e t e m p e r a t u r e . . . . . . . . . . . . . . . . . . . . . . . . . . s h e A = H e a t e r b l o w e r / a i r - c o n d i t i o n i n g s y s t e m . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e A = W a s h e r s a n d w i p e r s . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e A = I m m o b i l i s e r / B = G e a r s e l e c t o r l e v e r / C = V e h i c l e m a n a g e m e n t c o m p u t e r d i a g n o s i s / D = A c c e l e r a t o r p e d a l u n i .t . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e A = V o l t a g e s u p p l y + 1 5 / B = I n s t r u m e n t a t i o n / t a c h o g r a p h . . . . . . . . . . . . . . . . . . . . . . . . s h e A = L i g h t i n g l e a r n i n g r o u t i n e / B = L i g h t c i r c u i t / C = F o g l a m p / r e a r f o g l a m p c i r c u i t / D = C i g a r e t t e l i g h t e r / E = A s h t r a y l i g h t i n g . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e A = P a r k i n g l i g h t s , l e f t / B = P a r k i n g l i g h t s , r i g h .t . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e A = H e a d l i g h t  a s h / B = H e a d l i g h t l o w b e a m , h e a d l i g h t h i g h b e a m , d a y t i m e d r i v i n g l i g h t s / C = H e a d l i g h t b e a m r e g u l a t o r . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e A = R e a r f o g l a m p s / B = F o g l a m p s , a d d i t i o n a l h i g h b e a m h e a d l i g h t s , c o r n e r i n g l i g h t , l e f t / C = F o g l a m p s , a d d i t i o n a l h i g h b e a m h e a d l i g h t s , . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e c o r n e r i n g l i g h t , r i g h t A = B r a k e l i g h t / B = P a r k i n g b r a k e / C = R e v e r s i n g l i g h .t . . . . . . . . . . . . . . . . . . . . . . . . . s h e A = P u s h b u t t o n u n i t i l l u m i n a t i o n / B = P e r m a n e n t l o a d v o l t a g e s u p p l y / C = E n t r a n c e l i g h t i n g / D = I n t e r i o r l i g h t s . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e A = T u r n i n d i c a t o r s . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e A = S p a r e l i n e s / B = S p a r e l i n e s f o r t r a i l e r s o c k e t / C = S p a r e l i n e s f o r e n g i n e s t a r t / s t o p . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e A = G e a r b o x / B = T - C A N n e t w o r k . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e A = I n t a r d e r , r e t a r d e r / B = P o w e r t a k e - o f .f . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e

. . . . . . . . . . . . . . . . . . . . . 2 6 e t 1 o f 2 2 . . . . . . . . . . 2 6 e t 2 o f 2 2 . . . . . . . . . . 2 8 e t 3 o f 2 2 . . . . . . . . . . 3 0 e t 4 o f 2 2 . . . . . . . . . . 3 2 e t 5 o f 2 2 . . . . . . . . . . 3 4 e t 6 o f 2 2 . . . . . . . . . . 3 6 e t 7 o f 2 2 . . . . . . . . . . 3 8 e t 8 o f 2 2 . . . . . . . . . . 4 0 e t 9 o f 2 2 . . . . . . . . . . 4 2 e t 1 0 o f 2 2 . . . . . . . . 4 4 e t 1 1 o f 2 2 . . . . . . . . 4 6 e t 1 2 o f 2 2 . . . . . . . . 4 8 e t 1 3 o f 2 2 . . . . . . . . 5 0 e t 1 4 o f 2 2 . . . . . . . . 5 2 e t 1 5 o f 2 2 . . . . . . . . 5 4 e t 1 6 o f 2 2 . . . . . . . . 5 6 e t 1 7 o f 2 2 . . . . . . . . 5 8 e t 1 8 o f 2 2 . . . . . . . . 6 0 e t 1 9 o f 2 2 . . . . . . . . 6 2 e t 2 0 o f 2 2 . . . . . . . . 6 4 e t 2 1 o f 2 2 . . . . . . . . 6 6 e t 2 2 o f 2 2 . . . . . . . . 6 8

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A S R s l i p t h r e s h o l d s b u t t o n . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 1 . . . . . . . . . . . 7 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 2 4 9 5 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 8 B a t t e r y m a s t e r s w i t c h , m e c h a n i c a .l . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 1 . . . . . . . . . . . 8 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 2 3 5 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 8 I n t e r a x l e a n d t r a n s v e r s e d i f f e r e n t i a l l o c k , r e a r a x l e ( 3 - a x l e v e h i c l e ) . . . . . . . . . . . . . s h e e t 1 o f 1 . . . . . . . . . . . 8 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 2 3 3 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 8 T r a n s v e r s e d i f f e r e n t i a l l o c k , r e a r a x l e ( 2 - a x l e v e h i c l e ) . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 1 . . . . . . . . . . . 8 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 2 4 6 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 8 E l e c t r o n i c B r a k e S y s t e m E B S 5 ( 2 - a x l e v e h i c l e ) . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 3 . . . . . . . . . . . 8 E l e c t r o n i c B r a k e S y s t e m E B S 5 ( 2 - a x l e v e h i c l e ) . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 2 o f 3 . . . . . . . . . . . 8 E l e c t r o n i c B r a k e S y s t e m E B S 5 ( 2 - a x l e v e h i c l e ) . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 3 o f 3 . . . . . . . . . . . 9 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 2 4 7 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 9 E l e c t r o n i c B r a k e S y s t e m E B S 5 ( 3 - a x l e v e h i c l e ) . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 4 . . . . . . . . . . . 9 E l e c t r o n i c B r a k e S y s t e m E B S 5 ( 3 - a x l e v e h i c l e ) . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 2 o f 4 . . . . . . . . . . . 9 E l e c t r o n i c B r a k e S y s t e m E B S 5 ( 3 - a x l e v e h i c l e ) . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 3 o f 4 . . . . . . . . . . . 9 E l e c t r o n i c B r a k e S y s t e m E B S 5 ( 3 - a x l e v e h i c l e ) . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 4 o f 4 . . . . . . . . . . . 9 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 2 5 0 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1 0 E C A S 2 ( 4 x 2 ) . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 2 . . . . . . . . . . 1 0 E C A S 2 ( 4 x 2 ) . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 2 o f 2 . . . . . . . . . . 1 0 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 2 4 8 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1 0 E C A S 2 ( 4 x 2 - s e m i t r a i l e r ) . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 2 . . . . . . . . . . 1 0 E C A S 2 ( 4 x 2 - s e m i t r a i l e r ) . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 2 o f 2 . . . . . . . . . . 1 0 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 2 5 3 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1 0 E C A S 2 ( 6 x 2 o p t i o n a l l y w i t h A L M / c r a n e ) . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 2 . . . . . . . . . . 1 0 E C A S 2 ( 6 x 2 o p t i o n a l l y w i t h A L M / c r a n e ) . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 2 o f 2 . . . . . . . . . . 1 1 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 6 2 4 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1 1 E D C 7 E u r o 3 D 2 0 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 3 . . . . . . . . . . 1 1 E D C 7 E u r o 3 D 2 0 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 2 o f 3 . . . . . . . . . . 1 1 E D C 7 E u r o 3 D 2 0 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 3 o f 3 . . . . . . . . . . 1 1 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 6 2 5 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1 1 E D C 7 C o m m o n R a i l E u r o 3 D 2 6 7 6 L F , E - E G R . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 4 . . . . . . . . . . 1 1 E D C 7 C o m m o n R a i l E u r o 3 D 2 6 7 6 L F , E - E G R . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 2 o f 4 . . . . . . . . . . 1 2 E D C 7 C o m m o n R a i l E u r o 3 D 2 6 7 6 L F , E - E G R . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 3 o f 4 . . . . . . . . . . 1 2 E D C 7 C o m m o n R a i l E u r o 3 D 2 6 7 6 L F , E - E G R . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 4 o f 4 . . . . . . . . . . 1 2 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 6 1 7 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1 2 E l e c t r i c c a b t i l t m e c h a n i s m . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 1 . . . . . . . . . . 1 2 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 2 6 0 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1 2 E V B , c o n t r o l l e d . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 1 . . . . . . . . . . 1 2 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 1 7 3 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1 3 C a b , T - C A N , s t a n d a r d . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 1 . . . . . . . . . . 1 3 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 2 6 7 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1 3 W i n d o w l i f t e r , b u t t o n i n s h i f t c o n s o l e . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 1 . . . . . . . . . . 1 3 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 2 7 6 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1 3 G e a r b o x / m a n u a l g e a r b o x . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 2 . . . . . . . . . . 1 3 G e a r b o x / m a n u a l g e a r b o x . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 2 o f 2 . . . . . . . . . . 1 3 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 7 4 8 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1 3 G e a r b o x / m a n u a l g e a r b o x . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 2 . . . . . . . . . . 1 3 G e a r b o x / m a n u a l g e a r b o x . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 2 o f 2 . . . . . . . . . . 1 4 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 1 3 7 4 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1 4 S e a t b e l t i n d i c a t o r , d r i v e r . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 1 . . . . . . . . . . 1 4 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 2 9 2 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1 4 T r a i l e r c h a r g e , 2 4 V . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 1 . . . . . . . . . . 1 4 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 2 3 7 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1 4 I - C A N c a b ( s t a n d a r d ) . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 1 . . . . . . . . . . 1 4 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 4 0 5 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1 4 I - C A N r o o f ( s t a n d a r d ) . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 1 . . . . . . . . . . 1 4 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 2 9 3 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1 5 I n t e r i o r l i g h t i n g , r o o f , w h i t e / r e d . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 1 . . . . . . . . . . 1 5 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 4 6 1 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1 5 I n t e r i o r l i g h t s w i t h a m b i e n t l i g h .t . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 1 . . . . . . . . . . 1 5 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 2 9 5 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1 5 K 1 0 0

2 n d e d i t io n

8 0 0 2 2 4 4 6 6 8 0 2 2 4 6 8 0 0 2 4 4 6 8 8 0 2 2 4 6 8 8 0 2 4 6 6 8 8 0 0 2 2 4 4 6 8 8 0 2 2 4 4 6 6 8 8 0 0 2 2 4

T A B L E

w w w w w w w w w w w w w w w w w w w w w w w w w w w w w

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C O N T E N T S

I n t a r d e r . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 1 . . . . . . . . . . 1 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 0 4 3 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1 T a c h o g r a p h c h e c k l a m p . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 1 . . . . . . . . . . 1 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 3 0 4 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1 F u e l  l t e r h e a t e r . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 1 . . . . . . . . . . 1 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 3 0 5 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1 F u e l  l t e r h e a t e r , S e p a r . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 1 . . . . . . . . . . 1 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 3 0 0 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1 C u s t o m e r - s p e c i  c c o n t r o l m o d u l e ( K S M .) . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 2 . . . . . . . . . . 1 C u s t o m e r - s p e c i  c c o n t r o l m o d u l e ( K S M .) . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 2 o f 2 . . . . . . . . . . 1 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 3 1 4 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1 H e a d l i g h t b e a m r e g u l a t o r . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 1 . . . . . . . . . . 1 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 1 2 0 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1 F a n c l u t c h w i t h s p e e d f e e d b a c k . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 1 . . . . . . . . . . 1 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 1 6 5 6 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1 E n g i n e b r a k e . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 1 . . . . . . . . . . 1 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 3 1 6 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1 E n g i n e b r a k e , a u t o m a t i c , o f f . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 1 . . . . . . . . . . 1 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 5 0 1 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1 M u l t i f u n c t i o n a l s t e e r i n g w h e e l . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 1 . . . . . . . . . . 1 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 3 6 6 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1 F o g l a m p s / a d d i t i o n a l h i g h b e a m h e a d l i g h t s a n d c o r n e r i n g l i g h .t . . . . . . . . . . . . . . . . . s h e e t 1 o f 1 . . . . . . . . . . 1 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 3 3 7 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1 P r i t a r d e r / I n t a r d e r , a u t o m a t i c , o f .f . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 1 . . . . . . . . . . 1 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 1 3 4 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1 B a s i c l i n e r a d i o . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 1 . . . . . . . . . . 1 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 4 9 0 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1 T o p l i n e r a d i o . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 2 . . . . . . . . . . 1 T o p l i n e r a d i o . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 2 o f 2 . . . . . . . . . . 1 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 3 4 9 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1 B u n k l i g h t , b o t t o m . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 1 . . . . . . . . . . 1 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 2 5 9 2 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1 S i d e m a r k e r l i g h t s . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 1 . . . . . . . . . . 1 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 2 9 8 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1 S e a t h e a t i n g , d r i v e r . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 1 . . . . . . . . . . 1 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 3 1 3 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1 V o l t a g e t r a n s f o r m e r , 1 2 V . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 1 . . . . . . . . . . 1 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 3 1 7 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1 S T A R T / S T O P d e v i c e o n e n g i n e . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 1 . . . . . . . . . . 1 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 3 9 5 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1 S t o r a g e l o c k e r l i g h t i n g , r e a r l e tf . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 1 . . . . . . . . . . 1 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 3 9 6 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1 S t o r a g e l o c k e r l i g h t i n g , r e a r r i g h .t . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 1 . . . . . . . . . . 1 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 3 5 0 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 2 S t o r a g e l o c k e r l i g h t i n g , t o p ( l e f t , m i d d l e ) . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 1 . . . . . . . . . . 2 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 3 5 1 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 2 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 1 . . . . . . . . . . 2 S t o r a g e l o c k e r l i g h t i n g , t o p ( l e f t , m i d d l e , r i g h t ) i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 3 6 7 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 2 S o c k e t s i n c a b , 1 2 V a n d 2 4 V . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 1 . . . . . . . . . . 2 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 0 8 2 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 2 A n t i - j a c k k n i f e b r a k e f o r E B S 5 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 1 . . . . . . . . . . 2 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 2 2 1 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 2 T - C A N t e r m i n a t i n g r e s i s t o r i n c a b . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 1 . . . . . . . . . . 2 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 1 7 4 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 2 T - C A N s t a n d a r d / E C A S . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 1 . . . . . . . . . . 2 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 1 7 5 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 2 T - C A N s t a n d a r d / E C A S / I n t a r d e r . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 1 . . . . . . . . . . 2 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 1 7 8 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 2 T - C A N s t a n d a r d / I n t a r d e .r . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h e e t 1 o f 1 . . . . . . . . . . 2 i r i n g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 1 8 0 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 2 T - C A N ( K S M ) . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 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g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 0 7 7 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . o o r m o d u l e . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h o o r m o d u l e . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h o o r m o d u l e . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h o o r m o d u l e . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h o o r m o d u l e . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 3 0 3 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . r e p a r a t i o n , t r a n s v e r s e d i f f e r e n t i a l l o c k , r e a r a x l e ( 2 - a x l e v e h i c l e ) . . . . . . . . . . . . . . s h g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 3 7 9 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . r e p a r a t i o n , c e n t r a l l u b r i c a t i o n s y s t e m . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h g d i a g r a m N o . 8 1 . 9 9 1 9 2 . 3 3 5 2 . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . e n t r a l l u b r i c a t i o n s y s t e m . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . s h

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u m 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9 1 .9

e r 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1 9 1

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/S y m 2 .1 3 2 .1 3 2 .1 6 2 .2 4 2 .2 4 2 .2 4 2 .2 5 2 .3 0 2 .3 0 2 .3 0 2 .3 0 2 .3 1 2 .3 1 2 .3 1 2 .3 1 2 .3 1 2 .3 1 2 .3 1 2 .3 2 2 .3 2 2 .3 2 2 .3 2 2 .3 2 2 .3 2 2 .3 2 2 .3 2 2 .3 2 2 .3 2 2 .3 2 2 .3 2 2 .3 2 2 .3 2 2 .3 2 2 .3 2 2 .3 2 2 .3 3 2 .3 3 2 .3 3 2 .3 3 2 .3 3 2 .3 3 2 .3 3 2 .3 3 2 .3 3 2 .3 3 2 .3 3 2 .3 3 2 .3 3 2 .3 3 2 .3 3 2 .3 3 2 .3 3 2 .3 3 2 .3 4 2 .3 4 2 .3 4 2 .3 5 2 .3 6

P a g e

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b o l s 8 . .. . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 7 4 . .. . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1 4 6 . .. . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 1 7 5 . .. . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . . 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e - b o a r d te le m a tic s m o d u le c tio n C o n tr o l ile r C o n tr o l M o d u le a c h o g r a p h ( M T C O , D T C O , T S U e tc .) ra n s m is s io n C o n tr o l U n it w i n E l e c t r o n ic P l a t f o r m S y s t e m s ( b u s o n ly ) r u c k n o lo g y G e n e r a tio n A r u c k n o lo g y G e n e r a tio n L ig h t r u c k n o l o g y G e n e r a t i o n M di e c h n ic a l c u s to m e r d o c u m e n t ra f c M e s s a g e C h a n n e l y r e P r e s s u r e M o d u le e c h n ic a l r o a d t r a n s p o r t d ir e c t iv e o r q u e S p e e d C o n tr o l a c h o g r a p h S i m u la t i n g U n it ( v e h ic l e s w i t h o u t M T C O / D T C O ) o o r c o n tro l

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o a d s p e e d r o n t a x le e h ic le D a ta F ile r a n s f e r c a s e o r a c c o r d in g t o d e f e n c e e q u ip m e n t s t a n d a r d s e a d in g a x le r a n s fe r c a s e lo c k m a n a g e m e n t

M W W S W P T

a in t e n a n c e M a n u a l a te r s e p a r a to r a te r p u m p In ta r d e r w a p - b o d y u n it a r n i n g r e al y o s itio n s e n s o r o r q u e c o n v e r t e r a n d c lu t c h u n it

B C C In C A C C A T S C M

r a k i n g r a t e / d e c e le r a t i o n e n t r a l o n - b o a r d c o m p u t e r e n t r a l o n - b o a r d b u s c o m p u t e r te r m e d ia te s p e e d g o v e r n o r ( I S G ) e n t r a l e le c t r i c a l s y s t e m u x ilia ry v e h ic le c o m p u t e r e n tra l c o m p u te r e n t r a l lu b r ic a tio n s y s t e m u x ilia r y h e a te r im e - b a s e d m a i n t e n a n c e s y s t e m l pi o e f c ie n t o f fr ic tio n ic r o c o n tr o lle r ( m ic r o p r o c e s s o r )

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I N T R O D U C T IO N

I N T R O D U C T IO N S A F E T Y IN S T R U C T IO N S G e n e r a l i n f o r m a t i o n

W o r k i n g w i t h t r u c k s , b u s e s a n d t h e a c c o m p a n y i n g s e r v i c e p r o d u c t s s h o u l d n o t p o s e a n y p r o b el m s i f o p e r a t o r s , m a i n t e n a n c e p e r s o n n e l a n d r e p a i r s t a f f r e c e i v e s u i t a b l e t r a i n i n g . T h e f o l l o w i n g s e c t i o n s i n c l u d e s u m m a r i e s o f i m p o r t a n i n t e n t i o n i s t o p r o v i d e t h e k n o w l e d g e n e e d e d t o a v o i d e n v i r o n m e n t a l p o l l u t i o n . T h e y r e p r e s e n t o n l y a s m a l l e r e g u l a t i o n s a n d c a n n o t r e p l a c e t h e s e . I t g o e s w i t h o f o llo w e d a n d th a t th e c o r r e s p o n d in g a c t io n m u s t b e ta k

t r e g u l a t i o n s l i s t e d a c c o r d i n g t o m a j o r t o p i c s . T h e a c c i d e n t s w h i c h c o u ld l e a d t o i n ju r y , d a m a g e a n d x c e rp t fr o m

t h e w i d e r a n g e o f a c c i d e n t p r e v e n t i o n

u t s a y i n g t h a t a l l o t h e r s a f e t y r e g u l a t i o n s m u s t b e e n .

A d d i t i o n a l d i r e c t r e f e r e n c e s t o d a n g e r a r e c o n t a i n e d i n t h e i n s t r u c t i o n s a t p o i n t s w h e r e t h e r e i s a p o t e n t i a l d a n g e r . A o c e

c c i d e n t s m a y h a p p e n i n s p i t e o f a l l p r e c a u t i o n a r y m e a s u r e s h a v i n g b e e n t a k e n . I n s u c h a n e v e n t u a l i t y , b t a i n i m m e d i a t e m e d i c a l a s s i s t a n c e f r o m a d o c t o r . T h i s i s p a r t i c u l a r l y i m p o r t a n t i f t h e a c c i d e n t i n v o l v e s s k i n o n t a c t w i t h c o r r o s i v e a c i d , f u e l p e n e t r a t i o n u n d e r t h e s k i n , s c a l d i n g b y h o t o i l , a n t i f r e e z e s p r a y i n g i n t o e y e s , t c .

1 . R e g u la tio n s fo r p r e v e n tin g

a c c id e n ts le a d in g

t o i n j u r y t o p e r s o n n e l

– S e c u r e u n i t s d u r i n g t h e i r r e m o v a l . – S u p p o r t t h e f r a m e w h e n w o r k i n g o n t h e p n e u m a t i c o r s p r i n g s u s p e n s i o n s y s t e m . – K e e p u n i t s , l a d d e r s , s t a i r s , s t e p s a n d t h e s u r r o u n d i n g a r e a f r e e f r o m o i l a n d g r e a s e .

A c c i d e n t s c a u s e d b y s l i p p i n g c a n h a v e v e r y s e r i o u s c o n s e q u e n c e s . O n ly a u th o r is e d te c h n ic a l p e r s o n n e l a r e a d j u s t m e n t a n d r e p a i r w o r k

e n title d

to

p e r fo r m

i n s p e c t i o n ,

W o r k in g o n t h e b r a k e s y s t e m – P e r f o r m v i s u a l , f u n c t i o n a n d e f f e c t i v e n e s s c h e c k s o n t h e b r a k e s y s t e m

o s – C M – C – H D – T C

a f t e r c a r r y i n g u t a n y w o r k o n it w h a t s o e v e r . T h e s e c h e c k s m u s t b e m a d e in a c c o r d a n c e w it h t h e a f e t y i n s p e c t i o n ( S P ) . h e c k t h e f u n c t i o n o f A B S / A S R a n d E B S s y s t e m s u s in g a s u it a b l e t e s t s y s t e m ( e . g . A N - c a t s ) . o l l e c t h y d r a u l i c o i l a n d b r a k e  u i d a s i t d r a i n s o u t . y d r a u l i c o i l / b r a k e  u i d i s p o i s o n o u s ! o n o t a l l o w b r a k e  u id t o c o m e in t o c o n t a c t w i t h f o o d o r o p e n w o u n d s . r e a t h y d r a u l i c o i l / b r a k e  u i d a s h a z a r d o u s w a s t e ! o m p l y w i t h t h e s a f e t y r e g u l a t i o n s f o r p r e v e n t i n g e n v i r o n m e n t a l p o l l u t i o n .

O p e r a t i n g t h e e n g i n e – O n l y a u t h o r i s e d p e r s o n n e l a r e p e r m i t t e d t o s t a r t a n d o p e r a t e a n e n g i n e . – D o n o t a p p r o a c h m o v i n g p a r t s o f a r u n n i n g e n g i n e t o o c l o s e l y .

D E – D D A in – D

o n o t w e a r b a g g y c lo t h i n g a n d t i e u n s u r e a d e q u a t e v e n t ila t io n if y o u a r o n o t to u c h u n its w it h y o u r b a r e h a a n g e r o f b u r n s ! lw a y s w e a r p r o te c tiv e g lo v e s w h e n p a r t i c u l a r . o n o t o p e n t h e c o o l a n t c ir c u it u n le s

p o r c o v e r lo n g h a ir . e w o r k i n g i n e n c l o s e d s p a c e s . n d s w h e n t h e y a r e a t o p e r a t in g t e m p e r a t u r e . c h a n g i n g o i l ( i n u n i t s a t o p e r a t i n g t e m p e r a t u r e ) s t h e e n g i n e i s c o o l .

K 1 0 0

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1 5

IN T R O D U C T IO N

S u s p e n d e d l o a d s – N o - o n e i s a l l o w e d t o s t a n d u n d e r a u n i t s u s p e n d e d f r o m

a c r a n e h o o k . - K e e p a ll

l i f t i n g t a c k l e i n g o o d c o n d i t i o n -

W o r k i n g o n h i g h - p r e s s u r e l i n e s – D o n o t a t t e m p t t o t i g h t e n o r l o o s e n

p F – D n

re s s l u i d o n o o t in

u re (e .g . s p r a y in g t h o ld y o h a le fu e l

p ip e lin e s a n d h o s e s w h e n t h e y a r e u n d e r l u b r i c a t i o n c i r c u i t , c o o l a n t c i r c u i t a n d h y d r a u l i c o i l c i r c u i t ) . o u t r e p r e s e n t s a n i n j u r y h a z a r d ! u r h a n d s u n d e r t h e je t o f f u e l w h e n c h e c k i n g t h e i n je c t o r n o z z le s . D o v a p o u r s .

W o r k i n g o n t h e v e h i c l e e l e c t r i c a l s y s t e m – A l w a y s d i s c o n n e c t t h e b a t t e r i e s b e f o r e w o r k i n g o n t h e e l e c t r i c a l s y s t e m .

D – M T – T n a – D u – T c

i s c o n n e c t t h e e a r t h c a b l e  r s t a n d c o n n e c t i t l a s t w h e n r e c o n n e c t i n g . e a s u r e v o lt a g e o n l y u s in g a s u it a b l e m e a s u r e m e n t d e v ic e . h e i n p u t r e s is t a n c e o f t h e m e a s u r e m e n t d e v ic e m u s t b e a t l e a s t 1 0 M Ω o w - s ta r t t h e v e h ic le o n l y w it h t h e b a t t e r ie s c o n n e c te d ( m in im u m c h a r g e o t u s e a b o o s t - c h a r g e r t o j u m p - s t a r t t h e v e h i c l e ! A lw a y s d i s c o n n e c t t h n d n e g a t i v e l e a d s b e f o r e b o o s t - c h a r g i n g b a t t e r i e s . is c o n n e c t th e b a t te r ie s a n d r e c h a r g e th e m e v e r y 4 w e e k s if th e v e h ic s e . h e ig n i t io n m u s t b e s w it c h e d o f f b e f o r e t h e w ir in g h a r n e s s p lu g s o f t h e o n t r o l u n i t s a r e d i s c o n n e c t e d o r c o n n e c t e d u p .

. 4 0 % ) ! D o e p o s i t i v e le i s n o t in e l e c t r o n i c

I m p o r t a n t ! B a t t e r y g a s e s a r e e x p l o s i v e ! – O x y h y d r o g e n g a s m a y f o r m i n e n c l o s e d b a t t e r y b o x e s . T a k e p a r t i c u l a r c a r e a f t e r

lo n g jo u r n e y s a n d a f t e r c h a r g i n g – W h e n t h e b a t t e r i e s a r e d i s c o n n b y o t h e r c o n tin u o u s ly o p e r a t in g s h u t d o w n . B lo w c o m p r e s s e d a b a t t e r i e s ! – A v o i d s h o r t c i r c u i t s c a u s e d b y p o m o l e g r ip s , e t c . ) o n th e b a tte r y

th e b a t te r ie s e c te d th is g a s c o n s u m e rs , ir t h r o u g h t h e

w i t h a m a y th e ta b a tte r

b a tte r y c h b e ig n ite d c h o g ra p h y b o x b e fo

a r g e r . b y s p a r k s p r o d u c e d e t c . t h a t c a n n o t b e r e d i s c o n n e c t i n g t h e

l a r i t y r e v e r s a l o r b y p l a c i n g m e t a l o b j e c t s ( s p a n n e r s , t e r m i n a l s .

C a u t i o n ! B a t t e r y a c i d i s p o i s o n o u s a n d c o r r o s i v e ! – W e a r a p p r o p r i a t e p r o t e c t i v e c l o t h i n g ( g l o v e s , p r o t e c t i v e

a p r o n ) w h e n h a n d l i n g

b a t t e r i e s . D o n o t t i l t b a t t e r i e s , a c i d m a y l e a k o u t .

1 6

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E l e c t r i c w e l d i n g – C o n n e c t u p t h e " A N T I Z A P

S E R V I C E M O N I T O R " p r o te c t iv e d e v ic e ( M A N it e m n u m b e r 8 0 . 7 8 0 1 0 . 0 0 0 2 ) i n a c c o r d a n c e w i t h t h e i n s t r u c t i o n s s u p p l i e d w i t h t h e d e v i c e . – I f t h i s d e v i c e i s n o t a v a i l a b l e , d i s c o n n e c t t h e b a t t e r i e s a n d c o n n e c t t h e p o s t i i v e c a b l e t o t h e n e g a t i v e c a b l e i n o r d e r t o m a k e a c o n d u c t iv e c o n n e c t i o n . – A l w a y s e a r t h t h e w e l d i n g e q u i p m e n t a s c l o s e a s p o s s i b l e t o t h e w e l d i n g a r e a . D o n o t l a y t h e c a b l e s t o t h e w e l d i n g e q u i p m e n t i n p a r a l l e l t o e l e c t r i c a l c a b l e s i n t h e v e h i c l e . – T h e c h a s s i s i s n o t i n t e n d e d f o r u s e a s a n e a r t h r e t u r n . I f a t t a c h m e n t s a r e t o b e  t t e d t o t h e v e h i c l e ( e . g . a t a i l l i f t ) , a d d i t i o n a l e a r t h ( g r o u n d ) l i n e s w i t h a n a d e q u a t e c r o s s - s e c t i o n m u s t b e  t t e d a s w e l l . O t h e r w i s e t h e e a r t h c o n n e c t i o n m a y b e c r e a t e d a l o n g w i r e c a b le s , w i r i n g h a r n e s s e s , g e a r b o x s h a f t s , g e a r s e t c . S e v e r e d a m a g e c o u l d r e s u l t . P a i n t i n g – I f p a i n t s p r a y i n g i s t o b e c a r r i e d o u t , d o n o t e x p o s e t h e e l e c t r o n i c c o m p o n e n t s t o

h i g h t e m p e r a t u r e s ( m a x . 9 5 ° C ) f o r m o r e t h a n b r i e f p e r i o d s ; a t im e o f u p t o 2 h o u r s i s p e r m i s s i b l e a t a m a x i m u m o f 8 5 ° C . D i s c o n n e c t t h e b a t t e r i e s . W o r k in g o n p l a s t i c t u b e s - D a n g e r o f d a m a g e a n d  r e ! – T h e w a r n i n g s i g n o p p o s i t e i s a t t a c h e d t o t h e i n s i d e o f t h e d i e s e l f u e l o r h e a t i n g o i l

t a n k  a p . I t w a r n s y o u a g a i n s t w e l d i n g o r d r i l l i n g n e a r t o p l a s t i c t u b e s .

W o r k i n g w i t h t h e c a b t i l t e d – K e e p t h e t i l t i n g a r e a i n f r o n t o f t h e c a b c l e a r . – K e e p o u t o f t h e a r e a b e t w e e n t h e c a b a n d t h e c h a s s i s d u r i n g t h e t i l t i n g p r o c e s s . T h i s

is a d a n g e r a r e a ! – A l w a y s t i l t t h e c a b p a s t t h e t i l t i n g p o i n t t o i t s  n a l p o s i t i o n . W o r k i n g o n t h e a i r - c o n d i t i o n i n g s y s t e m – R e f r i g e r a n t  u i d s a n d v a p o u r s r e p r e s e n t a h e a l t h h a z a r d , a v o i d c o n t a c t w i t h t h e m

a n d p r o t e c t y o u r e y e s a n d h a n d s . – D o n o t d r a i n g a s e o u s r e f r i g e r a n t s i n e n c l o s e d r o o m s . – D o n o t m i x C F C - f r e e r e f r i g e r a n t R 1 3 4 a w i t h R 1 2 ( C F C ) r e f r i g e r a n t . 2 . N o t e s o n p r e v e n t i n g d a m a g e a n d p r e m a t u r e w e a r o n u n i t s – O n l y s u b j e c t u n i t s t o t h e l o a d w h i c h t h e y h a v e b e e n d e s i g n e d t o

c o p e w it h in a c c o r d a n c e w it h t h e ir

d e s ig n a t e d u s e . D o n o t o v e r lo a d t h e m . – I f a f a u l t o c c u r s d u r i n g o p e r a t i o n , d e t e r m i n e i t s c a u s e i m m e d i a t e l y a n d c o r r e c t c a n g e t a n y w o r s e . – C l e a n t h e u n i t s t h o r o u g h l y b e f o r e r e p a i r s . E n s u r e t h a t n o d i r t , s a n d o r f o r e i g n w h i l s t c a r r y i n g o u t r e p a i r s . – A l w a y s u s e g e n u i n e p a r t s . F i t t i n g “ e q u i v a l e n t p a r t s ” m a d e b y o t h e r c o m p a n i e s a n d t h e w o r k s h o p t h a t d i d t h e w o r k w i l l b e r e s p o n s i b l e f o r it . S e e t h e s e c t i o n a c c e s s o r i e s a n d p a r t s " . – N e v e r r u n a u n i t d r y , i n o t h e r w o r d s a l w a y s m a k e s u r e t h a t i t h a s b e e n  l l e d w – N e v e r r u n e n g i n e s w i t h o u t c o o l a n t . – A p p l y a s u i t a b l e i n f o r m a t i o n s i g n t o u n i t s t h a t a r e n o t r e a d y t o b e o p e r a t e d .

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o b j e c t s c a n g e t i n t o t h e u n i t s c a n le a d t o s e v e r e d a m a g e , e n t i t l e d " L i m i t e d l i a b i l i t y f o r i t h o i l b e f o r e r u n n i n g i t .

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IN T R O D U C T IO N – O n l y u s e s e r v i c e p r o d u c t s ( e n g i n e a n d g e a r b o x o i l a s w e l l a s a n t i f r e e z e a n d a n t i - c o r r o s i o n p r o t e c t i o n ) t h a t

h a v e b e – C o m p l y – D o n o t  t i l t . – S e v e r e

e n a p p r o v e d b y M A N . K e e p y o u r w o r k p la c e c le a n . w i t h t h e s p e c i  e d m a i n t e n a n c e i n t e r v a l s . ll e n g i n e / g e a r o i l a b o v e t h e m a x i m u m l e v e l m a r k . D o n o t e x c e e d t h e m a x i m u m p e r m i t t e d o p e r a t io n a l d a m a g e to th e u n it c o u ld r e s u lt f r o m

3 . L im ite d

l i a b i l i t y f o r a c c e s s o r i e s a n d p a r t s

In y o u r o w n g e n u in e M A N s p e c i c a lly f o p ro d u c ts , n o r T Ü V te c h n ic a

in te r e s t s , y p a r ts . T h e r M A N v e h c a n w e a c c l in s p e c t io n

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f a i l u r e t o f o l l o w t h e s e r e g u l a t i o n s .

o u a re re c o m m e n d e d to r e l i a b i li t y , s a f e t y a n d s u i t a ic le s . D e s p it e c o n s t a n t m e p t r e s p o n s ib i lit y f o r t h e m a u th o r itie s o r s o m e o t h e

u s e o n ly a c c b i lity o f t h e s e a rk e t o b s e rv – e v e n if th e y r o f  c ia l b o d y

e s s o r ie s p a rts a n d a tio n , w e h a v e b e e .

e x p r e s s ly a p p a c c e s s o r ie s h c a n n o t ju d g e n o f  c ia l ly a p p

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d e d e r a n

s p e c i a l b o d i e s

w ith th e s a f e b o d ie s h a v e b a n te d .d e ). W u id e t o F i t t in g

t y in s t r u e e n  tte r itte n a p B o d i e s

o u t o f o p e r a tio n

c t io n s d . A lw p ro v a is n o t

a n d

a n d a y s l/r e le c o m

r e g u l a t i o n s i s s u e d b y t h e b o d y b u i l d e r i n q u e s t i o n i f a t t a c h m e n t s o r f o l l o w t h e i n s t r u c t i o n s i n t h e a p p r o p r i a t e M A N G u i d e t o F i t t i n g B o d i e s a s e / c o n  r m a t i o n f r o m d e p a r t m e n t T D B i s r e q u i r e d i f t h e a p p r o p r i a t e p l i e d w i t h .

s t o r i n g

T h e s p e c i a l m e a s u r e s d e s c r i b e d i n M A N W o r k s S t a n d a r d M 3 0 6 9 P a r t 3 a p p ly i f b u s e s o r t r u c k s a r e t o b e w i t h d r a w n f r o m s e r v ic e o r s t o r e d f o r a p e r i o d l o n g e r t h a n 3 m o n t h s . 4 . H a n d l i n g b r a k e p a d s a n d s im i l a r c o m p o n e n t s – H a r m f u l d u s t m a y b e r e l e a s e d w h e n b r a k e p a d s a r e m a c h i n e d , i n p a r t i c u l a r d u r i n g s k i m m i n g a n d g r i n d i n g

a s w e ll a s w h e n w h e e l b r a k e s a r e b lo w n o u t. n e c e s s a r y p r e c a u tio n a r y m e a s u r e s a n d o b s p o s s ib l e d a m a g e t o y o u r h e a l t h : – I f p o s s i b l e , c a r r y o u t t h e w o r k i n q u e s t i o n i n t h e o p e n o r i n a n s y s t e m . – I f p o s s i b l e , u s e h a n d - o p e r a t e d o r s l o w - r u n n i n g t o o l s , e q u i p p e d – F a s t - r u n n i n g t o o l s s h o u l d a l w a y s b e  t t e d w i t h s u c h d e v i c e s . – I f p o s s i b l e , w e t t h e w o r k p i e c e p r i o r t o c u t t i n g o r d r i l li n g . – D i s p o s e o f b r a k e p a d s o r l i n i n g s a s h a z a r d o u s w a s t e i n a n e n v – P l e a s e t a k e t h e

5 . R e g u la tio n s fo r a v o id in g

in ju r y a n d e n v ir o n m

e r v e t h e f o l l o w i n g s a f e t y a d v ic e t o a v o id a r e a e q u i p p e d w ti h a n e f  c i e n t v e n t i l a t i o n w ti h a d u s t - c o l l e c t o r i f r e q u i r e d . i r o n m e n t a l l y s o u n d m a n n e r .

e n t a l c o n t a m i n a t i o n

C o o l a n t

T r e a t u n d i l u t e d a n t i f r e e z e a s h a z a r d o u s w a s t e . F o l l o w t h e i n s t r u c t oi n s i s s u e d b y t h e r e l e v a n t l o c a l a u t h o r i t y w h e n d i s p o s i n g o f u s e d c o o l a n t ( m i x t u r e o f a n t i f r e e z e a n d w a t e r ) . C l e a n i n g t h e c o o l i n g c i r c u i t

D o n o t p o u r c le a n i n g  u i d s a n d r i n s i n g w a t e r d o w n t h e d r a i n i f t h i s p r a c t i c e is r e s t r i c t e d b y s p e c i  c l o c a l r e g u l a t io n s . H o w e v e r , t h e c le a n i n g  u i d a n d r i n s i n g w a t e r m u s t i n a l l c a s e s h a v e b e e n p a s s e d t h r o u g h a n o i l t r a p w i t h a s lu d g e t r a p . C l e a n i n g t h e  l t e r i n s e r t

W o o g

h e n r is b r u s e re a s e

b lo w lo w n a s k - d is s

in g c in t o in b a o lv in

o m p r e s s e d a ir a d u s t c o lle c t io rr ie r h a n d c r e a g c h a r a c t e r is t ic

t h r o u g h t h e  lt e r i n s e r t , m a k e s u r e t h e  lt e r d u s t i s c o lle c t e d b y a v a c u u m n b a g . O t h e r w i s e , u s e a r e s p i r a t o r y p r o t e c t i o n m a s k . W e a r r u b b e r g l o v e s m w h e n w a s h in g o u t t h e i n s e r t , b e c a u s e c l e a n i n g a g e n t s h a v e a g g r e s s i v e s .

E n g i n e / g e a r o i l ,  l t e r c a r t r i d g e s , e l e m e n t s a n d b o x - t y p e  l t e r s , d e s i c c a n t c a r t r i d g e s

O p b m

n ly d is p o s e o f u s e d o u r e d d o w n th e d r a in o x - ty p e  lte r s ( o il a n d a t e r ia l s a n d m u s t b e

o il a t a n o r o n to f u e l  l t e d is p o s e d

a p p th e rs , o f

ro v g ro d e s p ro

e d c u n d ic c a n p e r ly

o lle s in t c . P

c tio n c e it c a r tr id g le a s e

p o in t o r d a n p o llu t e e s fo r th e fo llo w th e

e p d a in

o t . It is r in k in g w ir d r y e r ) s t r u c t io n

e x tr e m e ly a t e r ! F i t l e r a r e c la s s i s o f y o u r re

im p o in s e e d a le v a

r ta n t rts , c s h a z n t lo c

th a t a r tr id a rd o a l a u

o il g e u s th o

i s n o t s a n d w a s t e r i t y .

U s e d e n g i n e / g e a r o i l

L e n g t h y o r r e p e a t e d s k i n c o n t a c t w i t h a n y t y p e o f e n g i n e / g e a r o i l r e m o v e s g r e a s e f r o m t h e s k i n . T h i s c a n c a u s e d r y s k i n , i r r i t a t i o n o r s k i n i n  a m m a t i o n . I n a d d i t i o n t o t h e s e h a z a r d s , u s e d e n g i n e o i l c o n t a i n s d a n g e r o u s m a t e r i a l s w h i c h c a n c a u s e s k in c a n c e r . 1 8

K 1 0 0

2 n d e d itio n

I N T R O D U C T IO N 6 . H e a l t h p r o t e c t i o n p r e c a u t i o n s – A v o i d l e n g t h y , e x c e s s i v e o r r e p e a t e d s k i n c o n t a c t w i t h u s e d o i l s . – P r o t e c t y o u r s k i n u s i n g a s u i t a b l e s k i n p r o t e c t i o n a g e n t o r p r o t e c t i v e g l o v e s . – C l e a n a r e a s o f s k i n w h i c h h a v e c o m e i n t o c o n t a c t w i t h e n g i n e o i l . – W a s h t h e a r e a s t h o r o u g h l y w i t h s o a p a n d w a t e r . – A n a i l b r u s h e n a b l e s m o r e e f f e c t i v e c l e a n ni g . – S p e c i a l c l e a n i n g a g e n t s m a k e i t e a s i e r t o c l e a n d i r t y h a n d s . – D o n o t u s e p e t r o l , d i e s e l o i l , g a s o i l , t h i n n e r s o r s o l v e n t s . – A p p l y a g r e a s y s k i n c r e a m a f t e r c l e a n i n g y o u r s k i n . – C h a n g e o u t o f c l o t h i n g o r s h o e s w h i c h h a v e b e c o m e s o a k e d w i t h o i l . – N e v e r p u t o i l - s o a k e d r a g s i n t o y o u r c l o t h i n g p o c k e t s . T a k e c a r e t o d i s p o s e o f u s e d e n g i n e / g e a r o i l p r o p e r l y . - O i l s c a n d a m a g e g r o u n d w a t e r q u a l i t y -

T h e r e f o r e , n e v e r p o u r u s e d o i l o n t o t h e g r o u n d , i n t o w a t e r o r d o w n t h e d r a in s o r s e w e r s . F a i l u r e t o c o m p l y w i t h t h e s e i n s t r u c t i o n s c a n l e a d t o p r o s e c u t i o n . C o lle c t a n d d is p o s e o f u s e d o il c a r e f u lly . i n f o r m a t i o n a b o u t c o l l e c t i o n d e p o t s . E x tr a c t fro m

C o n t a c t t h e p o i n t o f s a l e , s u p p l i e r o r y o u r l o c a l a u t h o r i t y f o r

" I n f o r m a t i o n o n d e a l i n g w i t h u s e d e n g i n e o i l "

T h e M in e r a l O il T r a d e r s ’ A s s o c ia tio n D - 2 0 0 9 9 H a m b u r g

(M IN E R A L Ö L W IR T S C H A F T S V E R B A N D

K 1 0 0

2 n d e d itio n

E . V . ) S t e in d a m m

7 1 ,

1 9

IN T R O D U C T IO N O V E R V IE W

O F

M O D E L S

T h e s e w i r i n g d i a g r a m s - 0 3 . 2 0 1 0 e d i t i o n - a p p l y t o t h e f o l lo w i n g v e h i c l e s . M o d e l

M o d e l d e s ig n a tio n

M o d e l

M o d e l d e s ig n a tio n

0 6 S - 1 5 8 0

T G S 1 8 .D 2 0 /D 2 6 4 X 2 B L

2 6 X - 0 1 5 0

0 6 S - 1 5 8 1

T G S 1 8 .D 2 0 /D 2 6 4 X 2 B L

2 8 X - 0 0 0 6 T G X 2 8 6 X 4 B B - C K D

8 9 S - 0 1 6 1

T G S 2 8 .D 2 0 /D 2 6 6 X 2 -2 B L

3 0 X - 0 2 7 3

8 9 S - 0 1 6 2

T G S 2 8 . D 2 0 /D 2 6 6 X 2 -2 B L

O v e r v ie w

o f w ir in g

d i a g r a m s c la s s i e d a c c o r d in g

T G X 2 6 /3 3 .D 2 0 /D 2 6 6 X 4 B B T G X 2 6 /3 3 .D 2 0 /D 2 6 6 X 4 B L

t o m o d e l d e s i g n a t i o n

M o d e l M o d e l M o d e l M o d e l M o d e l M o d e l M o d e l N a m e

Ite m

n o .:

0 6 S - 0 6 S - 8 9 S - 8 9 S - 2 6 X - 2 8 X - 3 0 X - 1 5 8 0 1 5 8 1 0 1 6 1 0 1 6 2 0 1 5 0 0 0 0 6 0 2 7 3

A S R c h e c k l a m p

8 1 .9 9 1 9 2 .1 3 5 8

X

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S e a t b e l t i n d i c a t o r , d r i v e r

8 1 .9 9 1 9 2 .1 3 7 4

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E n g in e b r a k e

8 1 .9 9 1 9 2 .1 6 5 6

B a tte ry m a s te r m e c h a n ic a l

s w it c h ,

X

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8 1 .9 9 1 9 2 .2 4 9 5

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T r a ile r s o c k e t 2 4 V 7 - p o le

8 1 .9 9 1 9 2 .2 4 9 6

X

T r a ile r s o c k e t 2 4 V 7 - p o le

8 1 .9 9 1 9 2 .2 4 9 8

S i d e m a r k e r l i g h t s

8 1 .9 9 1 9 2 .2 5 9 2

T a c h o g r a p h c h e c k la m p

8 1 .9 9 1 9 2 .3 0 4 3

D o o r m o d u le

8 1 .9 9 1 9 2 .3 0 7 7

S e r ie s s ta n d a r d d i a g r a m

w i r i n g

8 1 .9 9 1 9 2 .3 0 7 9

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w ith

s p e e d

8 1 .9 9 1 9 2 .3 1 2 0

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C a b , T - C A N , s t a n d a r d

8 1 .9 9 1 9 2 .3 1 7 3

T - C A N s t a n d a r d / E C A S

8 1 .9 9 1 9 2 .3 1 7 4

T -C A N s t a n d a r d /E C A S / I n t a r d e r

8 1 .9 9 1 9 2 .3 1 7 5

T - C A N s t a n d a r d / I n t a r d e r

8 1 .9 9 1 9 2 .3 1 7 8

T - C A N ( K S M )

8 1 .9 9 1 9 2 .3 1 8 0

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T - C A N t e r m i n a t i n g r e s i s t o r i n 8 1 .9 9 1 9 2 .3 2 2 1 c a b

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8 1 .9 9 1 9 2 .3 2 2 2

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T r a n s v e r s e d i f f e r e n t i a l l o c k , r e a r a x l e ( 2 - a x l e v e h i c l e )

8 1 .9 9 1 9 2 .3 2 3 3

X

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I n t e r a x l e a n d t r a n s v e r s e d i f f e r e n t i a l l o c k , r e a r a x l e ( 3 - a x l e v e h i c l e )

8 1 .9 9 1 9 2 .3 2 3 5

I - C A N c a b ( s t a n d a r d )

8 1 .9 9 1 9 2 .3 2 3 7

X

X

8 1 .9 9 1 9 2 .3 2 4 6

X

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2 0

K 1 0 0

X

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X

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8 1 .9 9 1 9 2 .3 1 3 4

E B S

X

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B a s ic lin e r a d io

E le c tr o n ic B r a k e S y s te m 5 ( 2 - a x l e v e h i c l e )

X X

X

A n t i - j a c k k n i f e b r a k e f o r E B S 5 8 1 . 9 9 1 9 2 . 3 0 8 2 F a n c lu tc h f e e d b a c k

X

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X

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Ite m

E le c tr o n ic B r a k e S y s te m 5 ( 3 - a x l e v e h i c l e )

E B S

n o .:

0 6 S - 0 6 S - 8 9 S - 8 9 S - 2 6 X - 2 8 X - 3 0 X - 1 5 8 0 1 5 8 1 0 1 6 1 0 1 6 2 0 1 5 0 0 0 0 6 0 2 7 3

8 1 .9 9 1 9 2 .3 2 4 7

E C A S 2 ( 4 x 2 - s e m it r a ile r )

8 1 .9 9 1 9 2 .3 2 4 8

E C A S 2 ( 4 x 2 )

8 1 .9 9 1 9 2 .3 2 5 0

X X

X

X

X X

X X

X

X

X

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G e a r b o x / m a n u a l g e a r b o x T r a ile r c h a r g e , 2 4 V

8 1 .9 9 1 9 2 .3 2 9 2

I n t e r i o r l i g h t i n g , r o o f , w h i t e / r e d

8 1 .9 9 1 9 2 .3 2 9 3

In ta rd e r

8 1 .9 9 1 9 2 .3 2 9 5

S e a t h e a t i n g , d r i v e r

8 1 .9 9 1 9 2 .3 2 9 8

C u s t o m e r - s p e c i c m o d u le ( K S M )

8 1 .9 9 1 9 2 .3 3 0 0

X

X

P r e p a r a t i o n , t r a n s v e r s e d i f f e r e n t i a l l o c k , r e a r a x l e ( 2 - a x l e v e h i c l e )

8 1 .9 9 1 9 2 .3 3 0 3

X

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F u e l  l t e r h e a t e r

8 1 .9 9 1 9 2 .3 3 0 4

X

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F u e l  l t e r h e a t e r , S e p a r

8 1 .9 9 1 9 2 .3 3 0 5

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8 1 .9 9 1 9 2 .3 3 1 3

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8 1 .9 9 1 9 2 .3 3 1 4

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r e g u la to r

X

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8 1 .9 9 1 9 2 .3 3 1 7

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8 1 .9 9 1 9 2 .3 3 4 9

S t o r a g e l o c k e r l i g h t i n g , t o p ( l e f t , m i d d l e )

8 1 .9 9 1 9 2 .3 3 5 0

S t o r a g e l o c k e r l i g h t i n g , t o p ( l e f t , m i d d l e , r i g h t )

8 1 .9 9 1 9 2 .3 3 5 1

C e n t r a l l u b r i c a t i o n s y s t e m

8 1 .9 9 1 9 2 .3 3 5 2

X

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F o g l a m p s / a d d i t i o n a l h i g h b e a m h e a d lig h t s a n d c o r n e r i n g l i g h t

8 1 .9 9 1 9 2 .3 3 6 6

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X

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8 1 .9 9 1 9 2 .3 3 7 9

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B u n k lig h t, b o tto m

X

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8 1 .9 9 1 9 2 .3 3 3 7 X

X X

P r i t a r d e r / I n t a r d e r , a u t o m a t i c , o f f

K 1 0 0

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X

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8 1 .9 9 1 9 2 .3 3 1 6

o n

X

E n g i n e b r a k e , a u t o m a t i c , o f f d e v ic e

X

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8 1 . 9 9 1 9 2 . 3 2 7 6 r e p l a c e d b y 8 1 . 9 9 1 9 2 . 3 7 4 8

X

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8 1 .9 9 1 9 2 .3 2 6 0

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c o n t r o l

X

X

E C A S 2 ( 6 x 2 o p t i o n a l l y w i t h 8 1 .9 9 1 9 2 .3 2 5 3 A L M / c r a n e ) E V B ( E x h a u s t V a l v e B r a k e ) , c o n t r o l l e d

X

X X

2 1

IN T R O D U C T IO N


Ite m

n o .:

0 6 S - 0 6 S - 8 9 S - 8 9 S - 2 6 X - 2 8 X - 3 0 X - 1 5 8 0 1 5 8 1 0 1 6 1 0 1 6 2 0 1 5 0 0 0 0 6 0 2 7 3

S t o r a g e l o c k e r l i g h t i n g , r e a r l e f t

8 1 .9 9 1 9 2 .3 3 9 5

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8 1 .9 9 1 9 2 .3 3 9 6

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8 1 .9 9 1 9 2 .3 4 0 0

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I - C A N r o o f ( s t a n d a r d )

8 1 .9 9 1 9 2 .3 4 0 5

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I n t e r i o r l i g h t s w i t h a m b i e n t l i g h t

8 1 .9 9 1 9 2 .3 4 6 1

T o p lin e r a d io

8 1 .9 9 1 9 2 .3 4 9 0

M u l t i f u n c t i o n a l s t e e r i n g w h e e l 8 1 . 9 9 1 9 2 . 3 5 0 1 E le c tr ic c a b tilt m e c h a n is m

8 1 .9 9 1 9 2 .3 6 1 7

E D C 7 E u ro 3 D 2 0 ...

8 1 .9 9 1 9 2 .3 6 2 4

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2 2

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E D C 7 C o m m o n R a il E u r o 3 8 1 .9 9 1 9 2 .3 6 2 5 D 2 6 7 6 L F , E - E G R G e a r b o x / m a n u a l g e a r b o x

X

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2 n d e d itio n

I N T R O D U C T IO N E X P L A N A T O R Y

N O T E S T O

T H E

W IR IN G

D IA G R A M S

1 E l e c t r i c a l

c o m p o n e n t d e s i g n a t i o n ( e x a m p le : d io d e V 1 0 0 o n t h e c e n tr a l e l e c t r i c a l s y s t e m , n u m b e r 5 3 ) 2 I n s t a l l a t i o n p o s i t i o n o n t h e f r o n t o f t h e c e n t r a l e l e c t r i c a l s y s t e m ( h e r e : s t a m p e d n u m b e r 5 3 ) 3 P l u g c o n n e c t i o n o n t h e r e a r o f t h e c e n t r a l e l e c t r i c a l s y s t e m ( h e r e : c o n n e c t o r 7 8 , c o n n e c t i o n 8 ) 4 C a b l e d e s ig n a t io n , n u m b e r , w it h a b b r e v i a t e d c o lo u r n a m e i n t h e c a s e o f c o l o u r e d c a b l e s , c r o s s s e c t i o n i n f o r m a t i o n o n l y g i v e n i f d i f f e r e n t f r o m 1 2

5 C a b l e 6

7 8

9

d e s i g n a t i o n , n u m b e r i n b r a c k e t s : c o n d u c t o r p a t h w a y s o n a p . c . b . L i n e i n t e r r u p t i o n w i t h i n f o r m a t i o n a b o u t w h e r e t h e lin e c o n t in u e s , w it h s h e e t n u m b e r ( h e r e : s h e e t 2 – n o t p a g e n u m b e r ) a n d p a t h n u m b e r ( h e r e : p a t h 4 ) P l u g c o n n e c t i o n ( e x a m p l e : 1 - p i n p l u g c o n n e c t i o n X 1 0 4 ) I n s t a l l a t i o n l o c a t i o n o f t h e c o m p o n e n t (s e e : i d e n t i  c a t i o n s o f i n s t a l l a t i o n p o s i t i o n s ) C u r r e n t p a t h ( n u m b e r e d f r o m 1 t o 5 5 / 6 0 o n e a c h d ia g r a m )

N o t e : F o r c a b l e n u m b e r o r c a b l e n a m e , s e e M A N - c a t s ® .

K 1 0 0

2 n d e d itio n

2 3

IN T R O D U C T IO N I n s t a l l a t i o n p o s i t i o n s f o r l o c a t i o n i d e n t i  e r s I n s t a l l a t i o n p o s i t i o n s f o r l e f t - h a n d - d r i v e v e h i c l e s ( T G S / T G X )

(A ) (B 1 ) (B 2 ) (C ) (C 1 ) (C 2 ) (C 3 ) (E 6 ) (E 7 ) (E 8 ) (F ) (F 1 ) (F 2 ) (F 3 ) (F 4 ) (F 5 ) 2 4

R e a r o f v e h i c le E n g i n e G e a r b o x F r o n t o f v e h i c l e B u m p e r E n t r a n c e , r i g h t E n t r a n c e , l e f t A r e a o f c e n t r a l e l e c t r i c a l s y s t e m C o n t r o l u n i t p l u g - i n m o d u l e s B a c k w a ll o f c a b I n s t r u m e n t p a n e l M i d - s e c t i o n S t e e r i n g c o lu m n / s t e e r i n g w h e e l P e d a l s F r o n t w a l l i n s i d e l e f t F r o n t w a l l i n s i d e r i g h t

(F 6 ) D (F 7 ) C (F 8 ) S (G ) B (H 1 ) B (H 2 ) A (J 1 ) B (J 2 ) A (L ) C (N ) F (P ) R (R 1 ) F (R 2 ) R (S 1 ) D (S 2 ) D

K 1 0 0

r i v e r ’ s s e a t o - d r i v e r ’ s s e a t h i f t c o n s o l e a t t e r y b o x - p i l l a r , d r i v e r ’ s s i d e - p i l l a r , d r i v e r ’ s s i d e - p i l l a r , c o - d r i v e r ' s s i d e - p i l l a r , c o - d r i v e r ’ s s i d e e i l i n g / r o o f r o n t a x l e e a r a x le r o n t f r a m e s e c t i o n s e a r f r a m e s e c t i o n o o r , l e f t o o r , r i g h t

2 n d e d itio n

S E R IE S

S E R IE S

S T A N D A R D

W IR IN G

2 n d e d itio n

A

D I A G R A M

2 5 S E R IE S

D IA G R A M

W IR IN G

D I A G R A M

K 1 0 0

W IR IN G

S T A N D A R D

S T A N D A R D

W IR IN G

D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9

= V o l t a g e s u p p l y , s ta r t in g

s y s te m

s h e e t 1 o f 2 2

D a t e : 0 9 . 2 0 0 7 L e g e n d A 1 0 0 C e n t r a l e l e c t r i c a l s y s t e m

A 3 0 2 A 4 0 3 A 4 3 5 F 3 5 4 F 3 5 5 F 3 9 9 G 1 0 0 G 1 0 1 G 1 0 2 1 7 1 K M 1 0 0 1 0 1 Q 1 0 0 X X 6 6 9 X 1 3 6 4 X 1 3 6 5 X 1 5 4 1 X 1 5 5 1 X 1 9 1 3 X 1 9 6 6 X 2 5 4 9 X 4 8 2 9

C e n t r a l c o m p u t e r 2 V e h i c l e m a n a g e m e n t c o m p u t e r C o n t r o l u n i t , E D C M a i n f u s e ( t e r m i n a l 3 0 - 1 ) M a i n f u s e ( t e r m i n a l 3 0 - 2 ) F u s e , a l t e r n a t o r ( t e r m i n a l 1 5 ) B a t t e r y 1 B a t t e r y 2 A l t e r n a t o r 1 R e l a y , c o n s u m e r s ( t e r m i n a l 1 5 ) S t a r t e r S t e e r i n g l o c k G r o u n d c o n n e c t i o n , e n g i n e P l u g c o n n . , s t a r t e r i n t e r l o c k J u m p e r , c e n t r a l e l e c t r i c a l s y s t e m ( c e n t r a l o n - b o a r d c o m p u t e r ) 9 0 / 1 - 9 0 / 2 J u m p e r , c e n t r a l e l e c t r i c a l s y s t e m ( c e n t r a l o n - b o a r d c o m p u t e r ) 9 0 / 2 - 9 1 P l u g c o n n . , p o t e n t i a l b u s h i n g + P l u g c o n n . , e n g i n e / E D C / g e a r b o x I I J u m p e r , l i n e 3 0 0 7 6 ( m o t o r p o w e r b o x ) P l u g c o n n . , i g n i t i o n l o c k P l u g c o n n . , I M R ( s t a r t e r ) P l u g c o n n . , i g n i t i o n l o c k ( t e r m i n a l R )

K 1 0 0

2 n d e d itio n

2 6

S E R IE S W IR IN G A

D IA G R A M

S T A N D A R D

W IR IN G

D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9


s y s te m

s h e e t 1 o f 2 2


A 3 0 2 A 4 0 3 A 4 3 5 F 3 5 4 F 3 5 5 F 3 9 9 G 1 0 0 G 1 0 1 G 1 0 2 1 7 1 K M 1 0 0 1 0 1 Q 1 0 0 X X 6 6 9 X 1 3 6 4 X 1 3 6 5 X 1 5 4 1 X 1 5 5 1 X 1 9 1 3 X 1 9 6 6 X 2 5 4 9 X 4 8 2 9

C e n t r a l c o m p u t e r 2 V e h i c l e m a n a g e m e n t c o m p u t e r C o n t r o l u n i t , E D C M a i n f u s e ( t e r m i n a l 3 0 - 1 ) M a i n f u s e ( t e r m i n a l 3 0 - 2 ) F u s e , a l t e r n a t o r ( t e r m i n a l 1 5 ) B a t t e r y 1 B a t t e r y 2 A l t e r n a t o r 1 R e l a y , c o n s u m e r s ( t e r m i n a l 1 5 ) S t a r t e r S t e e r i n g l o c k G r o u n d c o n n e c t i o n , e n g i n e P l u g c o n n . , s t a r t e r i n t e r l o c k J u m p e r , c e n t r a l e l e c t r i c a l s y s t e m ( c e n t r a l o n - b o a r d c o m p u t e r ) 9 0 / 1 - 9 0 / 2 J u m p e r , c e n t r a l e l e c t r i c a l s y s t e m ( c e n t r a l o n - b o a r d c o m p u t e r ) 9 0 / 2 - 9 1 P l u g c o n n . , p o t e n t i a l b u s h i n g + P l u g c o n n . , e n g i n e / E D C / g e a r b o x I I J u m p e r , l i n e 3 0 0 7 6 ( m o t o r p o w e r b o x ) P l u g c o n n . , i g n i t i o n l o c k P l u g c o n n . , I M R ( s t a r t e r ) P l u g c o n n . , i g n i t i o n l o c k ( t e r m i n a l R )

K 1 0 0

2 n d e d itio n

2 6

S E R IE S A


s y s te m

S T A N D A R D

W IR IN G

D I A G R A M

s h e e t 1 o f 2 2

K 1 0 0

2

d

d iti

2 7

S E R IE S A


s y s te m

2 n d e d itio n

A

D I A G R A M

2 7 S E R IE S

D IA G R A M

W IR IN G

s h e e t 1 o f 2 2

K 1 0 0

W IR IN G

S T A N D A R D

S T A N D A R D

W IR IN G

D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9

= O n -b o a r d c o m p u t e r v o lta g e s u p p ly / B

= E B S

v o lt a g e s u p p ly / C

= V e h i c le m a n a g e m e n t c o m p u t e r v o l t a g e s u p p l y s h e e t 2 o f 2 2


A 3 0 A 4 0 F 1 6 F 1 6 F 1 6 F 2 4 F 2 4 F 2 4 F 2 4 F 3 7 F 3 7 F 4 0 F 5 2 F 5 2 1 0 6 X X 1 5 5 X 1 6 4 X 4 6 4 — —

2 3 0 1 2 3 4 5 6 1 2 0 2 3 4 7 4 3 – 1

C e n t r a l c o m p u t e r 2 V e h i c l e m a n a g e m e n t c o m p u t e r F u s e , E B S ( A B S ) , t r a i l e r v o l t a g e s u p p l y F u s e , E B S ( A B S ) , p r e s s u r e c o n t r o l v a l v e v o l t a g e s u p p l y F u s e , E B S ( A B S ) , c o n tr o l F u s e , c e n t r a l o n - b o a r d c o m p u t e r c o n t i n u o u s p o s i t i v e F u s e , c e n t r a l o n - b o a r d c o m p u t e r ( t e r m i n a l 3 0 - 1 ) F u s e , c e n t r a l o n - b o a r d c o m p u t e r ( t e r m i n a l 3 0 - 2 ) F u s e , c e n t r a l o n - b o a r d c o m p u t e r ( t e r m i n a l 1 5 ) V o l t a g e s u p p l y , v e h i c le m a n a g e m e n t c o m p u t e r ( t e r m i n a l 3 0 ) V o l t a g e s u p p l y , v e h i c le m a n a g e m e n t c o m p u t e r ( t e r m i n a l 1 5 ) F u s e , s t e e r i n g l o c k F u s e , l in e 3 0 0 0 0 F u s e , l in e 3 0 0 0 0 J u m p e r o n c e n t r a l e l e c t r i c a l s y s t e m , i t e m 3 7 ( p i n 1 - 2 ) P l u g c o n n . , f r a m e , l e f t E a r t h i n g p o i n t , c a b , n e x t t o c e n t r a l e l e c t r i c a l s y s t e m P o t e n t i a l d i s t r i b u t o r , l i n e 5 9 1 0 4 — — — — — — — — — — — — — — — — — — — — — – E B S

K 1 0 0

2 n d e d itio n

2 8


D IA G R A M

S T A N D A R D

W IR IN G

D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9


= E B S




A 3 0 A 4 0 F 1 6 F 1 6 F 1 6 F 2 4 F 2 4 F 2 4 F 2 4 F 3 7 F 3 7 F 4 0 F 5 2 F 5 2 1 0 6 X X 1 5 5 X 1 6 4 X 4 6 4 — —

2 3 0 1 2 3 4 5 6 1 2 0 2 3 4 7 4 3 – 1

C e n t r a l c o m p u t e r 2 V e h i c l e m a n a g e m e n t c o m p u t e r F u s e , E B S ( A B S ) , t r a i l e r v o l t a g e s u p p l y F u s e , E B S ( A B S ) , p r e s s u r e c o n t r o l v a l v e v o l t a g e s u p p l y F u s e , E B S ( A B S ) , c o n tr o l F u s e , c e n t r a l o n - b o a r d c o m p u t e r c o n t i n u o u s p o s i t i v e F u s e , c e n t r a l o n - b o a r d c o m p u t e r ( t e r m i n a l 3 0 - 1 ) F u s e , c e n t r a l o n - b o a r d c o m p u t e r ( t e r m i n a l 3 0 - 2 ) F u s e , c e n t r a l o n - b o a r d c o m p u t e r ( t e r m i n a l 1 5 ) V o l t a g e s u p p l y , v e h i c le m a n a g e m e n t c o m p u t e r ( t e r m i n a l 3 0 ) V o l t a g e s u p p l y , v e h i c le m a n a g e m e n t c o m p u t e r ( t e r m i n a l 1 5 ) F u s e , s t e e r i n g l o c k F u s e , l in e 3 0 0 0 0 F u s e , l in e 3 0 0 0 0 J u m p e r o n c e n t r a l e l e c t r i c a l s y s t e m , i t e m 3 7 ( p i n 1 - 2 ) P l u g c o n n . , f r a m e , l e f t E a r t h i n g p o i n t , c a b , n e x t t o c e n t r a l e l e c t r i c a l s y s t e m P o t e n t i a l d i s t r i b u t o r , l i n e 5 9 1 0 4 — — — — — — — — — — — — — — — — — — — — — – E B S

K 1 0 0

2 n d e d itio n

2 8

S E R IE S A


= E B S


S T A N D A R D

W IR IN G

D I A G R A M


K 1 0 0

2

d

d iti

2 9

S E R IE S A


= E B S


2 n d e d itio n

A

D I A G R A M

2 9 S E R IE S

D IA G R A M

W IR IN G


K 1 0 0

W IR IN G

S T A N D A R D

S T A N D A R D

W IR IN G

D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9

= C h a s s i s e a r t h d i s t r i b u t o r s h e e t 3 o f 2 2


A 3 1 X X 1 5 X 1 5 X 1 5 X 1 5 X 1 6 X 1 6 X 1 8 X 1 8 X 1 8 X 1 9 X 2 5 — —

0 2 0 0 3 9 4 9 6 9 7 0 4 2 4 4 2 7 2 9 3 0 0 4 4 1 –

C e n t r a l c o m p u t e r 2 G r o u n d c o n n e c t i o n , e n g i n e P l u g c o n n . , p o t e n t i a l b u s h i n g - P l u g c o n n . , e n g i n e / E D C / g e a r b o x I P l u g c o n n . , s t o r a g e l o c k e r l i g h t i n g P l u g c o n n . , s t o r a g e l o c k e r l i g h t i n g E a r t h i n g p o i n t , c a b , b e h i n d i n s t r u m e n t p a n e l E a r t h i n g p o i n t , c a b , n e x t t o c e n t r a l e l e c t r i c a l s y s t e m C r i m p e d c o n n e c t o r , l i n e 3 1 0 0 0 C r i m p e d c o n n e c t o r , l i n e 3 1 0 0 0 C r i m p e d c o n n e c t o r , l i n e 3 1 0 0 2 T h r e a d e d p in M 6 ( m o t o r p o w e r b o x ) P o t e n t i a l d i s t r i b u t o r , 2 1 - p i n , l i n e 3 1 0 0 0 — — — — — — — — — — — — — — — — — — — — — – 1 D o o r m o d u l e d r i v e r ’ s s i d e 2 D o o r m o d u l e , c o - d r i v e r s i d e 3 D o o r M o d u l e

K 1 0 0

2 n d e d itio n

3 0


D IA G R A M

S T A N D A R D

W IR IN G

D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9



A 3 1 X X 1 5 X 1 5 X 1 5 X 1 5 X 1 6 X 1 6 X 1 8 X 1 8 X 1 8 X 1 9 X 2 5 — —

0 2 0 0 3 9 4 9 6 9 7 0 4 2 4 4 2 7 2 9 3 0 0 4 4 1 –

C e n t r a l c o m p u t e r 2 G r o u n d c o n n e c t i o n , e n g i n e P l u g c o n n . , p o t e n t i a l b u s h i n g - P l u g c o n n . , e n g i n e / E D C / g e a r b o x I P l u g c o n n . , s t o r a g e l o c k e r l i g h t i n g P l u g c o n n . , s t o r a g e l o c k e r l i g h t i n g E a r t h i n g p o i n t , c a b , b e h i n d i n s t r u m e n t p a n e l E a r t h i n g p o i n t , c a b , n e x t t o c e n t r a l e l e c t r i c a l s y s t e m C r i m p e d c o n n e c t o r , l i n e 3 1 0 0 0 C r i m p e d c o n n e c t o r , l i n e 3 1 0 0 0 C r i m p e d c o n n e c t o r , l i n e 3 1 0 0 2 T h r e a d e d p in M 6 ( m o t o r p o w e r b o x ) P o t e n t i a l d i s t r i b u t o r , 2 1 - p i n , l i n e 3 1 0 0 0 — — — — — — — — — — — — — — — — — — — — — – 1 D o o r m o d u l e d r i v e r ’ s s i d e 2 D o o r m o d u l e , c o - d r i v e r s i d e 3 D o o r M o d u l e

K 1 0 0

2 n d e d itio n

3 0

S E R IE S A

S T A N D A R D

W IR IN G

D I A G R A M


K 1 0 0

2

d

d iti

3 1

S E R IE S A

W IR IN G

D I A G R A M


K 1 0 0

2 n d e d itio n

3 1 S E R IE S

W IR IN G A

S T A N D A R D

D IA G R A M

S T A N D A R D

W IR IN G

D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9

= O n - b o a r d d ia g n o s is ( O B D ) d i a g n o s is s o c k e t / B

= Z D R

i n t e r f a c e ( F F R ) ( M D B , H G B ) s h e e t 4 o f 2 2


A 3 0 A 4 0 F 5 8 1 3 R 2 0 X X 1 5 5 X 1 9 9

2 3 2 4 0 9 6

X 2 5 4 4 — — – 1 2 3

C e n t r a l c o m p u t e r 2 V e h ic le m a n a g e m e n t c o m p u F u s e , v e h ic le m a n a g e m e n t c R e s is t o r b a n k , E D C C o n n e c t o r , d i a g n o s i s P l u g c o n n . , e n g i n e / E D C / g e a P lu g c o n n . , in t e r m e d ia t e s p c o m p u t e r ) P o t e n t ia l d i s tr ib u t o r 2 1 - p i n K — — — — — — — — — — — — — P o w e r t a k e - o f f I P o w e r t a k e - o f f I I C u s t o m e r - s p e c i e d c o n t r o l m

t e r o m p u t e r ( t e r m i n a l 1 5 ) , Z D R / i n t e r f a c e r b o x I V e e d g o v e r n o r - i n t e r f a c e ( v e h i c l e m a n a g e m e n t - l i n e — — — — — — — — – o d u l e ( c o n t r o l u n i t f o r e x t e r n a l d a t a e x c h a n g e )

K 1 0 0

2 n d e d itio n

3 2


D IA G R A M

S T A N D A R D

W IR IN G

D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9


= Z D R



A 3 0 A 4 0 F 5 8 1 3 R 2 0 X X 1 5 5 X 1 9 9

2 3 2 4 0 9 6

X 2 5 4 4 — — – 1 2 3

C e n t r a l c o m p u t e r 2 V e h ic le m a n a g e m e n t c o m p u F u s e , v e h ic le m a n a g e m e n t c R e s is t o r b a n k , E D C C o n n e c t o r , d i a g n o s i s P l u g c o n n . , e n g i n e / E D C / g e a P lu g c o n n . , in t e r m e d ia t e s p c o m p u t e r ) P o t e n t ia l d i s tr ib u t o r 2 1 - p i n K — — — — — — — — — — — — — P o w e r t a k e - o f f I P o w e r t a k e - o f f I I C u s t o m e r - s p e c i e d c o n t r o l m

t e r o m p u t e r ( t e r m i n a l 1 5 ) , Z D R / i n t e r f a c e r b o x I V e e d g o v e r n o r - i n t e r f a c e ( v e h i c l e m a n a g e m e n t - l i n e — — — — — — — — – o d u l e ( c o n t r o l u n i t f o r e x t e r n a l d a t a e x c h a n g e )

K 1 0 0

2 n d e d itio n

3 2

S E R IE S A


= Z D R

S T A N D A R D

W IR IN G

D I A G R A M


K 1 0 0

2

d

d iti

3 3

S E R IE S A


= Z D R

A

D I A G R A M

2 n d e d itio n

3 3 S E R IE S

D IA G R A M

W IR IN G


K 1 0 0

W IR IN G

S T A N D A R D

S T A N D A R D

W IR IN G

D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9

= F la m e s ta r t s y s te m

/ B = F a n c lu t c h / C

= E D C

c o o la n t te m p e r a tu r e / D

= C o o l a n t l e v e l / E = A i r  l t e r p r e s s u r e s e n s o r / F = P o w e r s t e e r i n g o i l le v e l s h e e t 5 o f 2 2


A A A A

3 4 4 4

0 0 0 3

2 3 7 5

1 2 4 B

X X X X

B 1 3 B 3 7 B 4 3 F 1 0 1 0 H K 1 0 1 0 R 1 0 X 1 5 4 1 5 5 1 8 4 1 9 0 1 0 Y Y 2 7

9 1 3 6 1 2 0 0 9 1 7 4 0 3

C e n t r a l c o m p u t e r 2 V e h i c l e m a n a g e m e n t c o m p u t e r I n s t r u m e n t a t i o n C o n t r o l u n i t , E D C T e m p e r a t u r e s e n s o r , c o o l a n t C o o l a n t l e v e l p r o b e S w i t c h , s t e e r i n g o i l r e s e r v o i r P r e s s u r e t r a n s m i t t e r , a i r  l t e r F u s e ,  a m e s t a r t s y s t e m C h e c k la m p ,  a m e s ta r t s y s te m R e l a y ,  a m e s t a r t s y s t e m F l a m e g l o w p l u g 1 G r o u n d c o n n e c t i o n , e n g i n e P l u g c o n n . , e n g i n e / E D C / g e a r b o x I P l u g c o n n . , e n g i n e / E D C / g e a r b o x I I P l u g c o n n . , p r e s s u r e t r a n s m i t t e r , a i r  l t e r T h r e a d e d p in M 6 ( m o t o r p o w e r b o x ) S o l e n o i d v a lv e ,  a m e s t a r t s y s te m M a g n e t i c c l u t c h , f a n

K 1 0 0

2 n d e d itio n

3 4


D IA G R A M

S T A N D A R D

W IR IN G

D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9



= E D C




A A A A

3 4 4 4

0 0 0 3

2 3 7 5

1 2 4 B

X X X X

B 1 3 B 3 7 B 4 3 F 1 0 1 0 H K 1 0 1 0 R 1 0 X 1 5 4 1 5 5 1 8 4 1 9 0 1 0 Y Y 2 7

9 1 3 6 1 2 0 0 9 1 7 4 0 3

C e n t r a l c o m p u t e r 2 V e h i c l e m a n a g e m e n t c o m p u t e r I n s t r u m e n t a t i o n C o n t r o l u n i t , E D C T e m p e r a t u r e s e n s o r , c o o l a n t C o o l a n t l e v e l p r o b e S w i t c h , s t e e r i n g o i l r e s e r v o i r P r e s s u r e t r a n s m i t t e r , a i r  l t e r F u s e ,  a m e s t a r t s y s t e m C h e c k la m p ,  a m e s ta r t s y s te m R e l a y ,  a m e s t a r t s y s t e m F l a m e g l o w p l u g 1 G r o u n d c o n n e c t i o n , e n g i n e P l u g c o n n . , e n g i n e / E D C / g e a r b o x I P l u g c o n n . , e n g i n e / E D C / g e a r b o x I I P l u g c o n n . , p r e s s u r e t r a n s m i t t e r , a i r  l t e r T h r e a d e d p in M 6 ( m o t o r p o w e r b o x ) S o l e n o i d v a lv e ,  a m e s t a r t s y s te m M a g n e t i c c l u t c h , f a n

K 1 0 0

2 n d e d itio n

3 4

S E R IE S A



= E D C


S T A N D A R D

W IR IN G

D I A G R A M


K 1 0 0

2

d

d iti

3 5

S E R IE S A



= E D C


2 n d e d itio n

A

D I A G R A M

3 5 S E R IE S

D IA G R A M

W IR IN G


K 1 0 0

W IR IN G

S T A N D A R D

S T A N D A R D

W IR IN G

D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9

= P r o b e fo r c lu t c h  u i d le v e l / B

= M u l t if u n c t io n a l s t e e r in g w h e e l / C

= S te e r in g c o lu m n s ta lk / D

= S u s t a i n e d - a c t i o n b r a k e / E = D i s t r i b u t o r , l i n e 6 0 0 2 8 s h e e t 6 o f 2 2


A A A A A

3 4 4 9 9

4 B F 5 1 H 1 1 S 1 9 X

0 0 0 4 4 3 8 4 3 7

X 4 3 9 X 4 6 4 — —

2 3 7 2 3

C e n t r a l c o m p u t e r 2 V e h i c l e m a n a g e m e n t c o m p u t e r I n s t r u m e n t a t i o n S t e e r i n g c o l u m n s t a l k , r e t a r d e r / g e a r b o x M u l t i f u n c t i o n a l s t e e r i n g w h e e l 4 C l u t c h  u i d l e v e l p r o b e 3 F u s e , v e h i c l e m a n a g e m e n t c o m p u t e r ( t e r m i n a l 1 5 ) , s w i t c h e s / s e n s o r s 5 C h e c k l a m p , r e t a r d e r 3 B u t t o n , s u s t a i n e d - a c t i o n b r a k e 2 P l u g c o n n . , p e d a l s , o u t s i d e 7 P l u g c o n n . , m u l t i f u n c t i o n a l s t e e r i n g w h e e l 4 P o t e n t i a l d i s t r i b u t o r , l i n e 6 0 0 2 8 – — — — — — — — — — — — — — — — — — — — — — – 1 V e h i c l e m a n a g e m e n t c o m p u t e r ( t e r m i n a l 1 5 ) , s w i t c h e s / s e n s o r s

K 1 0 0

2 n d e d itio n

3 6


D IA G R A M

S T A N D A R D

W IR IN G

D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9






A A A A A

3 4 4 9 9

4 B F 5 1 H 1 1 S 1 9 X

0 0 0 4 4 3 8 4 3 7

X 4 3 9 X 4 6 4 — —

2 3 7 2 3

C e n t r a l c o m p u t e r 2 V e h i c l e m a n a g e m e n t c o m p u t e r I n s t r u m e n t a t i o n S t e e r i n g c o l u m n s t a l k , r e t a r d e r / g e a r b o x M u l t i f u n c t i o n a l s t e e r i n g w h e e l 4 C l u t c h  u i d l e v e l p r o b e 3 F u s e , v e h i c l e m a n a g e m e n t c o m p u t e r ( t e r m i n a l 1 5 ) , s w i t c h e s / s e n s o r s 5 C h e c k l a m p , r e t a r d e r 3 B u t t o n , s u s t a i n e d - a c t i o n b r a k e 2 P l u g c o n n . , p e d a l s , o u t s i d e 7 P l u g c o n n . , m u l t i f u n c t i o n a l s t e e r i n g w h e e l 4 P o t e n t i a l d i s t r i b u t o r , l i n e 6 0 0 2 8 – — — — — — — — — — — — — — — — — — — — — — – 1 V e h i c l e m a n a g e m e n t c o m p u t e r ( t e r m i n a l 1 5 ) , s w i t c h e s / s e n s o r s

K 1 0 0

2 n d e d itio n

3 6

S E R IE S A




K 1 0 0

2

d

d iti

S T A N D A R D

W IR IN G

D I A G R A M


3 7

S E R IE S A




K 1 0 0

A

D IA G R A M

W IR IN G

D I A G R A M


2 n d e d itio n

3 7 S E R IE S

W IR IN G

S T A N D A R D

S T A N D A R D

W IR IN G

D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9

= A ir d r y e r/b r a k e c ir c u it m o n i t o r in g / B

= C a b lo c k c h e c k / C

= F u e l g a u g e s h e e t 7 o f 2 2

D a t e : 0 9 . 2 0 0 6 L e g e n d A 1 0 0 C e n t r a l e l e c t r i cc a l s y s t e m

A 3 0 A 4 0 B 1 0 B 1 0 B 1 0 B 5 0 F 3 7 G 1 0 1 0 H H 1 4 1 0 P P 1 0 P 1 0 1 0 R 1 9 S S 1 9 1 5 4 X X 1 5 5 X 1 6 4 X 3 4 3 — —

2 7 1 2 3 2 5 1 8 9 2 3 4 7 8 9 4 7 4 7 – 1 2

C e n t r a l c o m p u t e r 2 I n s t r u m e n t a t i o n S e n s o r , r e s e r v o i r p r e s s u r e , b r a k e c i r r c u i t 1 S e n s o r , r e s e r v o i r p r e s s u r e , b r a k e c i r r c u i t 2 S e n s o r , f u e l l ee v e l 1 S e n s o r , r e s e r v o i r p r e s s u r e , b r a k e c i r r c u i t 3 F u s e ( t e r m i nn a l 1 5 ) , c a b , o u t s i d e B a t t e r y 2 C h e c k l a m p , r e s e r v o ir p r e s s u r e C h e c k la m p , c a b lo c k I n d i c a t i n g i n n s t r u m e n t , r e s e r v o i r p r e s s u r e , b r a k e I n d i c a t i n g i n n s t r u m e n t , r e s e r v o i r p r e s s u r e , b r a k e I n d i c a t i n g i n n s t r u m e n t , f u e l l e v e l A i r d r y e r S w i t c h , c a b lo c k , r i g h t S w i t c h , c a b lo c k , l e f t P lu g c o n n . , f r a m e I I I P l u g c o n n . , f r a m e , l e f t E a r t h i n g p o i n n t , c a b , n e x t t o c e n t r a l e l e c t r i c a l s y P lu g c o n n ., f r a m e I I — — — — — — — — — — — — — — — — — — — — — T P M E C A S

c i r c u i t 1 c i r c u i t 2

s t e m –

K 1 0 0

2 n d e d itio n

3 8


D IA G R A M

S T A N D A R D

W IR IN G

D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9





A 3 0 A 4 0 B 1 0 B 1 0 B 1 0 B 5 0 F 3 7 G 1 0 1 0 H H 1 4 1 0 P P 1 0 P 1 0 1 0 R 1 9 S S 1 9 1 5 4 X X 1 5 5 X 1 6 4 X 3 4 3 — —

2 7 1 2 3 2 5 1 8 9 2 3 4 7 8 9 4 7 4 7 – 1 2

C e n t r a l c o m p u t e r 2 I n s t r u m e n t a t i o n S e n s o r , r e s e r v o i r p r e s s u r e , b r a k e c i r r c u i t 1 S e n s o r , r e s e r v o i r p r e s s u r e , b r a k e c i r r c u i t 2 S e n s o r , f u e l l ee v e l 1 S e n s o r , r e s e r v o i r p r e s s u r e , b r a k e c i r r c u i t 3 F u s e ( t e r m i nn a l 1 5 ) , c a b , o u t s i d e B a t t e r y 2 C h e c k l a m p , r e s e r v o ir p r e s s u r e C h e c k la m p , c a b lo c k I n d i c a t i n g i n n s t r u m e n t , r e s e r v o i r p r e s s u r e , b r a k e I n d i c a t i n g i n n s t r u m e n t , r e s e r v o i r p r e s s u r e , b r a k e I n d i c a t i n g i n n s t r u m e n t , f u e l l e v e l A i r d r y e r S w i t c h , c a b lo c k , r i g h t S w i t c h , c a b lo c k , l e f t P lu g c o n n . , f r a m e I I I P l u g c o n n . , f r a m e , l e f t E a r t h i n g p o i n n t , c a b , n e x t t o c e n t r a l e l e c t r i c a l s y P lu g c o n n ., f r a m e I I — — — — — — — — — — — — — — — — — — — — — T P M E C A S

c i r c u i t 1 c i r c u i t 2

s t e m –

K 1 0 0

2 n d e d itio n

3 8

S E R IE S A



S T A N D A R D

W IR IN G

D I A G R A M


K 1 0 0

2

d

d iti

3 9

S E R IE S A



2 n d e d itio n

A

= S ig n a l h o r n / B

D I A G R A M

3 9 S E R IE S

D IA G R A M

W IR IN G


K 1 0 0

W IR IN G

S T A N D A R D

S T A N D A R D

W IR IN G

D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9 = F u e l  lte r h e a te r p r e p a ra tio n / C

= E n g in e b r a k e / D

= O il le v e l s e n s o r / E

= M -C A N

/ F = O u t s id e t e m p e r a t u r e s h e e t 8 o f 2 2


A 3 0 2 A 4 0 3 A 4 0 7 B 2 6 9 B 2 7 0 F 8 9 8 G 1 0 1 1 0 2 H H 1 6 9 H 3 4 5 1 1 3 P 1 0 8 S 1 5 4 5 X X 1 5 4 7 X 1 5 5 1 X 1 5 5 7 X 1 5 5 9 X 1 6 4 4 X 1 9 6 7 X 3 3 8 5 2 8 1 Y

C e n t r a l c o m p u t e r 2 V e h i c l e m a n a g e m e n t c o m p u t e r I n s t r u m e n t a t i o n T e m p e r a t u r e s e n s o r , o u t s i d e a i r O i l l e v e l s e n s o r F u s e , s i g n a l h o r n B a t t e r y 2 S ig n a l h o r n H o r n ( t w o - t o n e ) C h e c k l a m p , f u e l  l t e r h e a t e r G a u g e , o u t s id e t e m p e r a t u r e S t e e r i n g c o l u m n s t a l k ( t u r n i n n d i c a t o r s , w i p p e r s , h e a d l ii g g h t s ) P l u g c o n n . , f r o n t e n d , l e e f t P l u g c o n n . , d o o r , l e f t P l u g c o n n . , e n g i n n e / E D C / g e a r b o x I I P l u g c o n n . , f r a m e , l e f t P l u g c o n n . , e n g i n n e / E D C / g e a r b o x I V E a r t h i n g p o i n n t , c a b , n e x t t o c e n t r a l e l e c t r i c a l s y s t e m P l u g c o n n . , 1 , c o m b i n a t i o n s t e e r i n g c o l u m n s t a l k P l u g c o n n . , e n g i n e b r a k e /E V B S o l e n o i d v a lv e , e n g i n e b r a k e / E V B

K 1 0 0

2 n d e d itio n

4 0


D IA G R A M

= S ig n a l h o r n / B

S T A N D A R D

W IR IN G

D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9 = F u e l  lte r h e a te r p r e p a ra tio n / C



= M -C A N



A 3 0 2 A 4 0 3 A 4 0 7 B 2 6 9 B 2 7 0 F 8 9 8 G 1 0 1 1 0 2 H H 1 6 9 H 3 4 5 1 1 3 P 1 0 8 S 1 5 4 5 X X 1 5 4 7 X 1 5 5 1 X 1 5 5 7 X 1 5 5 9 X 1 6 4 4 X 1 9 6 7 X 3 3 8 5 2 8 1 Y

C e n t r a l c o m p u t e r 2 V e h i c l e m a n a g e m e n t c o m p u t e r I n s t r u m e n t a t i o n T e m p e r a t u r e s e n s o r , o u t s i d e a i r O i l l e v e l s e n s o r F u s e , s i g n a l h o r n B a t t e r y 2 S ig n a l h o r n H o r n ( t w o - t o n e ) C h e c k l a m p , f u e l  l t e r h e a t e r G a u g e , o u t s id e t e m p e r a t u r e S t e e r i n g c o l u m n s t a l k ( t u r n i n n d i c a t o r s , w i p p e r s , h e a d l ii g g h t s ) P l u g c o n n . , f r o n t e n d , l e e f t P l u g c o n n . , d o o r , l e f t P l u g c o n n . , e n g i n n e / E D C / g e a r b o x I I P l u g c o n n . , f r a m e , l e f t P l u g c o n n . , e n g i n n e / E D C / g e a r b o x I V E a r t h i n g p o i n n t , c a b , n e x t t o c e n t r a l e l e c t r i c a l s y s t e m P l u g c o n n . , 1 , c o m b i n a t i o n s t e e r i n g c o l u m n s t a l k P l u g c o n n . , e n g i n e b r a k e /E V B S o l e n o i d v a lv e , e n g i n e b r a k e / E V B

K 1 0 0

2 n d e d itio n

4 0

S E R IE S A

= S ig n a l h o rn / B

= F u e l  lte r h e a te r p r e p a ra tio n / C



K 1 0 0

2

d

d iti

= M -C A N

S T A N D A R D

W IR IN G

D I A G R A M


4 1

S E R IE S A

= S ig n a l h o rn / B

= F u e l  lte r h e a te r p r e p a ra tio n / C



K 1 0 0

= M -C A N

A

D IA G R A M

W IR IN G

D I A G R A M


2 n d e d itio n

4 1 S E R IE S

W IR IN G

S T A N D A R D

S T A N D A R D

W IR IN G

D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9

= H e a te r b lo w e r /a ir -c o n d itio n in g

s y s te m

s h e e t 9 o f 2 2


A 2 5 0 A 3 0 2 A 4 7 4 2 0 3 B F 1 3 1 F 3 9 7 1 5 5 1 X X 1 6 4 2 1 1 4 Y Y 1 1 7 — — – 1 2 3 4 5 6 7 8 9

C o n t r o l u n i t , h e a t e r / a i r c o n d i t i o n e r C e n t r a l c o m p u t e r 2 C o n t r o l s , c a b h e a t i n g w i t h o u t / w i t h a i r c o n d i t i o n e r C o o l a n t t a n k w i t h h i g h / l o w - p r e s s u r e s w i t c h F u s e , h e a t e r b l o w e r F u s e , f r o n t e n d h e a t e r , a i r - c o n d i t i o n i n g s y s t e m P l u g c o n n . , e n g i n e / E D C / g e a r b o x I I E a r t h i n g p o i n t , c a b , b e h i n d i n s t r u m e n t a t i o n M a g n e t i c c l u t c h , c o m p r e s s o r E P v a l v e , f r o n t a i r - c o n d i t i o n i n g s y s t e m — — — — — — — — — — — — — — — — — — — — — – B l o w e r r e g u l a t o r B l o w e r T e m p e r a t u r e A i r d i s t r i b u t i o n S i d e n o z z l e s F r e s h / r e c i r c u l a t i n g a i r H e a t e x c h a n g e r s e n s o r O u t s id e t e m p e r a t u r e s e n s o r E v a p o r a t o r s e n s o r

K 1 0 0

2 n d e d itio n

4 2


D IA G R A M

S T A N D A R D

W IR IN G

D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9


s y s te m

s h e e t 9 o f 2 2


A 2 5 0 A 3 0 2 A 4 7 4 2 0 3 B F 1 3 1 F 3 9 7 1 5 5 1 X X 1 6 4 2 1 1 4 Y Y 1 1 7 — — – 1 2 3 4 5 6 7 8 9

C o n t r o l u n i t , h e a t e r / a i r c o n d i t i o n e r C e n t r a l c o m p u t e r 2 C o n t r o l s , c a b h e a t i n g w i t h o u t / w i t h a i r c o n d i t i o n e r C o o l a n t t a n k w i t h h i g h / l o w - p r e s s u r e s w i t c h F u s e , h e a t e r b l o w e r F u s e , f r o n t e n d h e a t e r , a i r - c o n d i t i o n i n g s y s t e m P l u g c o n n . , e n g i n e / E D C / g e a r b o x I I E a r t h i n g p o i n t , c a b , b e h i n d i n s t r u m e n t a t i o n M a g n e t i c c l u t c h , c o m p r e s s o r E P v a l v e , f r o n t a i r - c o n d i t i o n i n g s y s t e m — — — — — — — — — — — — — — — — — — — — — – B l o w e r r e g u l a t o r B l o w e r T e m p e r a t u r e A i r d i s t r i b u t i o n S i d e n o z z l e s F r e s h / r e c i r c u l a t i n g a i r H e a t e x c h a n g e r s e n s o r O u t s id e t e m p e r a t u r e s e n s o r E v a p o r a t o r s e n s o r

K 1 0 0

2 n d e d itio n

4 2

S E R IE S A


s y s te m

S T A N D A R D

W IR IN G

D I A G R A M

s h e e t 9 o f 2 2

K 1 0 0

2

d

d iti

4 3

S E R IE S A


s y s te m

2 n d e d itio n

A

D I A G R A M

4 3 S E R IE S

D IA G R A M

W IR IN G

s h e e t 9 o f 2 2

K 1 0 0

W IR IN G

S T A N D A R D

S T A N D A R D

W IR IN G

D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9

= W a s h e rs a n d w ip e r s s h e e t 1 0 o f 2 2


A 3 0 A 4 0 F 1 1 3 8 H K 1 0 M 1 0 M 1 0 1 0 S 1 5 4 X X 1 5 4 X 2 0 0

2 7 2 2 6 2 3 8 3 5 3

C e n t r a l c o m p u t e r 2 I n s t r u m e n t a t i o n F u s e , w in d s c r e e n w a s h e rs a C h e c k l a m p , c l e a n i n g w a t e r R e l a y , w i p e r i n t e r v a l W i n d s c r e e n w i p e r m o t o r W in d s c r e e n w a s h e r p u m p S te e r in g c o lu m n s ta lk ( tu r n in P l u g c o n n ., w i p e r m o t o r P l u g c o n n . , f r o n t e n d , l e f t P l u g c o n n . , 2 n d c o m b i n a t i o n

n d w i p e r s l e v e l

d i c a t o r s , w i p e r s a n d h e a d l i g h t s ) s t e e r i n g c o l u m n s t a l k

K 1 0 0

2 n d e d itio n

4 4


D IA G R A M

S T A N D A R D

W IR IN G

D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9



A 3 0 A 4 0 F 1 1 3 8 H K 1 0 M 1 0 M 1 0 1 0 S 1 5 4 X X 1 5 4 X 2 0 0

2 7 2 2 6 2 3 8 3 5 3

C e n t r a l c o m p u t e r 2 I n s t r u m e n t a t i o n F u s e , w in d s c r e e n w a s h e rs a C h e c k l a m p , c l e a n i n g w a t e r R e l a y , w i p e r i n t e r v a l W i n d s c r e e n w i p e r m o t o r W in d s c r e e n w a s h e r p u m p S te e r in g c o lu m n s ta lk ( tu r n in P l u g c o n n ., w i p e r m o t o r P l u g c o n n . , f r o n t e n d , l e f t P l u g c o n n . , 2 n d c o m b i n a t i o n

n d w i p e r s l e v e l

d i c a t o r s , w i p e r s a n d h e a d l i g h t s ) s t e e r i n g c o l u m n s t a l k

K 1 0 0

2 n d e d itio n

4 4

S E R IE S A

S T A N D A R D

W IR IN G

D I A G R A M


K 1 0 0

2

d

d iti

4 5

S E R IE S A

W IR IN G

D I A G R A M


K 1 0 0

2 n d e d itio n

4 5 S E R IE S

W IR IN G A

S T A N D A R D

D IA G R A M

= Im m o b ilis e r / B

S T A N D A R D

W IR IN G

D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9 = G e a r s e le c to r le v e r / C

= V e h ic le m a n a g e m e n t c o m p u t e r d i a g n o s is / D

= A c c e l e r a t o r p e d a l u n it s h e e t 1 1 o f 2 2


A A A A

3 4 4 4

0 0 1 7

2 3 0 7

F 2 3 6 4 7 7 S 1 5 5 9 X

X 1 6 0 4 X 1 9 7 1

C V A E F S P P P

e n t r a l c o m p u t e r 2 e h i c l e m a n a g e m e n t c o m p u t e r c c e l e r a t o r p e d a l u n i t C U , i m m o b i l i s e r u s e , e n g i n e c o n t r o l ( t e r m i n a l 1 5 ) w i t c h , g e a r s e l e c t o r l e v e r l u g c o n n . , e n g i n e / E D C / g e a r b o x I V l u g c o n n . , s w i t c h i n g e a r s h i f t k n o b l u g c o n n . , i m m o b i l i s e r

K 1 0 0

2 n d e d itio n

4 6


D IA G R A M


S T A N D A R D

W IR IN G

D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9 = G e a r s e le c to r le v e r / C




A A A A

3 4 4 4

0 0 1 7

2 3 0 7

F 2 3 6 4 7 7 S 1 5 5 9 X

X 1 6 0 4 X 1 9 7 1

C V A E F S P P P

e n t r a l c o m p u t e r 2 e h i c l e m a n a g e m e n t c o m p u t e r c c e l e r a t o r p e d a l u n i t C U , i m m o b i l i s e r u s e , e n g i n e c o n t r o l ( t e r m i n a l 1 5 ) w i t c h , g e a r s e l e c t o r l e v e r l u g c o n n . , e n g i n e / E D C / g e a r b o x I V l u g c o n n . , s w i t c h i n g e a r s h i f t k n o b l u g c o n n . , i m m o b i l i s e r

K 1 0 0

2 n d e d itio n

4 6

S E R IE S A


= G e a r s e le c to r le v e r / C


K 1 0 0

2

d

d iti

S T A N D A R D

W IR IN G

D I A G R A M


4 7

S E R IE S A


= G e a r s e le c to r le v e r / C


K 1 0 0

A

D IA G R A M

W IR IN G

D I A G R A M


2 n d e d itio n

4 7 S E R IE S

W IR IN G

S T A N D A R D

S T A N D A R D

W IR IN G

D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9

= V o lta g e s u p p ly + 1 5 / B

= I n s t r u m e n t a t i o n / t a c h o g r a p h s h e e t 1 2 o f 2 2


2 D o o r m o d u l e

A 3 0 2 A 4 0 7 A 4 0 8 B 1 1 0 F 3 7 6 F 3 9 8 F 4 1 2 1 1 1 H H 1 6 2 1 0 1 P P 1 0 6 P 1 0 7 P 1 1 6 P 1 1 8 P 1 1 9 P 1 2 0 1 5 3 5 X X 1 5 3 6 X 1 5 3 7 X 1 6 4 2 X 1 6 4 4 X 1 8 3 3 X 3 1 1 8 X 3 1 1 9 X 4 3 6 6 X 4 6 4 5 X 4 6 5 9 X 4 6 6 0 X 4 6 6 3 X 4 7 3 2 — — –

C e n t r a l c o m p u t e r 2 I n s t r u m e n t a t i o n T a c h o g r a p h P u l s e g e n e r a t o r , t a c h o g r a p h F u s e , c a b , i n s i d e ( t e r m i n a l 1 5 ) F u s e , i n s t r u m e n t a t i o n , t a c h o g r a p h ( t e r m i n a l 1 5 ) F u s e , i n s t r u m e n t a t i o n , t a c h o g r a p h ( t e r m i n a l 3 0 ) C e n t r a l w a r n i n g l i g h t S T O P W a r n in g b u z z e r R e v c o u n te r C o o l i n g w a t e r t e m p e r a t u r e g a u g e C lo c k C h a r g e p r e s s u r e i n d i c a t o r S p e e d o m e te r M i l e a g e i n d i c a t o r D i s p l a y , t r i p m i l e a g e i n d i c a t o r P l u g c o n n ., T a c h o g r a p h P l u g c o n n . , t a c h o g r a p h P l u g c o n n . , s p e e d o m e t e r s e n s o r E a r t h i n g p o i n t , c a b , b e h i n d i n s t r u m e n t p a n e l E a r t h i n g p o i n t , c a b , n e x t t o c e n t r a l e l e c t r i c a l s y s t e m C r i m p e d c o n n e c t o r , l i n e 1 6 0 0 0 P l u g c o n n . , d i s t r i b u t o r , l i n e 3 0 0 0 0 P l u g c o n n . , d i s t r i b u t o r , l i n e 3 0 0 0 9 P l u g c o n n . , p u l s e d i s t r i b u t o r - t a c h o g r a p h P o t e n t i a l d i s t r i b u t o r , l i n e 1 6 0 0 0 P l u g c o n n . , V - s ig n a l , l i n e 1 6 5 0 0 P l u g c o n n . , 4 p u l s e s / m e t e r , l i n e 1 6 5 0 7 P l u g c o n n . , a d a p t a t i o n , V - s i g n a l , l i n e 1 6 5 1 4 P o t e n t i a l d i s t r i b u t o r , l i n e 1 6 0 0 0 , s w i t c h l i g h t i n g — — — — — — — — — — — — — — — — — — — — — – 1 A u x i l i a r y h e a t e r K 1 0 0

2 n d e d itio n

4 8


D IA G R A M

S T A N D A R D

W IR IN G

D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9




2 D o o r m o d u l e

A 3 0 2 A 4 0 7 A 4 0 8 B 1 1 0 F 3 7 6 F 3 9 8 F 4 1 2 1 1 1 H H 1 6 2 1 0 1 P P 1 0 6 P 1 0 7 P 1 1 6 P 1 1 8 P 1 1 9 P 1 2 0 1 5 3 5 X X 1 5 3 6 X 1 5 3 7 X 1 6 4 2 X 1 6 4 4 X 1 8 3 3 X 3 1 1 8 X 3 1 1 9 X 4 3 6 6 X 4 6 4 5 X 4 6 5 9 X 4 6 6 0 X 4 6 6 3 X 4 7 3 2 — — –

C e n t r a l c o m p u t e r 2 I n s t r u m e n t a t i o n T a c h o g r a p h P u l s e g e n e r a t o r , t a c h o g r a p h F u s e , c a b , i n s i d e ( t e r m i n a l 1 5 ) F u s e , i n s t r u m e n t a t i o n , t a c h o g r a p h ( t e r m i n a l 1 5 ) F u s e , i n s t r u m e n t a t i o n , t a c h o g r a p h ( t e r m i n a l 3 0 ) C e n t r a l w a r n i n g l i g h t S T O P W a r n in g b u z z e r R e v c o u n te r C o o l i n g w a t e r t e m p e r a t u r e g a u g e C lo c k C h a r g e p r e s s u r e i n d i c a t o r S p e e d o m e te r M i l e a g e i n d i c a t o r D i s p l a y , t r i p m i l e a g e i n d i c a t o r P l u g c o n n ., T a c h o g r a p h P l u g c o n n . , t a c h o g r a p h P l u g c o n n . , s p e e d o m e t e r s e n s o r E a r t h i n g p o i n t , c a b , b e h i n d i n s t r u m e n t p a n e l E a r t h i n g p o i n t , c a b , n e x t t o c e n t r a l e l e c t r i c a l s y s t e m C r i m p e d c o n n e c t o r , l i n e 1 6 0 0 0 P l u g c o n n . , d i s t r i b u t o r , l i n e 3 0 0 0 0 P l u g c o n n . , d i s t r i b u t o r , l i n e 3 0 0 0 9 P l u g c o n n . , p u l s e d i s t r i b u t o r - t a c h o g r a p h P o t e n t i a l d i s t r i b u t o r , l i n e 1 6 0 0 0 P l u g c o n n . , V - s ig n a l , l i n e 1 6 5 0 0 P l u g c o n n . , 4 p u l s e s / m e t e r , l i n e 1 6 5 0 7 P l u g c o n n . , a d a p t a t i o n , V - s i g n a l , l i n e 1 6 5 1 4 P o t e n t i a l d i s t r i b u t o r , l i n e 1 6 0 0 0 , s w i t c h l i g h t i n g — — — — — — — — — — — — — — — — — — — — — – 1 A u x i l i a r y h e a t e r K 1 0 0

2 n d e d itio n

4 8

S E R IE S A


S T A N D A R D

W IR IN G

D I A G R A M


K 1 0 0

2

d

d iti

4 9

S E R IE S A


2 n d e d itio n

A

D I A G R A M

4 9 S E R IE S

D IA G R A M

W IR IN G


K 1 0 0

W IR IN G

S T A N D A R D

S T A N D A R D

W IR IN G

D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9

= L ig h tin g le a r n in g r o u tin e / B

= L i g h t c ir c u i t / C

= F o g la m p /r e a r fo g la m p c ir c u it / D

= C ig a r e t te lig h t e r / E = A s h t r a y lig h t in g

s h e e t 1 3 o f 2 2


A 3 0 A 4 0 1 7 E F 1 5 R 1 0 3 2 S S 1 11 1 5 4 X X 1 5 8 X 1 6 4 X 4 6 5

2 7 7 8 8 9 2 0 7 2 8

C e n t r a l c o m p u t e r 2 I n s t r u m e n t a t i o n L i g h t i n g , a s h t r a y , l e f t F u s e , c i g a r e t t e l i g h t e r C i g a r e t t e l i g h t e r B u t t o n , l i g h t i n g l e a r n i n g r o u t i n e R o t a r y l i g h t s w i t c h w i t h r e a r f o g l a m p P l u g c o n n . , f r a m e I P l u g c o n n . , c o n n e c t i o n , t r a i l e r s o c k e t 2 E a r t h i n g p o i n t , c a b , b e h i n d i n s t r u m e n t a t i o n P l u g c o n n . , c i g a r e t t e l i g h t e r / a s h t r a y l i g h t i n g N o t e

I n s t a l l a t i o n p o s i t i o n o f X 1 5 8 7 f o r s e m i t r a i l e r i s E 8 !

K 1 0 0

2 n d e d itio n

5 0


D IA G R A M

S T A N D A R D

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D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9





s h e e t 1 3 o f 2 2


A 3 0 A 4 0 1 7 E F 1 5 R 1 0 3 2 S S 1 11 1 5 4 X X 1 5 8 X 1 6 4 X 4 6 5

2 7 7 8 8 9 2 0 7 2 8

C e n t r a l c o m p u t e r 2 I n s t r u m e n t a t i o n L i g h t i n g , a s h t r a y , l e f t F u s e , c i g a r e t t e l i g h t e r C i g a r e t t e l i g h t e r B u t t o n , l i g h t i n g l e a r n i n g r o u t i n e R o t a r y l i g h t s w i t c h w i t h r e a r f o g l a m p P l u g c o n n . , f r a m e I P l u g c o n n . , c o n n e c t i o n , t r a i l e r s o c k e t 2 E a r t h i n g p o i n t , c a b , b e h i n d i n s t r u m e n t a t i o n P l u g c o n n . , c i g a r e t t e l i g h t e r / a s h t r a y l i g h t i n g N o t e


K 1 0 0

2 n d e d itio n

5 0

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K 1 0 0

2

d


d iti

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W IR IN G

D I A G R A M

s h e e t 1 3 o f 2 2

5 1

S E R IE S A




K 1 0 0


A

D IA G R A M

= P a r k in g

W IR IN G

D I A G R A M

s h e e t 1 3 o f 2 2

2 n d e d itio n

5 1 S E R IE S

W IR IN G

S T A N D A R D

S T A N D A R D

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D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9

lig h ts , le ft / B

= P a r k in g

l i g h t s , r i g h t s h e e t 1 4 o f 2 2


A A A A A

1 1 1 1 3

7 8 9 0 2

H H T T C

1 0 8 E

P P O O O O T T F F B R P

E 1 E 1 E 1 E 1 E 1 E 1 E 1 F 1 F 1 G 1 1 K 3 X X 1 5 X 1 5 X 1 5 X 1 5 X 1 5 X 1 5 — —

8 8 8 9 0

0 9 1 4 1 5 1 6 1 7 1 8 1 9 1 7 1 8 0 1 1 6 9 5 4 0 4 4 4 5 5 0 5 7 8 6 –

P P P P P P —

1 S 2 S

e a d l i g h t , l e f t e a d l i g h t , r i g h t a i l l i g h t , l e f t a i l l i g h t , r i g h t e n t r a l c o m p u t e r 2 a r k i n g l i g h t , r i g h t a r k i n g l i g h t , l e f t u t l i n e l i g h t , f r o n t r i g h t u t l i n e l i g h t , f r o n t l e f t u t l i n e l i g h t , r e a r r i g h t u t l i n e l i g h t , r e a r l e f t a i l l i g h t , r i g h t a i l l i g h t , l e f t u s e , p a r k i n g / t a i l l i g h t , l e f t u s e , p a r k i n g / t a i l l i g h t , r i g h t a t t e r y 2 e l a y , p a r k i n g / t a i l l i g h t l u g c o n n . , o u t l i n e l i g h t a n d i n t e r i o r l i g h t , l e f t a n d r i g h t l u g c o n n ., f r a m e I lu g c o n n ., f r a m e I I I l u g c o n n . , f r o n t e n d , l e f t l u g c o n n . , f r o n t e n d , r i g h t l u g c o n n . , f r a m e , l e f t l u g c o n n . , c o n n e c t i o n , t r a i l e r s o c k e t 1 — — — — — — — — — — — — — — — — — — — — – i d e m a r k e r l i g h t s , l e f t i d e m a r k e r l i g h t s , r i g h t N o t e


K 1 0 0

2 n d e d itio n

5 2


D IA G R A M

= P a r k in g

S T A N D A R D

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N O . 8 1 .9 9 1 9 2 .3 0 7 9


= P a r k in g



A A A A A

1 1 1 1 3

7 8 9 0 2

H H T T C

1 0 8 E

P P O O O O T T F F B R P

E 1 E 1 E 1 E 1 E 1 E 1 E 1 F 1 F 1 G 1 1 K 3 X X 1 5 X 1 5 X 1 5 X 1 5 X 1 5 X 1 5 — —

8 8 8 9 0

0 9 1 4 1 5 1 6 1 7 1 8 1 9 1 7 1 8 0 1 1 6 9 5 4 0 4 4 4 5 5 0 5 7 8 6 –

P P P P P P —

1 S 2 S

e a d l i g h t , l e f t e a d l i g h t , r i g h t a i l l i g h t , l e f t a i l l i g h t , r i g h t e n t r a l c o m p u t e r 2 a r k i n g l i g h t , r i g h t a r k i n g l i g h t , l e f t u t l i n e l i g h t , f r o n t r i g h t u t l i n e l i g h t , f r o n t l e f t u t l i n e l i g h t , r e a r r i g h t u t l i n e l i g h t , r e a r l e f t a i l l i g h t , r i g h t a i l l i g h t , l e f t u s e , p a r k i n g / t a i l l i g h t , l e f t u s e , p a r k i n g / t a i l l i g h t , r i g h t a t t e r y 2 e l a y , p a r k i n g / t a i l l i g h t l u g c o n n . , o u t l i n e l i g h t a n d i n t e r i o r l i g h t , l e f t a n d r i g h t l u g c o n n ., f r a m e I lu g c o n n ., f r a m e I I I l u g c o n n . , f r o n t e n d , l e f t l u g c o n n . , f r o n t e n d , r i g h t l u g c o n n . , f r a m e , l e f t l u g c o n n . , c o n n e c t i o n , t r a i l e r s o c k e t 1 — — — — — — — — — — — — — — — — — — — — – i d e m a r k e r l i g h t s , l e f t i d e m a r k e r l i g h t s , r i g h t N o t e


K 1 0 0

2 n d e d itio n

5 2

S E R IE S A

= P a r k in g


= P a r k in g

S T A N D A R D

W IR IN G

D I A G R A M


K 1 0 0

2

d

d iti

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S E R IE S A

= P a r k in g


= P a r k in g

2 n d e d itio n

A

D I A G R A M

5 3 S E R IE S

D IA G R A M

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K 1 0 0

W IR IN G

S T A N D A R D

S T A N D A R D

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D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9

= H e a d lig h t  a s h / B

= H e a d lig h t lo w

b e a m , h e a d l ig h t h i g h b e a m , d a y t im e d r iv in g lig h t s / C

= H e a d lig h t b e a m

r e g u l a t o r s h e e t 1 5 o f 2 2


A A A A

1 1 3 4

8 8 0 0 1 1 E E 1 1 E 1 1 E 1 1 E 4 7 E 4 7 1 2 H R 1 0 1 0 S 1 5 4 X X 1 5 5 X 1 6 4 X 1 6 4 X 1 9 6 — —

7 8 2 7 0 1 2 3 8 9 9 9 8 5 0 2 4 7 – 1

H e a d l i g h t , l e f t H e a d l i g h t , r i g h t C e n t r a l c o m p u t e r 2 I n s t r u m e n t a t i o n H e a d l i g h t l o w b e a m , r i g h t H e a d l i g h t l o w b e a m , l e f t H e a d l i g h t h i g h b e a m , r i g h t H e a d l i g h t h i g h b e a m , l e f t D a y t i m e d r i v i n g l i g h t s , r i g h t D a y t i m e d r i v i n g l i g h t s , l e f t C h e c k l a m p , h e a d l i g h t h i g h b e a m P o t e n t i o m e t e r , h e a d l i g h t b e a m r e g u l a t o r S t e e r i n g c o l u m n s t a l k ( t u r n i n d i c a t o r s , w i p e r s a n d h e a d l i g h t s ) P l u g c o n n . , f r o n t e n d , l e f t P l u g c o n n . , f r o n t e n d , r i g h t E a r t h i n g p o i n t , c a b b e h i n d i n s t r u m e n t p a n e l E a r t h i n g p o i n t , c a b , n e x t t o c e n t r a l e l e c t r i c a l s y s t e m P l u g c o n n . , 1 c o m b i n a t i o n s t e e r i n g c o lu m n s t a l k — — — — — — — — — — — — — — — — — — — — — – f o r h e a d l i g h t s

K 1 0 0

2 n d e d itio n

5 4


D IA G R A M

S T A N D A R D

W IR IN G

D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9







A A A A

1 1 3 4

8 8 0 0 1 1 E E 1 1 E 1 1 E 1 1 E 4 7 E 4 7 1 2 H R 1 0 1 0 S 1 5 4 X X 1 5 5 X 1 6 4 X 1 6 4 X 1 9 6 — —

7 8 2 7 0 1 2 3 8 9 9 9 8 5 0 2 4 7 – 1

H e a d l i g h t , l e f t H e a d l i g h t , r i g h t C e n t r a l c o m p u t e r 2 I n s t r u m e n t a t i o n H e a d l i g h t l o w b e a m , r i g h t H e a d l i g h t l o w b e a m , l e f t H e a d l i g h t h i g h b e a m , r i g h t H e a d l i g h t h i g h b e a m , l e f t D a y t i m e d r i v i n g l i g h t s , r i g h t D a y t i m e d r i v i n g l i g h t s , l e f t C h e c k l a m p , h e a d l i g h t h i g h b e a m P o t e n t i o m e t e r , h e a d l i g h t b e a m r e g u l a t o r S t e e r i n g c o l u m n s t a l k ( t u r n i n d i c a t o r s , w i p e r s a n d h e a d l i g h t s ) P l u g c o n n . , f r o n t e n d , l e f t P l u g c o n n . , f r o n t e n d , r i g h t E a r t h i n g p o i n t , c a b b e h i n d i n s t r u m e n t p a n e l E a r t h i n g p o i n t , c a b , n e x t t o c e n t r a l e l e c t r i c a l s y s t e m P l u g c o n n . , 1 c o m b i n a t i o n s t e e r i n g c o lu m n s t a l k — — — — — — — — — — — — — — — — — — — — — – f o r h e a d l i g h t s

K 1 0 0

2 n d e d itio n

5 4

S E R IE S A




K 1 0 0

2

d

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S T A N D A R D

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D I A G R A M


5 5

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K 1 0 0


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2 n d e d itio n

5 5 S E R IE S

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S T A N D A R D

S T A N D A R D

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D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9

A = R e a r f o g la m p s / B = F o g la m p s , a d d itio n a l h ig h b e a m 1 6 o f 2 2

h e a d lig h t s , c o r n e r in g lig h t , le f t / C

= F o g la m p s , a d d itio n a l h ig h b e a m

h e a d l i g h t s , c o r n e r i n g l i g h t , r i g h t s h e e t


A A A A A

1 1 3 4 4

8 9 0 3 3 1 2 E E 1 2 E 1 2 E 1 2 E 1 9 E 1 9 E 4 8 E 4 8 1 5 4 X X 1 5 4 X 1 5 5 X 1 6 4 X 1 6 4

9 0 2 8 9 2 3 4 5 4 5 0 1 4 5 0 2 4

T T C L L F F R R H H C C P P P E E

a i l l i g h t , l e f t a i l l i g h t , r i g h t e n t r a l c o m p u t e r 2 i g h t s u r r o u n d , r i g h t i g h t s u r r o u n d , l e f t o g la m p , r ig h t o g l a m p , l e f t e a r f o g l a m p , r i g h t e a r f o g la m p , le f t i g h b e a m h e a d l i g h t , r i g h t i g h b e a m h e a d l i g h t , l e f t o r n e r i n g l i g h t , r i g h t o r n e r i n g l i g h t , l e f t lu g c o n n . , f r a m e I I I l u g c o n n . , f r o n t e n d , l e f t l u g c o n n . , f r o n t e n d , r i g h t a r t h i n g p o i n t , c a b b e h i n d i n s t r u m e n t p a n e l a r t h i n g p o i n t , c a b , n e x t t o c e n t r a l e l e c t r i c a l s y s t e m

K 1 0 0

2 n d e d itio n

5 6

S E R IE S W IR IN G

D IA G R A M

S T A N D A R D

W IR IN G

D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9

A = R e a r f o g la m p s / B = F o g la m p s , a d d itio n a l h ig h b e a m 1 6 o f 2 2





A A A A A

1 1 3 4 4

8 9 0 3 3 1 2 E E 1 2 E 1 2 E 1 2 E 1 9 E 1 9 E 4 8 E 4 8 1 5 4 X X 1 5 4 X 1 5 5 X 1 6 4 X 1 6 4

9 0 2 8 9 2 3 4 5 4 5 0 1 4 5 0 2 4

T T C L L F F R R H H C C P P P E E

a i l l i g h t , l e f t a i l l i g h t , r i g h t e n t r a l c o m p u t e r 2 i g h t s u r r o u n d , r i g h t i g h t s u r r o u n d , l e f t o g la m p , r ig h t o g l a m p , l e f t e a r f o g l a m p , r i g h t e a r f o g la m p , le f t i g h b e a m h e a d l i g h t , r i g h t i g h b e a m h e a d l i g h t , l e f t o r n e r i n g l i g h t , r i g h t o r n e r i n g l i g h t , l e f t lu g c o n n . , f r a m e I I I l u g c o n n . , f r o n t e n d , l e f t l u g c o n n . , f r o n t e n d , r i g h t a r t h i n g p o i n t , c a b b e h i n d i n s t r u m e n t p a n e l a r t h i n g p o i n t , c a b , n e x t t o c e n t r a l e l e c t r i c a l s y s t e m

K 1 0 0

2 n d e d itio n

5 6

S E R IE S A = R e a r f o g la m p s / B = F o g la m p s , a d d itio n a l h ig h b e a m 1 6 o f 2 2


K 1 0 0

2

d

d iti


S T A N D A R D

W IR IN G

D I A G R A M


5 7

S E R IE S A = R e a r f o g la m p s / B = F o g la m p s , a d d itio n a l h ig h b e a m 1 6 o f 2 2


K 1 0 0


A

D IA G R A M

= B r a k e lig h t / B

W IR IN G

D I A G R A M


2 n d e d itio n

5 7 S E R IE S

W IR IN G

S T A N D A R D

S T A N D A R D

W IR IN G

D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9 = P a r k in g b r a k e / C

= R e v e r s in g lig h t s h e e t 1 7 o f 2 2


A A A A A A

1 1 3 4 4 4

8 9 0 0 0 0

9 0 2 2 3 7 3 3 7 B B 3 6 9 1 0 2 E E 1 0 3 F 3 1 4 G 1 0 1 1 1 2 H H 1 1 3 H 1 1 7 1 5 4 0 X X 1 5 4 4 X 1 5 8 6 X 1 5 8 7 X 1 6 2 7 X 1 8 3 4 X 2 4 9 7 X 4 2 5 9 — — –

T a i l l i g h t , l e f t T a i l l i g h t , r i g h t C e n t r a l c o m p u t e r 2 C o n t r o l u n i t , E B S V e h i c l e m a n a g e m e n t c o m p u t e r I n s t r u m e n t a t i o n B r a k e p o w e r s e n s o r, E B S E l e c t r i c a l s w i t c h , c h e c k l a m p , p a r k i n g b r a k e R e v e r s i n g l i g h t , r i g h t R e v e r s i n g l i g h t , l e f t F u s e , r e v e r s i n g l i g h t B a t t e r y 2 B r a k e l a m p , r i g h t B r a k e l a m p , l e f t C h e c k l a m p , p a r k in g b r a k e P l u g c o n n . , f r a m e I P lu g c o n n ., f r a m e I I I P l u g c o n n . , c o n n e c t i o n , t r a i l e r s o c k e t 1 P l u g c o n n . , c o n n e c t i o n , t r a i l e r s o c k e t 2 P l u g c o n n . , r e v e r s i n g l i g h t s C r i m p e d c o n n e c t o r , l i n e 7 1 3 0 0 P l u g c o n n . , d i s t r i b u t o r , l i n e 1 6 1 0 9 A d a p t a t i o n , r e v e r s i n g b u z z e r i n r e a r l i g h t — — — — — — — — — — — — — — — — — — — — — – 1 S w i t c h , r e v e r s e g e a r N o t e

I n s t a l l a t i o n p o s i t i o n o f X 1 5 8 6 a n d X 1 5 8 7 f o r s e m i t r a i l e r i s E 8 !

K 1 0 0

2 n d e d itio n

5 8


D IA G R A M


S T A N D A R D

W IR IN G

D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9 = P a r k in g b r a k e / C



A A A A A A

1 1 3 4 4 4

8 9 0 0 0 0

9 0 2 2 3 7 3 3 7 B B 3 6 9 1 0 2 E E 1 0 3 F 3 1 4 G 1 0 1 1 1 2 H H 1 1 3 H 1 1 7 1 5 4 0 X X 1 5 4 4 X 1 5 8 6 X 1 5 8 7 X 1 6 2 7 X 1 8 3 4 X 2 4 9 7 X 4 2 5 9 — — –

T a i l l i g h t , l e f t T a i l l i g h t , r i g h t C e n t r a l c o m p u t e r 2 C o n t r o l u n i t , E B S V e h i c l e m a n a g e m e n t c o m p u t e r I n s t r u m e n t a t i o n B r a k e p o w e r s e n s o r, E B S E l e c t r i c a l s w i t c h , c h e c k l a m p , p a r k i n g b r a k e R e v e r s i n g l i g h t , r i g h t R e v e r s i n g l i g h t , l e f t F u s e , r e v e r s i n g l i g h t B a t t e r y 2 B r a k e l a m p , r i g h t B r a k e l a m p , l e f t C h e c k l a m p , p a r k in g b r a k e P l u g c o n n . , f r a m e I P lu g c o n n ., f r a m e I I I P l u g c o n n . , c o n n e c t i o n , t r a i l e r s o c k e t 1 P l u g c o n n . , c o n n e c t i o n , t r a i l e r s o c k e t 2 P l u g c o n n . , r e v e r s i n g l i g h t s C r i m p e d c o n n e c t o r , l i n e 7 1 3 0 0 P l u g c o n n . , d i s t r i b u t o r , l i n e 1 6 1 0 9 A d a p t a t i o n , r e v e r s i n g b u z z e r i n r e a r l i g h t — — — — — — — — — — — — — — — — — — — — — – 1 S w i t c h , r e v e r s e g e a r N o t e


K 1 0 0

2 n d e d itio n

5 8

S E R IE S A


= P a r k in g b r a k e / C

S T A N D A R D

W IR IN G

D I A G R A M


K 1 0 0

2

d

d iti

5 9

S E R IE S A


= P a r k in g b r a k e / C

2 n d e d itio n

A

D I A G R A M

5 9 S E R IE S

D IA G R A M

W IR IN G


K 1 0 0

W IR IN G

S T A N D A R D

S T A N D A R D

W IR IN G

D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9

= P u s h b u t to n u n it illu m in a tio n / B

= P e r m a n e n t lo a d v o lta g e s u p p ly / C

= E n t r a n c e lig h t in g / D

= I n t e r i o r l i g h t s s h e e t 1 8 o f 2 2


A A A A A A

3 4 4 4 4 4

0 0 5 5 6 6

2 7 1 2 5 6

1 2 7 E E 1 2 8 E 2 6 8 E 2 6 9 F 1 2 5 F 1 2 8 R 1 0 6 3 9 5 X X 1 5 4 6 X 1 5 4 7 X 1 5 5 7 X 1 5 6 9 X 1 5 7 0 X 1 8 3 6 X 2 5 4 2 X 2 5 4 3 X 4 6 4 6 — — – 1 2

C e n t r a l c o m p u t e r 2 I n s t r u m e n t a t i o n D o o r m o d u l e , l e f t D o o r m o d u l e , r i g h t D o o r l o c k , l e f t D o o r l o c k , r i g h t I n t e r i o r l i g h t , l e f t I n t e r i o r l i g h t , r i g h t E n t r a n c e l i g h t i n g , r i g h t E n t r a n c e l i g h t i n g , l e f t F u s e , p u s h b u t t o n u n i t i l l u m i n a t i o n F u s e , p e r m a n e n t l o a d P o t e n t i o m e t e r , i n s t r u m e n t l i g h t i n g P l u g c o n n . , o u t l i n e l i g h t a n d i n t e r i o r P l u g c o n n . , d o o r , r i g h t P l u g c o n n . , d o o r , l e f t P l u g c o n n . , f r a m e , l e f t P l u g c o n n . , s t o r a g e l o c k e r l i g h t i n g P l u g c o n n . , s t o r a g e l o c k e r l i g h t i n g C r i m p e d c o n n e c t o r , l i n e 5 8 0 0 0 P o t e n tia l d i s t r ib u to r , 2 1 - p i n , lin e 5 8 0 0 P o t e n tia l d i s t r ib u to r , 2 1 - p i n , lin e 3 0 0 0 P o t e n t i a l d i s t r i b u t o r , l i n e 5 8 3 0 0 — — — — — — — — — — — — — — — — D o o r m o d u le T e r m i n a l 5 8 , d i m m e d

l i g h t , l e f t a n d r i g h t

0 6 — — — — — –

K 1 0 0

2 n d e d itio n

6 0


D IA G R A M

S T A N D A R D

W IR IN G

D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9






A A A A A A

3 4 4 4 4 4

0 0 5 5 6 6

2 7 1 2 5 6

1 2 7 E E 1 2 8 E 2 6 8 E 2 6 9 F 1 2 5 F 1 2 8 R 1 0 6 3 9 5 X X 1 5 4 6 X 1 5 4 7 X 1 5 5 7 X 1 5 6 9 X 1 5 7 0 X 1 8 3 6 X 2 5 4 2 X 2 5 4 3 X 4 6 4 6 — — – 1 2

C e n t r a l c o m p u t e r 2 I n s t r u m e n t a t i o n D o o r m o d u l e , l e f t D o o r m o d u l e , r i g h t D o o r l o c k , l e f t D o o r l o c k , r i g h t I n t e r i o r l i g h t , l e f t I n t e r i o r l i g h t , r i g h t E n t r a n c e l i g h t i n g , r i g h t E n t r a n c e l i g h t i n g , l e f t F u s e , p u s h b u t t o n u n i t i l l u m i n a t i o n F u s e , p e r m a n e n t l o a d P o t e n t i o m e t e r , i n s t r u m e n t l i g h t i n g P l u g c o n n . , o u t l i n e l i g h t a n d i n t e r i o r P l u g c o n n . , d o o r , r i g h t P l u g c o n n . , d o o r , l e f t P l u g c o n n . , f r a m e , l e f t P l u g c o n n . , s t o r a g e l o c k e r l i g h t i n g P l u g c o n n . , s t o r a g e l o c k e r l i g h t i n g C r i m p e d c o n n e c t o r , l i n e 5 8 0 0 0 P o t e n tia l d i s t r ib u to r , 2 1 - p i n , lin e 5 8 0 0 P o t e n tia l d i s t r ib u to r , 2 1 - p i n , lin e 3 0 0 0 P o t e n t i a l d i s t r i b u t o r , l i n e 5 8 3 0 0 — — — — — — — — — — — — — — — — D o o r m o d u le T e r m i n a l 5 8 , d i m m e d

l i g h t , l e f t a n d r i g h t

0 6 — — — — — –

K 1 0 0

2 n d e d itio n

6 0

S E R IE S A




K 1 0 0

2

d

d iti

S T A N D A R D

W IR IN G

D I A G R A M


6 1

S E R IE S A




K 1 0 0

A

D IA G R A M

W IR IN G

D I A G R A M


2 n d e d itio n

6 1 S E R IE S

W IR IN G

S T A N D A R D

S T A N D A R D

W IR IN G

D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9

= T u r n i n d i c a t o r s s h e e t 1 9 o f 2 2


A A A A A A

1 1 1 1 3 4

8 8 8 9 0 0

7 8 9 0 2 7 9 0 1 2 3 4 5 0 1

H e a d l i g h t , l e f t H e a d l i g h t , r i g h t T a i l l i g h t , l e f t T a i l l i g h t , r i g h t C e n t r a l c o m p u t e r 2 I n s t r u m e n t a t i o n C h e c k l a m p , t u r n i n d i c a t o r s , t r a i l e r H 1 1 H 1 2 T u r n i n d i c a t o r , f r o n t r i g h t H 1 2 T u r n i n d i c a t o r , f r o n t l e f t H 1 2 T u r n i n d i c a t o r , r e a r r i g h t H 1 2 T u r n i n d i c a t o r , r e a r l e f t H 1 2 T u r n i n d i c a t o r , s i d e r i g h t H 1 2 T u r n i n d i c a t o r , s i d e l e f t H 3 8 C h e c k l a m p , t u r n i n d i c a t o r , t r a c t o r , r i g h t H 3 8 C h e c k l a m p , t u r n i n d i c a t o r , t r a c t o r , l e f t 1 0 8 S t e e r i n g c o l u m n s t a l k ( t u r n i n d i c a t o r s , w i p e r s a n d h e a d l i g h t s ) S S 1 0 9 S w i t c h , h a z a r d w a r n i n g l i g h t s 1 5 4 0 P l u g c o n n . , f r a m e I X X 1 5 4 4 P lu g c o n n ., f r a m e I I I X 1 5 4 5 P l u g c o n n . , f r o n t e n d , l e f t X 1 5 5 0 P l u g c o n n . , f r o n t e n d , r i g h t X 1 5 8 6 P l u g c o n n . , c o n n e c t i o n , t r a i l e r s o c k e t 1 X 1 9 6 7 P l u g c o n n . , 1 c o m b i n a t i o n s t e e r i n g c o lu m n s t a l k N o t e


K 1 0 0

2 n d e d itio n

6 2


D IA G R A M

S T A N D A R D

W IR IN G

D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9



A A A A A A

1 1 1 1 3 4

8 8 8 9 0 0

7 8 9 0 2 7 9 0 1 2 3 4 5 0 1

H e a d l i g h t , l e f t H e a d l i g h t , r i g h t T a i l l i g h t , l e f t T a i l l i g h t , r i g h t C e n t r a l c o m p u t e r 2 I n s t r u m e n t a t i o n C h e c k l a m p , t u r n i n d i c a t o r s , t r a i l e r H 1 1 H 1 2 T u r n i n d i c a t o r , f r o n t r i g h t H 1 2 T u r n i n d i c a t o r , f r o n t l e f t H 1 2 T u r n i n d i c a t o r , r e a r r i g h t H 1 2 T u r n i n d i c a t o r , r e a r l e f t H 1 2 T u r n i n d i c a t o r , s i d e r i g h t H 1 2 T u r n i n d i c a t o r , s i d e l e f t H 3 8 C h e c k l a m p , t u r n i n d i c a t o r , t r a c t o r , r i g h t H 3 8 C h e c k l a m p , t u r n i n d i c a t o r , t r a c t o r , l e f t 1 0 8 S t e e r i n g c o l u m n s t a l k ( t u r n i n d i c a t o r s , w i p e r s a n d h e a d l i g h t s ) S S 1 0 9 S w i t c h , h a z a r d w a r n i n g l i g h t s 1 5 4 0 P l u g c o n n . , f r a m e I X X 1 5 4 4 P lu g c o n n ., f r a m e I I I X 1 5 4 5 P l u g c o n n . , f r o n t e n d , l e f t X 1 5 5 0 P l u g c o n n . , f r o n t e n d , r i g h t X 1 5 8 6 P l u g c o n n . , c o n n e c t i o n , t r a i l e r s o c k e t 1 X 1 9 6 7 P l u g c o n n . , 1 c o m b i n a t i o n s t e e r i n g c o lu m n s t a l k N o t e


K 1 0 0

2 n d e d itio n

6 2

S E R IE S A

S T A N D A R D

W IR IN G

D I A G R A M


K 1 0 0

2

d

d iti

6 3

S E R IE S A

W IR IN G

D I A G R A M


K 1 0 0

2 n d e d itio n

6 3 S E R IE S

W IR IN G A

S T A N D A R D

D IA G R A M

= S p a re lin e s / B

S T A N D A R D

W IR IN G

D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9 = S p a r e lin e s f o r t r a ile r s o c k e t / C

= S p a r e l i n e s f o r e n g i n e s t a r t / s t o p s h e e t 2 0 o f 2 2


A 3 G 1 5 S S 5 3 X X 6 X 1 5 X 1 5 X 1 5 X 1 5 X 1 5 X 1 5 — —

0 2 0 1 8 0 8 1 2 7 3 7 4 0 4 4 5 1 5 7 8 6 8 7 – 1 2 3 4 5 6 7 8 9 1 0 1 1 1 2

C e n t r a l c o m p u t e r 2 B a t t e r y 2 B u t t o n , e n g i n e s t a r t ( M P b o x ) B u t t o n , e n g in e s t o p ( M P b o x ) P l u g c o n n . t o s o l e n o i d v a l v e s i n f r a m e P l u g c o n n . , d i f f e r e n t i a l l o c k , r e a r a x l e P l u g c o n n ., f r a m e I P lu g c o n n ., f r a m e I I I P l u g c o n n . , e n g i n e / E D C / g e a r b o x I I P l u g c o n n . , f r a m e , l e f t P l u g c o n n . , c o n n e c t i o n , t r a i l e r s o c k e t 1 P l u g c o n n . , c o n n e c t i o n , t r a i l e r s o c k e t 2 — — — — — — — — — — — — — — — — — — — — — – S o l e n o i d v a l v e , t r a n s v e r s e d i f f e r e n t i a l l o c k , r e a r a x l e S w i t c h f o r i n d i c a t o r , t r a n s v e r s e d i f f e r e n t i a l l o c k S o l e n o i d v a l v e , t r a n s v e r s e d i f f e r e n t i a l l o c k , r e a r a x l e C h e c k l a m p , t r a n s v e r s e d i f f e r e n t i a l l o c k , r e a r a x l e C h e c k l a m p , i n t e r a x l e d i f f e r e n t i a l l o c k S o l e n o i d v a l v e , i n t e r a x l e d i f f e r e n t i a l l o c k S o l e n o i d v a l v e , p o w e r t a k e - o f f I D a t a l i n e S u p p l y , t r a i l e r ( o v e r  l l s h u t - o f f d e v i c e ) C o n t r o l , t r a i l i n g a x l e o r l e a d i n g a x l e , t r a i l e r P r e s s u r e s w i t c h , c h e c k , p a r k i n g b r a k e , t r a i l e r C h e c k l a m p , b r a k e w e a r i n d i c a t o r , t r a i l e r N o t e


K 1 0 0

2 n d e d itio n

6 4


D IA G R A M


S T A N D A R D

W IR IN G

D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9 = S p a r e lin e s f o r t r a ile r s o c k e t / C



A 3 G 1 5 S S 5 3 X X 6 X 1 5 X 1 5 X 1 5 X 1 5 X 1 5 X 1 5 — —

0 2 0 1 8 0 8 1 2 7 3 7 4 0 4 4 5 1 5 7 8 6 8 7 – 1 2 3 4 5 6 7 8 9 1 0 1 1 1 2

C e n t r a l c o m p u t e r 2 B a t t e r y 2 B u t t o n , e n g i n e s t a r t ( M P b o x ) B u t t o n , e n g in e s t o p ( M P b o x ) P l u g c o n n . t o s o l e n o i d v a l v e s i n f r a m e P l u g c o n n . , d i f f e r e n t i a l l o c k , r e a r a x l e P l u g c o n n ., f r a m e I P lu g c o n n ., f r a m e I I I P l u g c o n n . , e n g i n e / E D C / g e a r b o x I I P l u g c o n n . , f r a m e , l e f t P l u g c o n n . , c o n n e c t i o n , t r a i l e r s o c k e t 1 P l u g c o n n . , c o n n e c t i o n , t r a i l e r s o c k e t 2 — — — — — — — — — — — — — — — — — — — — — – S o l e n o i d v a l v e , t r a n s v e r s e d i f f e r e n t i a l l o c k , r e a r a x l e S w i t c h f o r i n d i c a t o r , t r a n s v e r s e d i f f e r e n t i a l l o c k S o l e n o i d v a l v e , t r a n s v e r s e d i f f e r e n t i a l l o c k , r e a r a x l e C h e c k l a m p , t r a n s v e r s e d i f f e r e n t i a l l o c k , r e a r a x l e C h e c k l a m p , i n t e r a x l e d i f f e r e n t i a l l o c k S o l e n o i d v a l v e , i n t e r a x l e d i f f e r e n t i a l l o c k S o l e n o i d v a l v e , p o w e r t a k e - o f f I D a t a l i n e S u p p l y , t r a i l e r ( o v e r  l l s h u t - o f f d e v i c e ) C o n t r o l , t r a i l i n g a x l e o r l e a d i n g a x l e , t r a i l e r P r e s s u r e s w i t c h , c h e c k , p a r k i n g b r a k e , t r a i l e r C h e c k l a m p , b r a k e w e a r i n d i c a t o r , t r a i l e r N o t e


K 1 0 0

2 n d e d itio n

6 4

S E R IE S A


= S p a r e lin e s f o r t r a ile r s o c k e t / C

S T A N D A R D

W IR IN G

D I A G R A M


K 1 0 0

2

d

d iti

6 5

S E R IE S A


= S p a r e lin e s f o r t r a ile r s o c k e t / C

2 n d e d itio n

A

= G e a rb o x / B

D I A G R A M

6 5 S E R IE S

D IA G R A M

W IR IN G


K 1 0 0

W IR IN G

S T A N D A R D

S T A N D A R D

W IR IN G

D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9

= T -C A N

n e t w o r k s h e e t 2 1 o f 2 2


A A 1 X X 1 X 1 X 1 X 1 X 1 —

3 0 2 4 0 3 5 5 3 5 5 9 5 6 2 9 4 8 9 7 2 9 8 3 — –

C V P P P P P T — 1 2 3 4 5 6 7 8 9

S C G G S G D G G

e n t r a l c o m p u t e r 2 e h i c l e m a n a g e m e n t c o m p u t e r l u g c o n n . , e n g i n e / E D C / g e a r b o x l u g c o n n . , e n g i n e / E D C / g e a r b o x l u g c o n n ., g e a r b o x l u g c o n n . , e n g i n e / g e a r b o x l u g c o n n . , p e d a l s , o u t s i d e h r e a d e d p in M 6 ( m o t o r p o w e r b o — — — — — — — — — — — — — — w i t c h , r e v e r s e g e a r l u t c h t r a v e l s e n s o r e a r b o x n e u t r a l e a r b o x , i n p u t s p e e d w i t c h , r e v e r s e g e a r e a r b o x c o n t r o l m o d u l e i a g n o s i s , A S - T r o n i c e a r b o x c o n t r o l m o d u l e e a r b o x c o n t r o l m o d u l e

I I I I V

x ) — — — — — — –

K 1 0 0

2 n d e d itio n

6 6


D IA G R A M

= G e a rb o x / B

S T A N D A R D

W IR IN G

D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9

= T -C A N



A A 1 X X 1 X 1 X 1 X 1 X 1 —

3 0 2 4 0 3 5 5 3 5 5 9 5 6 2 9 4 8 9 7 2 9 8 3 — –

C V P P P P P T — 1 2 3 4 5 6 7 8 9

S C G G S G D G G

e n t r a l c o m p u t e r 2 e h i c l e m a n a g e m e n t c o m p u t e r l u g c o n n . , e n g i n e / E D C / g e a r b o x l u g c o n n . , e n g i n e / E D C / g e a r b o x l u g c o n n ., g e a r b o x l u g c o n n . , e n g i n e / g e a r b o x l u g c o n n . , p e d a l s , o u t s i d e h r e a d e d p in M 6 ( m o t o r p o w e r b o — — — — — — — — — — — — — — w i t c h , r e v e r s e g e a r l u t c h t r a v e l s e n s o r e a r b o x n e u t r a l e a r b o x , i n p u t s p e e d w i t c h , r e v e r s e g e a r e a r b o x c o n t r o l m o d u l e i a g n o s i s , A S - T r o n i c e a r b o x c o n t r o l m o d u l e e a r b o x c o n t r o l m o d u l e

I I I I V

x ) — — — — — — –

K 1 0 0

2 n d e d itio n

6 6

S E R IE S A

= G e a rb o x / B

= T -C A N

S T A N D A R D

W IR IN G

D I A G R A M


K 1 0 0

2

d

d iti

6 7

S E R IE S A

= G e a rb o x / B

= T -C A N

2 n d e d itio n

A

D I A G R A M

6 7 S E R IE S

D IA G R A M

W IR IN G


K 1 0 0

W IR IN G

S T A N D A R D

S T A N D A R D

W IR IN G

D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9

= In t a r d e r, r e ta r d e r / B

= P o w e r t a k e - o f f s h e e t 2 2 o f 2 2


A 3 0 2

C P 5 9 P 5 1 P 8 3 T 6 2 P – —

1 5 5 3 X X X X X

1 5 1 9 1 9 3 4 — —

1 2 3 4 5 6

S T P S C C

e n t r a l c o m p u t e r 2 l u g c o n n . , e n g i n e / E D C / g e a r b o x I I I l u g c o n n . , e n g i n e / E D C / g e a r b o x I V l u g c o n n . , e n g i n e / g e a r b o x h r e a d e d p in M 6 ( m o t o r p o w e r b o x ) l u g c o n n . , e n g i n e - p o w e r t a k e - o f f — — — — — — — — — — — — — — — — — — — — – o l e n o i d v a l v e , a c c u m u l a t o r e m p e r a t u r e s e n s o r , I n t a r d e r r o p o r t i o n a l v a l v e , I n t a r d e r o l e n o i d v a l v e , a c c u m u l a t o r / t r a n s m i t t e r , a c t u a t i n g p r e s s u r e h e c k l a m p , p o w e r t a k e - o f f I h e c k l a m p , p o w e r t a k e - o f f I I

K 1 0 0

2 n d e d itio n

6 8


D IA G R A M

S T A N D A R D

W IR IN G

D I A G R A M

N O . 8 1 .9 9 1 9 2 .3 0 7 9




A 3 0 2

C P 5 9 P 5 1 P 8 3 T 6 2 P – —

1 5 5 3 X X X X X

1 5 1 9 1 9 3 4 — —

1 2 3 4 5 6

S T P S C C

e n t r a l c o m p u t e r 2 l u g c o n n . , e n g i n e / E D C / g e a r b o x I I I l u g c o n n . , e n g i n e / E D C / g e a r b o x I V l u g c o n n . , e n g i n e / g e a r b o x h r e a d e d p in M 6 ( m o t o r p o w e r b o x ) l u g c o n n . , e n g i n e - p o w e r t a k e - o f f — — — — — — — — — — — — — — — — — — — — – o l e n o i d v a l v e , a c c u m u l a t o r e m p e r a t u r e s e n s o r , I n t a r d e r r o p o r t i o n a l v a l v e , I n t a r d e r o l e n o i d v a l v e , a c c u m u l a t o r / t r a n s m i t t e r , a c t u a t i n g p r e s s u r e h e c k l a m p , p o w e r t a k e - o f f I h e c k l a m p , p o w e r t a k e - o f f I I

K 1 0 0

2 n d e d itio n

6 8

S E R IE S A


S T A N D A R D

W IR IN G

D I A G R A M


K 1 0 0

2

d

d iti

6 9

S E R IE S A


S T A N D A R D

W IR IN G

D I A G R A M


K 1 0 0

2 n d e d itio n

6 9

A D D I T IO N A L W IR I N G

A D D I T IO N A L W I R I N G

D I A G R A M S

D I A G R A M S

K 1 0 0

2

d

d iti

7 1


A D D I T IO N A L W I R I N G

D I A G R A M S

K 1 0 0

2 n d e d itio n

7 1 A D D I T IO N A L W IR I N G

W IR IN G

D I A G R A M S

D IA G R A M

N O . 8 1 .9 9 1 9 2 .2 4 9 6

T r a ile r s o c k e t 2 4 V

7 - p o l e s h e e t 1 o f 1

D I A G R A M S

D a t e : 0 1 . 2 0 0 7 L e g e n d A T r a ile r s o c k e t , 2 4 V

— — A 1 A 3 G 1 3 X X 1 5 X 1 5

–

— — — — 0 0 C e n tra l 0 2 C e n tr a l 0 1 B a t te ry 3 0 S o c k e t 4 0 P lu g c o 8 6 P lu g c o

— — — — e l e c t r i c a l c o m p u te r 2 N 2 4 V n n ., f r a m e n n ., c o n n e

7 - p i n N

— — — — — — — — — — — — — – s y s t e m 2 I c t i o n , t r a i l e r s o c k e t 1

N o t e

I n s t a l l a t i o n p o s i t i o n o f X 1 5 8 6 f o r s e m i t r a i l e r E 8 !

K 1 0 0

2 n d e d itio n

7 2

A D D I T IO N A L W IR I N G W IR IN G

D IA G R A M

N O . 8 1 .9 9 1 9 2 .2 4 9 6


7 - p o l e s h e e t 1 o f 1

D I A G R A M S

D a t e : 0 1 . 2 0 0 7 L e g e n d A T r a ile r s o c k e t , 2 4 V

— — A 1 A 3 G 1 3 X X 1 5 X 1 5

–

— — — — 0 0 C e n tra l 0 2 C e n tr a l 0 1 B a t te ry 3 0 S o c k e t 4 0 P lu g c o 8 6 P lu g c o

— — — — e l e c t r i c a l c o m p u te r 2 N 2 4 V n n ., f r a m e n n ., c o n n e

7 - p i n N

— — — — — — — — — — — — — – s y s t e m 2 I c t i o n , t r a i l e r s o c k e t 1

N o t e

I n s t a l l a t i o n p o s i t i o n o f X 1 5 8 6 f o r s e m i t r a i l e r E 8 !

K 1 0 0

2 n d e d itio n

7 2

A D D I T IO N A L W IR I N G T r a ile r s o c k e t 2 4 V

D I A G R A M S

7 - p o l e s h e e t 1 o f 1

K 1 0 0

2

d

d iti

7 3


7 - p o l e s h e e t 1 o f 1

K 1 0 0

2 n d e d itio n


W IR IN G

D IA G R A M


D I A G R A M S

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .2 4 9 8 7 - p o l e / 7 - p o l e s h e e t 1 o f 1

D a t e : 0 1 . 2 0 0 7 L e g e n d A T r a ile r s o c k e t , 2 4 V B T r a ile r s o c k e t , 2 4 V

— — A 1 A 3 G 1 3 X X 3 X 1 5 X 1 5 X 1 5

– 0 0 0 2 0 1 2 9 3 0 4 0 8 6 8 7

— — — — — — — — C e n t r a l e l e c t r i c a l C e n tr a l c o m p u te r B a t t e r y 2 S o c k e t S 2 4 V S o c k e t N 2 4 V P lu g c o n n ., f r a m e P lu g c o n n ., c o n n e P lu g c o n n ., c o n n e

7 - p i n N 7 - p i n S

— — — — — — — — — — — — — – s y s t e m 2

I c t i o n , t r a i l e r s o c k e t 1 c t i o n , t r a i l e r s o c k e t 2

N o t e


K 1 0 0

2 n d e d itio n

7 4


D IA G R A M


D I A G R A M S

N O . 8 1 .9 9 1 9 2 .2 4 9 8 7 - p o l e / 7 - p o l e s h e e t 1 o f 1

D a t e : 0 1 . 2 0 0 7 L e g e n d A T r a ile r s o c k e t , 2 4 V B T r a ile r s o c k e t , 2 4 V

— — A 1 A 3 G 1 3 X X 3 X 1 5 X 1 5 X 1 5

– 0 0 0 2 0 1 2 9 3 0 4 0 8 6 8 7

— — — — — — — — C e n t r a l e l e c t r i c a l C e n tr a l c o m p u te r B a t t e r y 2 S o c k e t S 2 4 V S o c k e t N 2 4 V P lu g c o n n ., f r a m e P lu g c o n n ., c o n n e P lu g c o n n ., c o n n e

7 - p i n N 7 - p i n S

— — — — — — — — — — — — — – s y s t e m 2

I c t i o n , t r a i l e r s o c k e t 1 c t i o n , t r a i l e r s o c k e t 2

N o t e


K 1 0 0

2 n d e d itio n

7 4


D I A G R A M S

7 - p o l e / 7 - p o l e s h e e t 1 o f 1

K 1 0 0

2

d

d iti

7 5


7 - p o l e / 7 - p o l e s h e e t 1 o f 1

K 1 0 0

2 n d e d itio n


W IR IN G A S R

D IA G R A M

D I A G R A M S

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .1 3 5 8

c h e c k la m p s h e e t 1 o f 1

D a t e : 0 4 . 2 0 0 1 L e g e n d A A S R

— — A 1 A 3 A 4 1 H

–

0 0 0 4

— — — 0 C e n tra 2 C e n tr a 7 In s tr u m 0 C h e ck

c h e c k la m p

— l e l c e la

— — — — l e c t r i c a l o m p u te r n t a t i o n m p , A S R

— — — — — — — — — — — — — – s y s t e m 2 / E S P in fo .

N o t e

F o r b a s i c e q u i p m e n t , s e e w i r i n g d i a g r a m

f o r E B S !

K 1 0 0

2 n d e d itio n

7 6

A D D I T IO N A L W IR I N G W IR IN G A S R

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .1 3 5 8


D a t e : 0 4 . 2 0 0 1 L e g e n d A A S R

— — A 1 A 3 A 4 1 H

–

0 0 0 4

— — — 0 C e n tra 2 C e n tr a 7 In s tr u m 0 C h e ck

c h e c k la m p

— l e l c e la

— — — — l e c t r i c a l o m p u te r n t a t i o n m p , A S R

— — — — — — — — — — — — — – s y s t e m 2 / E S P in fo .

N o t e

F o r b a s i c e q u i p m e n t , s e e w i r i n g d i a g r a m

f o r E B S !

K 1 0 0

2 n d e d itio n

7 6

A D D I T IO N A L W IR I N G A S R

D I A G R A M S


K 1 0 0

2

d

d iti

7 7



K 1 0 0

2 n d e d itio n


W IR IN G A S R

D I A G R A M S

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 2 2

s li p t h r e s h o ld s b u t t o n s h e e t 1 o f 1

D a t e : 0 9 . 2 0 0 6 L e g e n d A A S R

— — A 1 A 3 A 4 2 S 2 5 X X 4 7

– 0 0 0 2 0 2 5 6 4 1 3 2

s li p t h r e s h o ld s b u t t o n

— — — — C e n tra l C e n tr a l C o n tr o l B u t to n , P o t e n tia P o t e n tia

— — — — — — — — e l e c t r i c a l s y s t e m c o m p u t e r 2 u n i t , E B S A S R o r A S R /E S P s l d i s t r ib u to r , 2 1 - p i n , l d i s t r i b u t o r , l i n e 1 6

— — — — — — — — — –

p i n t h r e s h o l d i n c r e a s e l i n e 3 1 0 0 0 0 0 0 , s w i t c h l i g h t i n g

K 1 0 0

2 n d e d itio n

7 8

A D D I T IO N A L W IR I N G W IR IN G A S R

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 2 2


D a t e : 0 9 . 2 0 0 6 L e g e n d A A S R

— — A 1 A 3 A 4 2 S 2 5 X X 4 7

– 0 0 0 2 0 2 5 6 4 1 3 2

s li p t h r e s h o ld s b u t t o n

— — — — C e n tra l C e n tr a l C o n tr o l B u t to n , P o t e n tia P o t e n tia

— — — — — — — — e l e c t r i c a l s y s t e m c o m p u t e r 2 u n i t , E B S A S R o r A S R /E S P s l d i s t r ib u to r , 2 1 - p i n , l d i s t r i b u t o r , l i n e 1 6

— — — — — — — — — –

p i n t h r e s h o l d i n c r e a s e l i n e 3 1 0 0 0 0 0 0 , s w i t c h l i g h t i n g

K 1 0 0

2 n d e d itio n

7 8


D I A G R A M S


K 1 0 0

2

d

d iti

7 9


D I A G R A M S


K 1 0 0

2 n d e d itio n


W IR IN G

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .2 4 9 5

B a t t e r y m a s t e r s w i t c h , m e c h a n i c a l s h e e t 1 o f 1

D a t e : 1 1 . 2 0 0 6 L e g e n d A B a t t e r y m a s t e r s w i t c h , m e c h a n i c a l

— — A 1 A 3 G 1 M 1 1 S

– — — — — — — — — 0 0 C e n t r a l e l e c t r i c a l 0 2 C e n tr a l c o m p u te r 0 0 B a t t e r y 1 0 0 S t a r t e r 4 9 Is o la t o r s w itc h , b a

— — — — — — — — — — — — — – s y s t e m 2 t t e r y +

K 1 0 0

2 n d e d itio n

8 0


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .2 4 9 5


D a t e : 1 1 . 2 0 0 6 L e g e n d A B a t t e r y m a s t e r s w i t c h , m e c h a n i c a l

— — A 1 A 3 G 1 M 1 1 S

– — — — — — — — — 0 0 C e n t r a l e l e c t r i c a l 0 2 C e n tr a l c o m p u te r 0 0 B a t t e r y 1 0 0 S t a r t e r 4 9 Is o la t o r s w itc h , b a

— — — — — — — — — — — — — – s y s t e m 2 t t e r y +

K 1 0 0

2 n d e d itio n

8 0


D I A G R A M S


K 1 0 0

2

d

d iti

8 1


D I A G R A M S


K 1 0 0

2 n d e d itio n


W IR IN G

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 3 5

I n t e r a x l e a n d t r a n s v e r s e d i f f e r e n t i a l l o c k , r e a r a x l e ( 3 - a x l e v e h i c l e ) s h e e t 1 o f 1

D a t e : 1 1 . 2 0 0 5 L e g e n d A I n t e r a x l e a n d t r a n s v e r s e d i f f e r e n t i a l l o c k , r e a r a x l e

— — A 1 A 3 A 4 G 1 H 3 H 4 1 S S 1 S 1 S 2 S 2 3 X X 6 X 1 5 X 1 5 X 2 5 X 4 7 1 Y Y 1

– 0 0 0 2 0 7 0 1 9 8 0 7 8 5 8 6 8 7 1 2 5 4 2 7 3 7 4 4 5 7 4 1 3 2 4 5 5 0

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 I n s t r u m e n t a t i o n B a t t e r y 2 C h e c k l a m p , t r a n s v e r s e d i f f e r e n t i a l l o c k , r e a r a x l e C h e c k l a m p , i n t e r a x l e d i f f e r e n t i a l l o c k , r e a r a x l e S w i t c h , i n d i c a t o r , t r a n s v e r s e d i f f e r e n t i a l l o c k , r e a r a x l e S w i t c h , i n d i c a t o r , t r a n s v e r s e d i f f e r e n t i a l l o c k , 2 n d r e a r a x l e S w i t c h , t r a n s v e r s e d i f f e r e n t i a l l o c k , r e a r a x l e S w i t c h , i n t e r a x l e d i f f e r e n t i a l l o c k S w i t c h , i n d i c a t o r , i n t e r a x l e d i f f e r e n t i a l l o c k , r e a r a x l e P l u g c o n n . t o s o le n o i d v a lv e i n f r a m e P l u g c o n n . , d i f f e r e n t i a l l o c k , r e a r a x l e P lu g c o n n ., f r a m e I I I P l u g c o n n . , f r a m e , l e f t P o t e n t i a l d i s t r i b u t o r , 2 1 - p i n , l i n e 3 1 0 0 0 P o t e n t i a l d i s t r i b u t o r , l i n e 1 6 0 0 0 , s w i t c h l i g h t i n g S o l e n o i d v a l v e , t r a n s v e r s e d i f f e r e n t i a l l o c k , r e a r a x l e S o l e n o i d v a l v e , i n t e r a x l e d i f f e r e n t i a l l o c k

K 1 0 0

2 n d e d itio n

8 2


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 3 5


D a t e : 1 1 . 2 0 0 5 L e g e n d A I n t e r a x l e a n d t r a n s v e r s e d i f f e r e n t i a l l o c k , r e a r a x l e

— — A 1 A 3 A 4 G 1 H 3 H 4 1 S S 1 S 1 S 2 S 2 3 X X 6 X 1 5 X 1 5 X 2 5 X 4 7 1 Y Y 1

– 0 0 0 2 0 7 0 1 9 8 0 7 8 5 8 6 8 7 1 2 5 4 2 7 3 7 4 4 5 7 4 1 3 2 4 5 5 0

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 I n s t r u m e n t a t i o n B a t t e r y 2 C h e c k l a m p , t r a n s v e r s e d i f f e r e n t i a l l o c k , r e a r a x l e C h e c k l a m p , i n t e r a x l e d i f f e r e n t i a l l o c k , r e a r a x l e S w i t c h , i n d i c a t o r , t r a n s v e r s e d i f f e r e n t i a l l o c k , r e a r a x l e S w i t c h , i n d i c a t o r , t r a n s v e r s e d i f f e r e n t i a l l o c k , 2 n d r e a r a x l e S w i t c h , t r a n s v e r s e d i f f e r e n t i a l l o c k , r e a r a x l e S w i t c h , i n t e r a x l e d i f f e r e n t i a l l o c k S w i t c h , i n d i c a t o r , i n t e r a x l e d i f f e r e n t i a l l o c k , r e a r a x l e P l u g c o n n . t o s o le n o i d v a lv e i n f r a m e P l u g c o n n . , d i f f e r e n t i a l l o c k , r e a r a x l e P lu g c o n n ., f r a m e I I I P l u g c o n n . , f r a m e , l e f t P o t e n t i a l d i s t r i b u t o r , 2 1 - p i n , l i n e 3 1 0 0 0 P o t e n t i a l d i s t r i b u t o r , l i n e 1 6 0 0 0 , s w i t c h l i g h t i n g S o l e n o i d v a l v e , t r a n s v e r s e d i f f e r e n t i a l l o c k , r e a r a x l e S o l e n o i d v a l v e , i n t e r a x l e d i f f e r e n t i a l l o c k

K 1 0 0

2 n d e d itio n

8 2


D I A G R A M S


K 1 0 0

2

d

d iti

8 3


D I A G R A M S


K 1 0 0

2 n d e d itio n


W IR IN G

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 3 3

T r a n s v e r s e d i f f e r e n t i a l l o c k , r e a r a x l e ( 2 - a x l e v e h i c l e ) s h e e t 1 o f 1

D a t e : 1 1 . 2 0 0 5 L e g e n d A D i f f e r e n t i a l l o c k , t r a n s v e r s e , r e a r a x l e

— — A 1 A 3 A 4 G 1 H 3 1 S S 1 3 X X 6 X 1 5 X 1 5 X 2 5 X 4 7 1 Y

– 0 0 0 2 0 7 0 1 9 8 8 5 8 7 2 7 3 7 4 4 5 7 4 1 3 2 4 5

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 I n s t r u m e n t a t i o n B a t t e r y 2 C h e c k l a m p , t r a n s v e r s e d i f f e r e n t i a l l o c k , r e a r a x l e S w i t c h , i n d i c a t o r , t r a n s v e r s e d i f f e r e n t i a l l o c k , r e a r a x l e S w i t c h , t r a n s v e r s e d i f f e r e n t i a l l o c k , r e a r a x l e P l u g c o n n . t o s o le n o i d v a lv e i n f r a m e P l u g c o n n . , d i f f e r e n t i a l l o c k , r e a r a x l e P lu g c o n n ., f r a m e I I I P l u g c o n n . , f r a m e , l e f t P o t e n t i a l d i s t r i b u t o r , 2 1 - p i n , l i n e 3 1 0 0 0 P o t e n t i a l d i s t r i b u t o r , l i n e 1 6 0 0 0 , s w i t c h l i g h t i n g S o l e n o i d v a l v e , t r a n s v e r s e d i f f e r e n t i a l l o c k , r e a r a x l e

K 1 0 0

2 n d e d itio n

8 4


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 3 3


D a t e : 1 1 . 2 0 0 5 L e g e n d A D i f f e r e n t i a l l o c k , t r a n s v e r s e , r e a r a x l e

— — A 1 A 3 A 4 G 1 H 3 1 S S 1 3 X X 6 X 1 5 X 1 5 X 2 5 X 4 7 1 Y

– 0 0 0 2 0 7 0 1 9 8 8 5 8 7 2 7 3 7 4 4 5 7 4 1 3 2 4 5

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 I n s t r u m e n t a t i o n B a t t e r y 2 C h e c k l a m p , t r a n s v e r s e d i f f e r e n t i a l l o c k , r e a r a x l e S w i t c h , i n d i c a t o r , t r a n s v e r s e d i f f e r e n t i a l l o c k , r e a r a x l e S w i t c h , t r a n s v e r s e d i f f e r e n t i a l l o c k , r e a r a x l e P l u g c o n n . t o s o le n o i d v a lv e i n f r a m e P l u g c o n n . , d i f f e r e n t i a l l o c k , r e a r a x l e P lu g c o n n ., f r a m e I I I P l u g c o n n . , f r a m e , l e f t P o t e n t i a l d i s t r i b u t o r , 2 1 - p i n , l i n e 3 1 0 0 0 P o t e n t i a l d i s t r i b u t o r , l i n e 1 6 0 0 0 , s w i t c h l i g h t i n g S o l e n o i d v a l v e , t r a n s v e r s e d i f f e r e n t i a l l o c k , r e a r a x l e

K 1 0 0

2 n d e d itio n

8 4


D I A G R A M S


K 1 0 0

2

d

d iti

8 5


D I A G R A M S


K 1 0 0

2 n d e d itio n


W IR IN G

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 4 6

E le c tro n ic B r a k e S y s t e m

E B S

5 ( 2 - a x le v e h i c l e ) s h e e t 1 o f 3

D a t e : 1 1 . 2 0 0 5 L e g e n d A P r e s s u r e c o n t r o l m o d u l e , f r o n t a x l e , l e f t B P r e s s u r e c o n t r o l m o d u l e , f r o n t a x l e , r i g h t C P r e s s u r e c o n t r o l m o d u l e , r e a r a x l e

— — A 1 A 3 A 4 1 B B 1 B 1 B 1 B 3 B 3 B 3 B 3 B 3 1 5 X X 1 5 X 3 6 2 Y Y 2 Y 2

– 0 0 0 2 0 2 1 9 2 0 2 1 2 2 3 2 3 3 3 4 3 5 3 7 4 8 5 7 3 0 6 2 6 3 6 4

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 C o n t r o l u n i t , E B S S p e e d s e n s o r , f r o n t a x l e , l e f t S p e e d s e n s o r , f r o n t a x l e , r i g h t S p e e d s e n s o r , l i v e a x l e , l e f t S p e e d s e n s o r , l i v e a x l e , r i g h t S e n s o r , b r a k e p a d , f r o n t a x l e , r i g h t S e n s o r , b r a k e p a d , f r o n t a x l e , l e f t S e n s o r , b r a k e p a d , l i v e a x l e , r i g h t S e n s o r , b r a k e p a d , l i v e a x l e , l e f t B r a k e p o w e r s e n s o r, E B S P l u g c o n n ., f r a m e I V P l u g c o n n . , f r a m e , l e f t W i r i n g h a r n e s s , a d a p t e r , s e n s o r , d r i v e n a x l e b r a k e p a d / l i n i n g P r e s s u r e c o n t r o l m o d u l e , f r o n t a x l e , r i g h t P r e s s u r e c o n t r o l m o d u l e , f r o n t a x l e , l e f t P r e s s u r e c o n t r o l m o d u l e , r e a r a x le

K 1 0 0

2 n d e d itio n

8 6


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 4 6


E B S


D a t e : 1 1 . 2 0 0 5 L e g e n d A P r e s s u r e c o n t r o l m o d u l e , f r o n t a x l e , l e f t B P r e s s u r e c o n t r o l m o d u l e , f r o n t a x l e , r i g h t C P r e s s u r e c o n t r o l m o d u l e , r e a r a x l e

— — A 1 A 3 A 4 1 B B 1 B 1 B 1 B 3 B 3 B 3 B 3 B 3 1 5 X X 1 5 X 3 6 2 Y Y 2 Y 2

– 0 0 0 2 0 2 1 9 2 0 2 1 2 2 3 2 3 3 3 4 3 5 3 7 4 8 5 7 3 0 6 2 6 3 6 4

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 C o n t r o l u n i t , E B S S p e e d s e n s o r , f r o n t a x l e , l e f t S p e e d s e n s o r , f r o n t a x l e , r i g h t S p e e d s e n s o r , l i v e a x l e , l e f t S p e e d s e n s o r , l i v e a x l e , r i g h t S e n s o r , b r a k e p a d , f r o n t a x l e , r i g h t S e n s o r , b r a k e p a d , f r o n t a x l e , l e f t S e n s o r , b r a k e p a d , l i v e a x l e , r i g h t S e n s o r , b r a k e p a d , l i v e a x l e , l e f t B r a k e p o w e r s e n s o r, E B S P l u g c o n n ., f r a m e I V P l u g c o n n . , f r a m e , l e f t W i r i n g h a r n e s s , a d a p t e r , s e n s o r , d r i v e n a x l e b r a k e p a d / l i n i n g P r e s s u r e c o n t r o l m o d u l e , f r o n t a x l e , r i g h t P r e s s u r e c o n t r o l m o d u l e , f r o n t a x l e , l e f t P r e s s u r e c o n t r o l m o d u l e , r e a r a x le

K 1 0 0

2 n d e d itio n

8 6

A D D I T IO N A L W IR I N G E le c tro n ic B r a k e S y s t e m

E B S

D I A G R A M S


K 1 0 0

2

d

d iti

8 7


E B S


K 1 0 0

2 n d e d itio n


W IR IN G

D IA G R A M

D I A G R A M S

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 4 6


E B S


D a t e : 1 1 . 2 0 0 5 L e g e n d A T r a i l e r s o c k e t B C h e c k la m p s

— — A 1 A 3 A 4 A 4 F 1 G 1 H 1 H 1 H 1 H 4 3 X X 1 5 X 1 5

– 0 0 0 2 0 2 0 7 6 0 0 1 0 7 4 0 5 1 1 5 1 7 4 2 4 8

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 C o n t r o l u n i t , E B S I n s t r u m e n t a t i o n F u s e , E B S / A B S , v o l t a g e s u p p l y , t r a i l e r B a t t e r y 2 A B S , t r a c t o r / t r a i l e r C h e c k la m p , A S R in fo C h e c k l a m p , A B S i n f o i n t r a i l e r C h e c k l a m p , d i r e c t i o n a l s t a b i l i t y T r a i l e r s o c k e t , A B S P lu g c o n n ., f r a m e I I P l u g c o n n ., f r a m e I V

K 1 0 0

2 n d e d itio n

8 8


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 4 6


E B S



— — A 1 A 3 A 4 A 4 F 1 G 1 H 1 H 1 H 1 H 4 3 X X 1 5 X 1 5

– 0 0 0 2 0 2 0 7 6 0 0 1 0 7 4 0 5 1 1 5 1 7 4 2 4 8

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 C o n t r o l u n i t , E B S I n s t r u m e n t a t i o n F u s e , E B S / A B S , v o l t a g e s u p p l y , t r a i l e r B a t t e r y 2 A B S , t r a c t o r / t r a i l e r C h e c k la m p , A S R in fo C h e c k l a m p , A B S i n f o i n t r a i l e r C h e c k l a m p , d i r e c t i o n a l s t a b i l i t y T r a i l e r s o c k e t , A B S P lu g c o n n ., f r a m e I I P l u g c o n n ., f r a m e I V

K 1 0 0

2 n d e d itio n

8 8


E B S

D I A G R A M S


K 1 0 0

2

d

d iti

8 9


E B S


K 1 0 0

2 n d e d itio n


W IR IN G

D IA G R A M

D I A G R A M S

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 4 6


E B S


D a t e : 0 9 . 2 0 0 6 L e g e n d A V o l t a g e s u p p l y B T r a i l e r c o n t r o l m o d u l e C A S R s li p t h r e s h o ld s

— — A 1 A 3 A 4 F 1 F 1 2 S 1 5 X X 1 5 X 1 6 X 2 5 X 4 6 X 4 7 2 Y

– 0 0 0 2 0 2 6 1 6 2 5 6 4 0 4 8 4 4 4 1 6 4 3 2 7 8

— — — — — — — — — — — — C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 C o n t r o l u n i t , E B S F u s e , E B S (A B S ), p re s s u re F u s e , E B S ( A B S ) , c o n tr o l B u t to n , A S R o r A S R /E S P P l u g c o n n . , f r a m e I P l u g c o n n ., f r a m e I V E a r t h i n g p o i n t , c a b , n e x t t o P o t e n tia l d i s t r ib u to r , 2 1 - p i n , P l u g c o n n ., A S R P o t e n t i a l d i s t r i b u t o r , l i n e 1 6 T r a i l e r c o n t r o l m o d u l e

— — — — — — — — — –

c o n t r o l v a l v e v o l t a g e s u p p l y s p i n t h r e s h o l d i n c r e a s e c e n t r a l e l e c t r i c a l s y s t e m l i n e 3 1 0 0 0 0 0 0 , s w i t c h l i g h t i n g

N o t e * C o n n e c t o r d r o p - o u t d e t e c t i o n : S h o r t - c i r c u i t s p r i n g i n s u l a t e d b y c o n t r o l

u n i t c e l l X 1 / 1 5 w h e n i n s e r t e d . P I N X 1 / 1 2 a n d p i n X 1 / 1 8 s h o r t - c i r c u i t i f n o t i n s e r te d !

K 1 0 0

2 n d e d itio n

9 0


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 4 6


E B S



— — A 1 A 3 A 4 F 1 F 1 2 S 1 5 X X 1 5 X 1 6 X 2 5 X 4 6 X 4 7 2 Y

– 0 0 0 2 0 2 6 1 6 2 5 6 4 0 4 8 4 4 4 1 6 4 3 2 7 8


— — — — — — — — — –




K 1 0 0

2 n d e d itio n

9 0


E B S

D I A G R A M S


K 1 0 0

2

d

d iti

9 1


E B S


K 1 0 0

2 n d e d itio n


W IR IN G

D IA G R A M

D I A G R A M S

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 4 7


E B S


D a t e : 1 1 . 2 0 0 5 L e g e n d A P r e s s u r e c o n t r o l m o d u l e , f r o n t a x l e , l e f t B P r e s s u r e c o n t r o l m o d u l e , f r o n t a x l e , r i g h t C B r a k e p o w e r s e n s o r

— — A 1 A 3 A 4 1 B B 1 B 3 B 3 B 3 1 5 X X 1 5 2 Y Y 2

– 0 0 0 2 0 2 1 9 2 0 3 2 3 3 3 7 4 8 5 7 6 2 6 3

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 C o n t r o l u n i t , E B S S p e e d s e n s o r , f r o n t a x l e , l e f t S p e e d s e n s o r , f r o n t a x l e , r i g h t S e n s o r , b r a k e p a d / l i n i n g , f r o n t a x l e , r i g h t S e n s o r , b r a k e p a d / l i n i n g , f r o n t a x l e , l e f t B r a k e p o w e r s e n s o r, E B S P l u g c o n n ., f r a m e I V P l u g c o n n . , f r a m e , l e f t P r e s s u r e c o n t r o l m o d u l e , f r o n t a x l e , r i g h t P r e s s u r e c o n t r o l m o d u l e , f r o n t a x l e , l e f t

K 1 0 0

2 n d e d itio n

9 2


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 4 7


E B S


D a t e : 1 1 . 2 0 0 5 L e g e n d A P r e s s u r e c o n t r o l m o d u l e , f r o n t a x l e , l e f t B P r e s s u r e c o n t r o l m o d u l e , f r o n t a x l e , r i g h t C B r a k e p o w e r s e n s o r

— — A 1 A 3 A 4 1 B B 1 B 3 B 3 B 3 1 5 X X 1 5 2 Y Y 2

– 0 0 0 2 0 2 1 9 2 0 3 2 3 3 3 7 4 8 5 7 6 2 6 3

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 C o n t r o l u n i t , E B S S p e e d s e n s o r , f r o n t a x l e , l e f t S p e e d s e n s o r , f r o n t a x l e , r i g h t S e n s o r , b r a k e p a d / l i n i n g , f r o n t a x l e , r i g h t S e n s o r , b r a k e p a d / l i n i n g , f r o n t a x l e , l e f t B r a k e p o w e r s e n s o r, E B S P l u g c o n n ., f r a m e I V P l u g c o n n . , f r a m e , l e f t P r e s s u r e c o n t r o l m o d u l e , f r o n t a x l e , r i g h t P r e s s u r e c o n t r o l m o d u l e , f r o n t a x l e , l e f t

K 1 0 0

2 n d e d itio n

9 2


E B S

D I A G R A M S


K 1 0 0

2

d

d iti

9 3


E B S


K 1 0 0

2 n d e d itio n


W IR IN G

D IA G R A M

D I A G R A M S

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 4 7


E B S


D a t e : 1 1 . 2 0 0 5 L e g e n d A P r e s s u r e c o n t r o l m o d u l e , r e a r a x l e

— — A 1 A 3 A 4 1 B B 1 B 3 B 3 B 5 B 5 1 5 X X 3 6 X 3 6 2 Y

– 0 0 0 2 0 2 2 1 2 2 3 4 3 5 2 9 3 0 4 8 3 0 7 2 6 4

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 C o n t r o l u n i t , E B S S p e e d s e n s o r , d r i v e n a x l e , l e f t S p e e d s e n s o r , d r i v e n a x l e , r i g h t S e n s o r , b r a k e p a d / l i n i n g , d r i v e n a x l e , r i g h t S e n s o r , b r a k e p a d / l i n i n g , d r i v e n a x l e , l e f t S e n s o r , b r a k e p a d / l i n i n g , a u x i l i a r y a x l e , r i g h t S e n s o r , b r a k e p a d / l i n i n g , a u x i l i a r y a x l e , l e f t P l u g c o n n ., f r a m e I V W i r i n g h a r n e s s , a d a p t e r , s e n s o r , d r i v e n a x l e b r a k e p a d / l i n i n g W i r i n g h a r n e s s , a d a p t e r , s e n s o r , a u x i l i a r y a x l e b r a k e p a d / l i n i n g P r e s s u r e c o n t r o l m o d u l e , r e a r a x l e

K 1 0 0

2 n d e d itio n

9 4


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 4 7


E B S


D a t e : 1 1 . 2 0 0 5 L e g e n d A P r e s s u r e c o n t r o l m o d u l e , r e a r a x l e

— — A 1 A 3 A 4 1 B B 1 B 3 B 3 B 5 B 5 1 5 X X 3 6 X 3 6 2 Y

– 0 0 0 2 0 2 2 1 2 2 3 4 3 5 2 9 3 0 4 8 3 0 7 2 6 4

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 C o n t r o l u n i t , E B S S p e e d s e n s o r , d r i v e n a x l e , l e f t S p e e d s e n s o r , d r i v e n a x l e , r i g h t S e n s o r , b r a k e p a d / l i n i n g , d r i v e n a x l e , r i g h t S e n s o r , b r a k e p a d / l i n i n g , d r i v e n a x l e , l e f t S e n s o r , b r a k e p a d / l i n i n g , a u x i l i a r y a x l e , r i g h t S e n s o r , b r a k e p a d / l i n i n g , a u x i l i a r y a x l e , l e f t P l u g c o n n ., f r a m e I V W i r i n g h a r n e s s , a d a p t e r , s e n s o r , d r i v e n a x l e b r a k e p a d / l i n i n g W i r i n g h a r n e s s , a d a p t e r , s e n s o r , a u x i l i a r y a x l e b r a k e p a d / l i n i n g P r e s s u r e c o n t r o l m o d u l e , r e a r a x l e

K 1 0 0

2 n d e d itio n

9 4


E B S

D I A G R A M S


K 1 0 0

2

d

d iti

9 5


E B S


K 1 0 0

2 n d e d itio n


W IR IN G

D IA G R A M

D I A G R A M S

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 4 7


E B S



— — A 1 A 3 A 4 A 4 F 1 G 1 H 1 H 1 H 1 H 4 3 X X 1 5 X 1 5

– 0 0 0 2 0 2 0 7 6 0 0 1 0 7 4 0 5 1 1 5 1 7 4 2 4 8

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 C o n t r o l u n i t , E B S I n s t r u m e n t a t i o n F u s e , E B S ( A B S ) , t r a i l e r v o l t a g e s u p p l y B a t t e r y 2 A B S , t r a c t o r / t r a i l e r C h e c k la m p , A S R in fo C h e c k l a m p , A B S i n f o . , t r a i l e r C h e c k l a m p , d i r e c t i o n a l s t a b i l i t y T r a i l e r s o c k e t , A B S P lu g c o n n ., f r a m e I I P l u g c o n n ., f r a m e I V

K 1 0 0

2 n d e d itio n

9 6


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 4 7


E B S



— — A 1 A 3 A 4 A 4 F 1 G 1 H 1 H 1 H 1 H 4 3 X X 1 5 X 1 5

– 0 0 0 2 0 2 0 7 6 0 0 1 0 7 4 0 5 1 1 5 1 7 4 2 4 8

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 C o n t r o l u n i t , E B S I n s t r u m e n t a t i o n F u s e , E B S ( A B S ) , t r a i l e r v o l t a g e s u p p l y B a t t e r y 2 A B S , t r a c t o r / t r a i l e r C h e c k la m p , A S R in fo C h e c k l a m p , A B S i n f o . , t r a i l e r C h e c k l a m p , d i r e c t i o n a l s t a b i l i t y T r a i l e r s o c k e t , A B S P lu g c o n n ., f r a m e I I P l u g c o n n ., f r a m e I V

K 1 0 0

2 n d e d itio n

9 6


E B S

D I A G R A M S


K 1 0 0

2

d

d iti

9 7


E B S


K 1 0 0

2 n d e d itio n


W IR IN G

D IA G R A M

D I A G R A M S

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 4 7


E B S



— — A 1 A 3 A 4 F 1 F 1 2 S 1 5 X X 1 5 X 1 6 X 2 5 X 4 6 X 4 7 2 Y

– 0 0 0 2 0 2 6 1 6 2 5 6 4 0 4 8 4 4 4 1 6 4 3 2 7 8


— — — — — — — — — –




K 1 0 0

2 n d e d itio n

9 8


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 4 7


E B S



— — A 1 A 3 A 4 F 1 F 1 2 S 1 5 X X 1 5 X 1 6 X 2 5 X 4 6 X 4 7 2 Y

– 0 0 0 2 0 2 6 1 6 2 5 6 4 0 4 8 4 4 4 1 6 4 3 2 7 8


— — — — — — — — — –




K 1 0 0

2 n d e d itio n

9 8


E B S

D I A G R A M S


K 1 0 0

2

d

d iti

9 9


E B S


K 1 0 0

2 n d e d itio n


W IR IN G E C A S

D IA G R A M

D I A G R A M S

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 5 0

2 ( 4 x 2 ) s h e e t 1 o f 2

D a t e : 0 9 . 0 6 L e g e n d A V o l t a g e s u p p l y B R e m o t e c o n t r o l C C h e c k la m p

— — A 1 A 1 A 2 A 3 A 4 F 1 F 3 H 3 7 X X 1 6

– 0 0 4 3 2 1 0 2 0 7 6 4 7 5 9 4 7 0 4 4

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C o n t r o l u n i t , E C A S R e m o t e c o n t r o l , E C A S C e n t r a l c o m p u t e r 2 I n s t r u m e n t a t i o n F u s e , E C A S ( t e r m in a l 3 0 ) F u s e , c a b , o u t s id e ( t e r m i n a l 1 5 ) C h e c k l a m p , E C A S , f a u l t / w a r n i n g P l u g c o n n . , E C A S r i d e h e i g h t I I E a r t h i n g p o i n t , c a b , n e x t t o c e n t r a l e l e c t r i c a l s y s t e m

K 1 0 0

2 n d e d it io n

1 0 0

A D D I T IO N A L W IR I N G W IR IN G E C A S

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 5 0

2 ( 4 x 2 ) s h e e t 1 o f 2


— — A 1 A 1 A 2 A 3 A 4 F 1 F 3 H 3 7 X X 1 6

– 0 0 4 3 2 1 0 2 0 7 6 4 7 5 9 4 7 0 4 4


K 1 0 0

2 n d e d it io n

1 0 0

A D D I T IO N A L W IR I N G E C A S

D I A G R A M S

2 ( 4 x 2 ) s h e e t 1 o f 2

K 1 0 0

2

d

d it i

1 0 1


2 ( 4 x 2 ) s h e e t 1 o f 2

K 1 0 0

2 n d e d it io n

1 0 1 A D D I T IO N A L W IR I N G

W IR IN G E C A S

D I A G R A M S

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 5 0

2 ( 4 x 2 ) s h e e t 2 o f 2

D a t e : 1 1 . 0 5 L e g e n d A P o s i t i o n s e n s o r s B P r e s s u r e s e n s o r s C S o l e n o i d v a lv e s

— — A 1 A 1 A 3 B 1 B 1 1 9 X 1 Y

– 0 0 4 3 0 2 2 9 3 0 4 5 3 2

— — — — — — — — C e n t r a l e l e c t r i c a l C o n tr o l u n it, E C A C e n tr a l c o m p u te r P o s itio n s e n s o r , r P o s itio n s e n s o r , r P lu g c o n n ., E C A S V a l v e b l o c k , E C A

— — — — — — — — — — — — — – s y s t e m S 2 e a r a x l e , l e f t e a r a x l e , r i g h t / C D C S

K 1 0 0

2 n d e d it io n

1 0 2


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 5 0

2 ( 4 x 2 ) s h e e t 2 o f 2


— — A 1 A 1 A 3 B 1 B 1 1 9 X 1 Y

– 0 0 4 3 0 2 2 9 3 0 4 5 3 2

— — — — — — — — C e n t r a l e l e c t r i c a l C o n tr o l u n it, E C A C e n tr a l c o m p u te r P o s itio n s e n s o r , r P o s itio n s e n s o r , r P lu g c o n n ., E C A S V a l v e b l o c k , E C A

— — — — — — — — — — — — — – s y s t e m S 2 e a r a x l e , l e f t e a r a x l e , r i g h t / C D C S

K 1 0 0

2 n d e d it io n

1 0 2


D I A G R A M S

2 ( 4 x 2 ) s h e e t 2 o f 2

K 1 0 0

2

d

d it i

1 0 3


2 ( 4 x 2 ) s h e e t 2 o f 2

K 1 0 0

2 n d e d it io n


W IR IN G E C A S

D I A G R A M S

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 4 8

2 ( 4 x 2 - s e m i t r a i l e r ) s h e e t 1 o f 2


— — A 1 A 1 A 2 A 3 A 4 F 1 F 3 H 3 7 X X 1 6

– 0 0 4 3 2 1 0 2 0 7 6 4 7 5 9 4 7 0 4 4


K 1 0 0

2 n d e d it io n

1 0 4


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 4 8



— — A 1 A 1 A 2 A 3 A 4 F 1 F 3 H 3 7 X X 1 6

– 0 0 4 3 2 1 0 2 0 7 6 4 7 5 9 4 7 0 4 4


K 1 0 0

2 n d e d it io n

1 0 4


D I A G R A M S


K 1 0 0

2

d

d it i

1 0 5



K 1 0 0

2 n d e d it io n


W IR IN G E C A S

D I A G R A M S

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 4 8



— — A 1 A 1 A 3 B 1 1 9 X 1 Y

– 0 0 4 3 0 2 3 0 4 5 3 2

— — — — — — — — C e n t r a l e l e c t r i c a l C o n tr o l u n it, E C A C e n tr a l c o m p u te r P o s itio n s e n s o r , r P lu g c o n n ., E C A S V a l v e b l o c k , E C A

— — — — — — — — — — — — — – s y s t e m S 2 e a r a x l e , r i g h t / C D C S

K 1 0 0

2 n d e d it io n

1 0 6


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 4 8



— — A 1 A 1 A 3 B 1 1 9 X 1 Y

– 0 0 4 3 0 2 3 0 4 5 3 2

— — — — — — — — C e n t r a l e l e c t r i c a l C o n tr o l u n it, E C A C e n tr a l c o m p u te r P o s itio n s e n s o r , r P lu g c o n n ., E C A S V a l v e b l o c k , E C A

— — — — — — — — — — — — — – s y s t e m S 2 e a r a x l e , r i g h t / C D C S

K 1 0 0

2 n d e d it io n

1 0 6


D I A G R A M S


K 1 0 0

2

d

d it i

1 0 7



K 1 0 0

2 n d e d it io n


W IR IN G E C A S

D I A G R A M S

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 5 3

2 ( 6 x 2 o p t i o n a l l y w i t h A L M / c r a n e ) s h e e t 1 o f 2

D a t e : 0 6 . 0 7 L e g e n d A B u t t o n s B R e m o t e c o n t r o l

— — A 1 A 1 A 2 A 3 A 4 F 1 F 3 H 3 2 S S 9 7 X X 1 6 X 4 7

– 0 0 4 3 2 1 0 2 0 7 6 4 7 5 9 4 6 7 5 4 7 0 4 4 3 2

— — — — — — — — — — — — — — — — — — — C e n t r a l e l e c t r i c a l s y s t e m C o n t r o l u n i t , E C A S R e m o t e c o n t r o l , E C A S C e n t r a l c o m p u t e r 2 I n s t r u m e n t a t i o n F u s e , E C A S ( t e r m in a l 3 0 ) F u s e , c a b , o u t s id e ( t e r m i n a l 1 5 ) C h e c k l a m p , E C A S , f a u l t / w a r n i n g B u t t o n , E C A S , s t a r t i n g - t r a c t i o n c o n t r o l B u t t o n , E C A S , t r a i l i n g a x l e / l e a d i n g a x l e , r a P l u g c o n n . , E C A S r i d e h e i g h t I I E a r t h i n g p o i n t , c a b , n e x t t o c e n t r a l e l e c t r i c P o t e n t i a l d i s t r i b u t o r , l i n e 1 6 0 0 0 , s w i t c h l i g h

— — –

i s e / r e l i e v e a l s y s t e m t i n g

K 1 0 0

2 n d e d it io n

1 0 8


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 5 3


D a t e : 0 6 . 0 7 L e g e n d A B u t t o n s B R e m o t e c o n t r o l

— — A 1 A 1 A 2 A 3 A 4 F 1 F 3 H 3 2 S S 9 7 X X 1 6 X 4 7

– 0 0 4 3 2 1 0 2 0 7 6 4 7 5 9 4 6 7 5 4 7 0 4 4 3 2

— — — — — — — — — — — — — — — — — — — C e n t r a l e l e c t r i c a l s y s t e m C o n t r o l u n i t , E C A S R e m o t e c o n t r o l , E C A S C e n t r a l c o m p u t e r 2 I n s t r u m e n t a t i o n F u s e , E C A S ( t e r m in a l 3 0 ) F u s e , c a b , o u t s id e ( t e r m i n a l 1 5 ) C h e c k l a m p , E C A S , f a u l t / w a r n i n g B u t t o n , E C A S , s t a r t i n g - t r a c t i o n c o n t r o l B u t t o n , E C A S , t r a i l i n g a x l e / l e a d i n g a x l e , r a P l u g c o n n . , E C A S r i d e h e i g h t I I E a r t h i n g p o i n t , c a b , n e x t t o c e n t r a l e l e c t r i c P o t e n t i a l d i s t r i b u t o r , l i n e 1 6 0 0 0 , s w i t c h l i g h

— — –

i s e / r e l i e v e a l s y s t e m t i n g

K 1 0 0

2 n d e d it io n

1 0 8


D I A G R A M S


K 1 0 0

2

d

d it i

1 0 9



K 1 0 0

2 n d e d it io n


W IR IN G E C A S

D I A G R A M S

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 5 3



— — A 1 A 1 A 3 B 1 B 1 B 6 1 9 X 1 Y — —

– 0 0 4 3 0 2 2 9 3 0 1 0 4 5 6 1 –

— — — — — — — — — — — — — — — C e n t r a l e l e c t r i c a l s y s t e m C o n t r o l u n i t , E C A S C e n t r a l c o m p u t e r 2 P o s i t i o n s e n s o r , r e a r a x l e , l e f t P o s i t i o n s e n s o r , r e a r a x l e , r i g h t P r e s s u r e s e n s o r , r e a r a x l e , l e f t P l u g c o n n . , E C A S / C D C S o l e n o i d v a l v e b l o c k , E C A S , r e a r — — — — — — — — — — — — — — — 1 M a r k i n g s l e e v e “ 1 ” o n c o n n e c t o r Y 2 M a r k i n g s l e e v e “ 2 ” o n c o n n e c t o r Y

— — — — — — –

a x le — — 1 6 1 1 6 1

( I I = t r a i l i n g a x l e / l e a d i n g a x l e ) — — — — – / 6 1 / 6 2

K 1 0 0

2 n d e d itio n

1 1 0


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 5 3



— — A 1 A 1 A 3 B 1 B 1 B 6 1 9 X 1 Y — —

– 0 0 4 3 0 2 2 9 3 0 1 0 4 5 6 1 –

— — — — — — — — — — — — — — — C e n t r a l e l e c t r i c a l s y s t e m C o n t r o l u n i t , E C A S C e n t r a l c o m p u t e r 2 P o s i t i o n s e n s o r , r e a r a x l e , l e f t P o s i t i o n s e n s o r , r e a r a x l e , r i g h t P r e s s u r e s e n s o r , r e a r a x l e , l e f t P l u g c o n n . , E C A S / C D C S o l e n o i d v a l v e b l o c k , E C A S , r e a r — — — — — — — — — — — — — — — 1 M a r k i n g s l e e v e “ 1 ” o n c o n n e c t o r Y 2 M a r k i n g s l e e v e “ 2 ” o n c o n n e c t o r Y

— — — — — — –

a x le — — 1 6 1 1 6 1

( I I = t r a i l i n g a x l e / l e a d i n g a x l e ) — — — — – / 6 1 / 6 2

K 1 0 0

2 n d e d itio n

1 1 0


D I A G R A M S


K 1 0 0

2

d

d iti

1 1 1



K 1 0 0

2 n d e d itio n


W IR IN G E D C 7

D I A G R A M S

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 6 2 4

E u r o 3 D 2 0 .. . s h e e t 1 o f 3

D a t e : 0 2 . 2 0 0 8 L e g e n d A R B P C E D C E C F C

— — A 1 A 3 A 4 B 4 2 Y Y 3 Y 3 Y 3 Y 3 Y 3 Y 3 Y 3

– 0 0 0 2 3 5 8 7 8 0 3 2 4 1 4 2 4 3 4 4 4 5 4 6

a ilro p x h a y lin y lin y lin

p r e s s o r tio n u s t g d e r 1 d e r 3 d e r 5

u r e s e n s o r a l v a l v e , f u e l a s r e c ir c u la tio n + 2 + 4 + 6

c y l i n d e r

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 C o n t r o l u n i t , E D C R a i l - p r e s s u r e s e n s o r E G R c y l i n d e r P r o p o r t i o n a l v a l v e , f u e l I n j e c t o r , 1 s t c y l i n d e r I n j e c t o r , 2 n d c y l i n d e r I n j e c t o r , 3 r d c y l i n d e r I n j e c t o r , 4 t h c y l i n d e r I n j e c t o r , 5 t h c y l i n d e r I n j e c t o r , 6 t h c y l i n d e r

K 1 0 0

2 n d e d itio n

1 1 2

A D D I T IO N A L W IR I N G W IR IN G E D C 7

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 6 2 4

E u r o 3 D 2 0 .. . s h e e t 1 o f 3

D a t e : 0 2 . 2 0 0 8 L e g e n d A R B P C E D C E C F C

— — A 1 A 3 A 4 B 4 2 Y Y 3 Y 3 Y 3 Y 3 Y 3 Y 3 Y 3

– 0 0 0 2 3 5 8 7 8 0 3 2 4 1 4 2 4 3 4 4 4 5 4 6

a ilro p x h a y lin y lin y lin

p r e s s o r tio n u s t g d e r 1 d e r 3 d e r 5

u r e s e n s o r a l v a l v e , f u e l a s r e c ir c u la tio n + 2 + 4 + 6

c y l i n d e r

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 C o n t r o l u n i t , E D C R a i l - p r e s s u r e s e n s o r E G R c y l i n d e r P r o p o r t i o n a l v a l v e , f u e l I n j e c t o r , 1 s t c y l i n d e r I n j e c t o r , 2 n d c y l i n d e r I n j e c t o r , 3 r d c y l i n d e r I n j e c t o r , 4 t h c y l i n d e r I n j e c t o r , 5 t h c y l i n d e r I n j e c t o r , 6 t h c y l i n d e r

K 1 0 0

2 n d e d itio n

1 1 2

A D D I T IO N A L W IR I N G E D C 7

D I A G R A M S

E u r o 3 D 2 0 .. . s h e e t 1 o f 3

K 1 0 0

2

d

d iti

1 1 3


E u r o 3 D 2 0 .. . s h e e t 1 o f 3

K 1 0 0

2 n d e d itio n


W IR IN G E D C 7

D I A G R A M S

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 6 2 4

E u r o 3 D 2 0 .. . s h e e t 2 o f 3

D a t e : 0 2 . 2 0 0 8 L e g e n d A W B C C C D F E A F C G O

— — A 1 A 3 A 4 1 B B 1 B 1 B 1 B 3 B 4 B 4

– 0 0 0 2 3 5 0 4 2 3 2 4 2 5 7 7 8 8 8 9

a te r t e m p e ra r a n k s h a f t a m s h a f t u e l p re s s u re ir te m p e r a tu r h a rg e p re s s u il p r e s s u re s

t u r e s e n s o r

s e n s o r e s e n s o r r e s e n s o r e n s o r

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 C o n t r o l u n i t , E D C O i l p r e s s u r e s e n s o r T e m p e r a t u r e s e n s o r , c h a r g e a i r , E D C / C N G T e m p e r a t u r e s e n s o r , c o o l a n t P r e s s u r e s e n s o r , c h a r g e a i r F u e l p r e s s u r e s e n s o r S p e e d i n c r e m e n t s e n s o r S p e e d s e g m e n t s e n s o r

K 1 0 0

2 n d e d itio n

1 1 4


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 6 2 4

E u r o 3 D 2 0 .. . s h e e t 2 o f 3

D a t e : 0 2 . 2 0 0 8 L e g e n d A W B C C C D F E A F C G O

— — A 1 A 3 A 4 1 B B 1 B 1 B 1 B 3 B 4 B 4

– 0 0 0 2 3 5 0 4 2 3 2 4 2 5 7 7 8 8 8 9

a te r t e m p e ra r a n k s h a f t a m s h a f t u e l p re s s u re ir te m p e r a tu r h a rg e p re s s u il p r e s s u re s

t u r e s e n s o r

s e n s o r e s e n s o r r e s e n s o r e n s o r

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 C o n t r o l u n i t , E D C O i l p r e s s u r e s e n s o r T e m p e r a t u r e s e n s o r , c h a r g e a i r , E D C / C N G T e m p e r a t u r e s e n s o r , c o o l a n t P r e s s u r e s e n s o r , c h a r g e a i r F u e l p r e s s u r e s e n s o r S p e e d i n c r e m e n t s e n s o r S p e e d s e g m e n t s e n s o r

K 1 0 0

2 n d e d itio n

1 1 4


D I A G R A M S

E u r o 3 D 2 0 .. . s h e e t 2 o f 3

K 1 0 0

2

d

d iti

1 1 5


E u r o 3 D 2 0 .. . s h e e t 2 o f 3

K 1 0 0

2 n d e d itio n


W IR IN G E D C 7

D I A G R A M S

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 6 2 4

E u r o 3 D 2 0 .. . s h e e t 3 o f 3

D a t e : 0 2 . 2 0 0 8 L e g e n d A M B D C E D V

— — A 1 A 3 A 4 A 4 A 4 F 1 F 2 F 3 1 H H 2 H 3 1 5 X X 1 9 X 1 9 X 2 5 X 3 3

– 0 0 0 2 0 3 0 7 3 5 6 3 3 6 5 5 0 9 9 6 7 4 5 9 0 6 0 7 4 4 8 1

-C A N ia g n o a r th in o lta g e

d a t a b u s s is g p o i n t , b o x s u p p l y

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 V e h i c l e m a n a g e m e n t c o m p u t e r I n s t r u m e n t a t i o n C o n t r o l u n i t , E D C F u s e , e n g i n e c o n t r o l ( t e r m i n a l 3 0 ) F u s e , e n g i n e r e g u l a t i o n ( t e r m i n a l 1 5 ) M a i n f u s e ( t e r m i n a l 3 0 - 2 ) C h e c k l a m p , o i l p r e s s u r e C h e c k l a m p , E D C ( f a u lt ) C h e c k l a m p , a i r c le a n e r d i r t y P l u g c o n n . , e n g i n e / E D C / g e a r b o x I V T h r e a d e d p in M 6 ( m o t o r p o w e r b o x ) T h r e a d e d p in M 6 ( m o t o r p o w e r b o x ) P o t e n t i a l d i s t r i b u t o r , 2 1 - p i n , K - l i n e T h r e a d e d p i n ( m o t o r p o w e r b o x )

K 1 0 0

2 n d e d itio n

1 1 6


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 6 2 4

E u r o 3 D 2 0 .. . s h e e t 3 o f 3

D a t e : 0 2 . 2 0 0 8 L e g e n d A M B D C E D V

— — A 1 A 3 A 4 A 4 A 4 F 1 F 2 F 3 1 H H 2 H 3 1 5 X X 1 9 X 1 9 X 2 5 X 3 3

– 0 0 0 2 0 3 0 7 3 5 6 3 3 6 5 5 0 9 9 6 7 4 5 9 0 6 0 7 4 4 8 1

-C A N ia g n o a r th in o lta g e

d a t a b u s s is g p o i n t , b o x s u p p l y

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 V e h i c l e m a n a g e m e n t c o m p u t e r I n s t r u m e n t a t i o n C o n t r o l u n i t , E D C F u s e , e n g i n e c o n t r o l ( t e r m i n a l 3 0 ) F u s e , e n g i n e r e g u l a t i o n ( t e r m i n a l 1 5 ) M a i n f u s e ( t e r m i n a l 3 0 - 2 ) C h e c k l a m p , o i l p r e s s u r e C h e c k l a m p , E D C ( f a u lt ) C h e c k l a m p , a i r c le a n e r d i r t y P l u g c o n n . , e n g i n e / E D C / g e a r b o x I V T h r e a d e d p in M 6 ( m o t o r p o w e r b o x ) T h r e a d e d p in M 6 ( m o t o r p o w e r b o x ) P o t e n t i a l d i s t r i b u t o r , 2 1 - p i n , K - l i n e T h r e a d e d p i n ( m o t o r p o w e r b o x )

K 1 0 0

2 n d e d itio n

1 1 6


D I A G R A M S

E u r o 3 D 2 0 .. . s h e e t 3 o f 3

K 1 0 0

2

d

d iti

1 1 7


D I A G R A M S

E u r o 3 D 2 0 .. . s h e e t 3 o f 3

K 1 0 0

2 n d e d itio n


W IR IN G

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 6 2 5

E D C 7 C o m m o n R a il E u r o 3 D 2 6 7 6 L F , E -E G R

s h e e t 1 o f 4

D a t e : 0 2 . 2 0 0 8 L e g e n d A R B C C C D C E C

— — A 1 A 3 A 4 B 4 B 6 3 Y Y 3 Y 3 Y 3 Y 3 Y 3 Y 4 Y 4

– 0 0 0 2 3 5 8 7 7 3 4 1 4 2 4 3 4 4 4 5 4 6 5 8 6 0

a o y y y

il-p r e n tro l lin d e lin d e lin d e

s le r r r

s u d 1 + 3 + 5 +

r e s e n s o r e x h a u s t g a s r e c i r c u l a t i o n 2 4 6

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 C o n t r o l u n i t , E D C R a i l - p r e s s u r e s e n s o r P o s i t i o n s e n s o r , E - E G R , c y l i n d e r I n j e c t o r , 1 s t c y l i n d e r I n j e c t o r , 2 n d c y l i n d e r I n j e c t o r , 3 r d c y l i n d e r I n j e c t o r , 4 t h c y l i n d e r I n j e c t o r , 5 t h c y l i n d e r I n j e c t o r , 6 t h c y l i n d e r P r o p o r t i o n a l v a l v e , E - E G R S h u t - o f f v a l v e - E - E G R / c o n t r o l l e d E V B

K 1 0 0

2 n d e d itio n

1 1 8


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 6 2 5


s h e e t 1 o f 4

D a t e : 0 2 . 2 0 0 8 L e g e n d A R B C C C D C E C

— — A 1 A 3 A 4 B 4 B 6 3 Y Y 3 Y 3 Y 3 Y 3 Y 3 Y 4 Y 4

– 0 0 0 2 3 5 8 7 7 3 4 1 4 2 4 3 4 4 4 5 4 6 5 8 6 0

a o y y y

il-p r e n tro l lin d e lin d e lin d e

s le r r r

s u d 1 + 3 + 5 +

r e s e n s o r e x h a u s t g a s r e c i r c u l a t i o n 2 4 6

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 C o n t r o l u n i t , E D C R a i l - p r e s s u r e s e n s o r P o s i t i o n s e n s o r , E - E G R , c y l i n d e r I n j e c t o r , 1 s t c y l i n d e r I n j e c t o r , 2 n d c y l i n d e r I n j e c t o r , 3 r d c y l i n d e r I n j e c t o r , 4 t h c y l i n d e r I n j e c t o r , 5 t h c y l i n d e r I n j e c t o r , 6 t h c y l i n d e r P r o p o r t i o n a l v a l v e , E - E G R S h u t - o f f v a l v e - E - E G R / c o n t r o l l e d E V B

K 1 0 0

2 n d e d itio n

1 1 8

A D D I T IO N A L W IR I N G E D C 7 C o m m o n R a il E u r o 3 D 2 6 7 6 L F , E -E G R

D I A G R A M S

s h e e t 1 o f 4

K 1 0 0

2

d

d iti

1 1 9


s h e e t 1 o f 4

K 1 0 0

2 n d e d itio n


W IR IN G

D IA G R A M

D I A G R A M S

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 6 2 5


s h e e t 2 o f 4

D a t e : 0 2 . 2 0 0 8 L e g e n d A W B C C C D F E P F A G C H O

— — A 1 A 3 A 4 1 B B 1 B 1 B 3 B 4 B 4 B 6 3 Y

– 0 0 0 2 3 5 0 4 2 3 2 4 7 7 8 8 8 9 2 3 3 2

a t e r t e m p e r a t u r e s e n s o r r a n k s h a f t a m s h a f t u e l p r e s s u r e s e n s o r r o p o r t i o n a l v a l v e , f u e l i r t e m p e r a t u r e s e n s o r h a r g e p r e s s u r e /t e m p e r a t u r e s e n s o r i l p r e s s u r e s e n s o r

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 C o n t r o l u n i t , E D C O i l p r e s s u r e s e n s o r T e m p e r a t u r e s e n s o r , c h a r g e a i r , E D C / C N G T e m p e r a t u r e s e n s o r , c o o l a n t F u e l p r e s s u r e s e n s o r S p e e d i n c r e m e n t s e n s o r S p e e d s e g m e n t s e n s o r C h a r g e p r e s s u r e / t e m p e r a t u r e s e n s o r P r o p o r t i o n a l v a l v e , f u e l

K 1 0 0

2 n d e d it io n

1 2 0


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 6 2 5


s h e e t 2 o f 4

D a t e : 0 2 . 2 0 0 8 L e g e n d A W B C C C D F E P F A G C H O

— — A 1 A 3 A 4 1 B B 1 B 1 B 3 B 4 B 4 B 6 3 Y

– 0 0 0 2 3 5 0 4 2 3 2 4 7 7 8 8 8 9 2 3 3 2

a t e r t e m p e r a t u r e s e n s o r r a n k s h a f t a m s h a f t u e l p r e s s u r e s e n s o r r o p o r t i o n a l v a l v e , f u e l i r t e m p e r a t u r e s e n s o r h a r g e p r e s s u r e /t e m p e r a t u r e s e n s o r i l p r e s s u r e s e n s o r

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 C o n t r o l u n i t , E D C O i l p r e s s u r e s e n s o r T e m p e r a t u r e s e n s o r , c h a r g e a i r , E D C / C N G T e m p e r a t u r e s e n s o r , c o o l a n t F u e l p r e s s u r e s e n s o r S p e e d i n c r e m e n t s e n s o r S p e e d s e g m e n t s e n s o r C h a r g e p r e s s u r e / t e m p e r a t u r e s e n s o r P r o p o r t i o n a l v a l v e , f u e l

K 1 0 0

2 n d e d it io n

1 2 0


D I A G R A M S

s h e e t 2 o f 4

K 1 0 0

2

d

d it i

1 2 1


s h e e t 2 o f 4

K 1 0 0

2 n d e d it io n


W IR IN G

D IA G R A M

D I A G R A M S

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 6 2 5


s h e e t 3 o f 4

D a t e : 0 2 . 2 0 0 8 L e g e n d A M B H C D D E E V

— — A 1 A 3 A 4 A 4 F 1 F 2 F 3 1 5 X X 1 9 X 1 9 X 2 5 X 3 3

– 0 0 0 2 0 3 3 5 6 3 3 6 5 5 5 9 0 6 0 7 4 4 8 1

-C A N d a ta b O B D C A N ia g n o s is a r th in g p o in o lta g e s u p p D

u s d a ta b u s t , b o x l y

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 V e h i c l e m a n a g e m e n t c o m p u t e r C o n t r o l u n i t , E D C F u s e , e n g i n e r e g u l a t i o n ( t e r m i n a l 3 0 ) F u s e , e n g i n e r e g u l a t i o n ( t e r m i n a l 1 5 ) M a i n f u s e ( t e r m i n a l 3 0 - 2 ) P l u g c o n n . , e n g i n e / E D C / g e a r b o x I V T h r e a d e d p in M 6 ( m o t o r p o w e r b o x ) T h r e a d e d p in M 6 ( m o t o r p o w e r b o x ) P o t e n t i a l d i s t r i b u t o r , 2 1 - p i n , K - l i n e T h r e a d e d p i n ( m o t o r p o w e r b o x )

K 1 0 0

2 n d e d it io n

1 2 2


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 6 2 5


s h e e t 3 o f 4

D a t e : 0 2 . 2 0 0 8 L e g e n d A M B H C D D E E V

— — A 1 A 3 A 4 A 4 F 1 F 2 F 3 1 5 X X 1 9 X 1 9 X 2 5 X 3 3

– 0 0 0 2 0 3 3 5 6 3 3 6 5 5 5 9 0 6 0 7 4 4 8 1

-C A N d a ta b O B D C A N ia g n o s is a r th in g p o in o lta g e s u p p D

u s d a ta b u s t , b o x l y

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 V e h i c l e m a n a g e m e n t c o m p u t e r C o n t r o l u n i t , E D C F u s e , e n g i n e r e g u l a t i o n ( t e r m i n a l 3 0 ) F u s e , e n g i n e r e g u l a t i o n ( t e r m i n a l 1 5 ) M a i n f u s e ( t e r m i n a l 3 0 - 2 ) P l u g c o n n . , e n g i n e / E D C / g e a r b o x I V T h r e a d e d p in M 6 ( m o t o r p o w e r b o x ) T h r e a d e d p in M 6 ( m o t o r p o w e r b o x ) P o t e n t i a l d i s t r i b u t o r , 2 1 - p i n , K - l i n e T h r e a d e d p i n ( m o t o r p o w e r b o x )

K 1 0 0

2 n d e d it io n

1 2 2


D I A G R A M S

s h e e t 3 o f 4

K 1 0 0

2

d

d it i

1 2 3


s h e e t 3 o f 4

K 1 0 0

2 n d e d it io n


W IR IN G

D IA G R A M

D I A G R A M S

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 6 2 5


s h e e t 4 o f 4

D a t e : 0 2 . 2 0 0 8 L e g e n d A E x h a u s t g a s t e m p e r a tu r e s e n s o r 1 B E x h a u s t g a s r e la t i v e p r e s s u r e s e n s o r

— — A 1 A 3 A 4 A 4 5 B B 6 1 H H 2 H 3

– 0 0 0 2 0 7 3 5 6 1 8 3 0 9 9 6 7 4

— — — C e n tra C e n tr a In s tr u m C o n tr o E x h a u E x h a u C h e c k C h e c k C h e c k

— — — — — — — — — — l e l e c t r i c a l s y s t e m l c o m p u t e r 2 e n t a t i o n l u n i t , E D C s t g a s te m p e r a tu re s e s t g a s r e l a t i v e p r e s s u l a m p , o i l p r e s s u r e l a m p , E D C ( f a u lt ) l a m p , a i r  l t e r c o n t a m

— — — — — — — — –

n s o r 1 ( u p s tr e a m r e s e n s o r

o f  l t e r )

i n a t e d

K 1 0 0

2 n d e d it io n

1 2 4


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 6 2 5


s h e e t 4 o f 4

D a t e : 0 2 . 2 0 0 8 L e g e n d A E x h a u s t g a s t e m p e r a tu r e s e n s o r 1 B E x h a u s t g a s r e la t i v e p r e s s u r e s e n s o r

— — A 1 A 3 A 4 A 4 5 B B 6 1 H H 2 H 3

– 0 0 0 2 0 7 3 5 6 1 8 3 0 9 9 6 7 4

— — — C e n tra C e n tr a In s tr u m C o n tr o E x h a u E x h a u C h e c k C h e c k C h e c k

— — — — — — — — — — l e l e c t r i c a l s y s t e m l c o m p u t e r 2 e n t a t i o n l u n i t , E D C s t g a s te m p e r a tu re s e s t g a s r e l a t i v e p r e s s u l a m p , o i l p r e s s u r e l a m p , E D C ( f a u lt ) l a m p , a i r  l t e r c o n t a m

— — — — — — — — –

n s o r 1 ( u p s tr e a m r e s e n s o r

o f  l t e r )

i n a t e d

K 1 0 0

2 n d e d it io n

1 2 4


D I A G R A M S

s h e e t 4 o f 4

K 1 0 0

2

d

d it i

1 2 5


s h e e t 4 o f 4

K 1 0 0

2 n d e d it io n


W IR IN G

D IA G R A M

E l e c tr ic c a b tilt m

D I A G R A M S

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 6 1 7 e c h a n is m

s h e e t 1 o f 1

0 2 . 2 0 0 8 L e g e n d A V B S C E D T E T

— — A 1 A 3 6 B F 1 4 K M 1 3 S 1 6 X X 1 8 X 4 8

– 0 0 0 2 9 3 9 0 1 5 3 7 7 5 4 4 4 2 5 8

o lta e n s n a b ilt b ilt p

g e o r le u t u m

s u p p l y s w i t c h , f r o n t  a p s w i t c h t o n s p

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 S e n s o r s w i t c h , f r o n t  a p F u s e , c a b t i l t m e c h a n i s m R e l a y , c a b t i l t m e c h a n i s m P u m p , c a b t i l t m e c h a n i s m B u t t o n , c a b t i l t m e c h a n i s m a c t u a t i o n E a r t h i n g p o i n t , c a b , n e x t t o c e n t r a l e l e c t r i c a l s y s t e m P l u g c o n n . , c a b t i l t m e c h a n i s m P l u g c o n n . , f r o n t  a p s e n s in g

K 1 0 0

2 n d e d it io n

1 2 6


D IA G R A M

E l e c tr ic c a b tilt m

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 6 1 7 e c h a n is m

s h e e t 1 o f 1

0 2 . 2 0 0 8 L e g e n d A V B S C E D T E T

— — A 1 A 3 6 B F 1 4 K M 1 3 S 1 6 X X 1 8 X 4 8

– 0 0 0 2 9 3 9 0 1 5 3 7 7 5 4 4 4 2 5 8

o lta e n s n a b ilt b ilt p

g e o r le u t u m

s u p p l y s w i t c h , f r o n t  a p s w i t c h t o n s p

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 S e n s o r s w i t c h , f r o n t  a p F u s e , c a b t i l t m e c h a n i s m R e l a y , c a b t i l t m e c h a n i s m P u m p , c a b t i l t m e c h a n i s m B u t t o n , c a b t i l t m e c h a n i s m a c t u a t i o n E a r t h i n g p o i n t , c a b , n e x t t o c e n t r a l e l e c t r i c a l s y s t e m P l u g c o n n . , c a b t i l t m e c h a n i s m P l u g c o n n . , f r o n t  a p s e n s in g

K 1 0 0

2 n d e d it io n

1 2 6

A D D I T IO N A L W IR I N G E l e c tr ic c a b tilt m

e c h a n is m

D I A G R A M S

s h e e t 1 o f 1

K 1 0 0

2

d

d it i

1 2 7

A D D I T IO N A L W IR I N G E l e c tr ic c a b tilt m

e c h a n is m

s h e e t 1 o f 1

K 1 0 0

2 n d e d it io n


W IR IN G

D IA G R A M

D I A G R A M S

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 6 0

E V B , c o n t r o lle d s h e e t 1

o f 1

D a t e : 0 9 . 2 0 0 6 L e g e n d A E n g i n e b r a k e / E V B , c o n t r o l l e d B S u s t a i n e d - a c t i o n b r a k e l e v e r w i t h o u t m u l t i f u n c t i o n a l s t e e r i n g w h e e l C S u s t a i n e d - a c t i o n b r a k e l e v e r w i t h m u l t i f u n c t i o n a l s t e e r i n g w h e e l

— — A 1 0 A 3 0 A 4 0 A 4 0 A 4 0 A 4 3 A 9 4 1 4 H 1 5 5 X X 1 9 0 X 1 9 6 X 2 4 0 X 3 3 8 X 4 3 9 2 8 Y Y 3 5

–

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m 2 C e n t r a l c o m p u t e r 2 2 C o n t r o l u n i t , E B S 3 V e h i c l e m a n a g e m e n t c o m p u t e r 7 I n s t r u m e n t a t i o n 7 S u s t a i n e d - a c t i o n b r a k e l e v e r 2 S t e e r i n g c o l u m n s t a l k , r e t a r d e r / g e a r b o x 5 C h e c k l a m p , r e t a r d e r 7 P l u g c o n n . , f r a m e , l e f t 4 T h r e a d e d p in M 6 ( m o t o r p o w e r b o x ) 9 P l u g c o n n . , e n g i n e b r a k e s w i t c h 8 P l u g c o n n . , E V B m o d u l e 5 P l u g c o n n . , e n g i n e b r a k e /E V B 7 P l u g c o n n . , m u l t i f u n c t i o n a l s t e e r i n g w h e e l 1 S o l e n o i d v a lv e , e n g i n e b r a k e / E V B 5 E V B m o d u l e 0

K 1 0 0

2 n d e d it io n

1 2 8


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 6 0

E V B , c o n t r o lle d s h e e t 1

o f 1

D a t e : 0 9 . 2 0 0 6 L e g e n d A E n g i n e b r a k e / E V B , c o n t r o l l e d B S u s t a i n e d - a c t i o n b r a k e l e v e r w i t h o u t m u l t i f u n c t i o n a l s t e e r i n g w h e e l C S u s t a i n e d - a c t i o n b r a k e l e v e r w i t h m u l t i f u n c t i o n a l s t e e r i n g w h e e l

— — A 1 0 A 3 0 A 4 0 A 4 0 A 4 0 A 4 3 A 9 4 1 4 H 1 5 5 X X 1 9 0 X 1 9 6 X 2 4 0 X 3 3 8 X 4 3 9 2 8 Y Y 3 5

–

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m 2 C e n t r a l c o m p u t e r 2 2 C o n t r o l u n i t , E B S 3 V e h i c l e m a n a g e m e n t c o m p u t e r 7 I n s t r u m e n t a t i o n 7 S u s t a i n e d - a c t i o n b r a k e l e v e r 2 S t e e r i n g c o l u m n s t a l k , r e t a r d e r / g e a r b o x 5 C h e c k l a m p , r e t a r d e r 7 P l u g c o n n . , f r a m e , l e f t 4 T h r e a d e d p in M 6 ( m o t o r p o w e r b o x ) 9 P l u g c o n n . , e n g i n e b r a k e s w i t c h 8 P l u g c o n n . , E V B m o d u l e 5 P l u g c o n n . , e n g i n e b r a k e /E V B 7 P l u g c o n n . , m u l t i f u n c t i o n a l s t e e r i n g w h e e l 1 S o l e n o i d v a lv e , e n g i n e b r a k e / E V B 5 E V B m o d u l e 0

K 1 0 0

2 n d e d it io n

1 2 8

A D D I T IO N A L W IR I N G E V B , c o n t r o lle d s h e e t 1

D I A G R A M S

o f 1

K 1 0 0

2

d

d it i

1 2 9

A D D I T IO N A L W IR I N G E V B , c o n t r o lle d s h e e t 1

o f 1

K 1 0 0

2 n d e d it io n


W IR IN G

D IA G R A M

D I A G R A M S

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 1 7 3

C a b , T - C A N , s t a n d a r d s h e e t 1 o f 1

D a t e : 0 9 . 2 0 0 5 L e g e n d A F B E C Z D A E T

— — A 1 A 3 A 4 A 4 1 R 1 5 X X 1 9 X 4 6

– 0 0 0 2 0 2 0 3 5 5 5 9 4 8 6 9

F R B S B R d a p e r m

( v e h ic le (c e n tr a t a tio n , in a t in g

m a n a g e m e n t c o m p u t e r ) l o n - b o a r d c o m p u t e r ) s u p p l e m e n t a r y e q u i p m e n t r e s i s t o r

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 C o n t r o l u n i t , E B S V e h i c l e m a n a g e m e n t c o m p u t e r T e r m i n a t i n g r e s i s t o r , T - C A N P l u g c o n n . , e n g i n e / E D C / g e a r b o x I V P l u g c o n n . , e n g i n e / g e a r b o x A d a p t a t i o n , s u p p l e m e n t a r y e q u i p m e n t N o t e

I n v e h i c l e s w i t h T P M , t h e T - C A N t e r m i n a t i n g r e s i s t o r s i t s i n t h e f r a m e o n t h e T P M m o d u le !

K 1 0 0

2 n d e d it io n

1 3 0


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 1 7 3


D a t e : 0 9 . 2 0 0 5 L e g e n d A F B E C Z D A E T

— — A 1 A 3 A 4 A 4 1 R 1 5 X X 1 9 X 4 6

– 0 0 0 2 0 2 0 3 5 5 5 9 4 8 6 9

F R B S B R d a p e r m

( v e h ic le (c e n tr a t a tio n , in a t in g

m a n a g e m e n t c o m p u t e r ) l o n - b o a r d c o m p u t e r ) s u p p l e m e n t a r y e q u i p m e n t r e s i s t o r

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 C o n t r o l u n i t , E B S V e h i c l e m a n a g e m e n t c o m p u t e r T e r m i n a t i n g r e s i s t o r , T - C A N P l u g c o n n . , e n g i n e / E D C / g e a r b o x I V P l u g c o n n . , e n g i n e / g e a r b o x A d a p t a t i o n , s u p p l e m e n t a r y e q u i p m e n t N o t e


K 1 0 0

2 n d e d it io n

1 3 0


D I A G R A M S


K 1 0 0

2

d

d it i

1 3 1


D I A G R A M S


K 1 0 0

2 n d e d it io n


W IR IN G

D IA G R A M

W in d o w

lifte r, b u t to n

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 6 7 i n s h i f t c o n s o l e s h e e t 1 o f 1

D a t e : 0 4 . 2 0 0 7 L e g e n d A W in d o w B W in d o w

— — A 1 A 3 5 S S 5 1 7 X — —

– — — — 0 0 C e n tra 0 2 C e n tr a 2 6 B u t to n 2 7 B u tto n 3 3 P lu g c – — — — 1 S e e w

l i f t e r , s w i t c h c o n s o l e f o r d o o r , l e f t l i f t e r , s w i t c h c o n s o l e f o r d o o r , r i g h t

— — — — — — — — — — — l e l e c t r i cc a l s y s t e m l c o m p u t e r 2 , w i nn d o w l i f t e r , r i g h t , w i n n d o w l i ff t e r , l e f t o n n . , s w itc h , w in d o w lifte — — — — — — — — — — — i r i n n g d i a g r a m f o r d o o r m

— — — — — — — –

r s — — — — — — — – o d u l e

K 1 0 0

2 n d e d it io n

1 3 2


D IA G R A M

W in d o w

lifte r, b u t to n

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 6 7 i n s h i f t c o n s o l e s h e e t 1 o f 1

D a t e : 0 4 . 2 0 0 7 L e g e n d A W in d o w B W in d o w

— — A 1 A 3 5 S S 5 1 7 X — —

– — — — 0 0 C e n tra 0 2 C e n tr a 2 6 B u t to n 2 7 B u tto n 3 3 P lu g c – — — — 1 S e e w

l i f t e r , s w i t c h c o n s o l e f o r d o o r , l e f t l i f t e r , s w i t c h c o n s o l e f o r d o o r , r i g h t

— — — — — — — — — — — l e l e c t r i cc a l s y s t e m l c o m p u t e r 2 , w i nn d o w l i f t e r , r i g h t , w i n n d o w l i ff t e r , l e f t o n n . , s w itc h , w in d o w lifte — — — — — — — — — — — i r i n n g d i a g r a m f o r d o o r m

— — — — — — — –

r s — — — — — — — – o d u l e

K 1 0 0

2 n d e d it io n

1 3 2

A D D I T IO N A L W IR I N G W in d o w

lifte r, b u t to n

D I A G R A M S

i n s h i f t c o n s o l e s h e e t 1 o f 1

K 1 0 0

2

d

d it i

1 3 3

A D D I T IO N A L W IR I N G W in d o w

lifte r, b u t to n

i n s h i f t c o n s o l e s h e e t 1 o f 1

K 1 0 0

2 n d e d it io n


W IR IN G

D IA G R A M

D I A G R A M S

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 7 6

G e a r b o x / m a n u a l g e a r b o x s h e e t 1 o f 2

D a t e : 1 1 . 2 0 0 5 L e g e n d A S p l i t t e r , r a n g e - c h a n g e

— — A 1 A 3 A 4 A 4 1 H H 3 4 S 1 5 X X 1 5 X 1 6 X 1 9 X 1 9 3 Y Y 3

– 0 0 0 2 0 3 0 7 9 5 7 7 7 7 5 3 6 2 0 4 4 8 7 2 0 7 0 8

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i cc a l s y s t e m C e n t r a l c o m p u t e r 2 V e h i c l e m a n a g e m e n t c o m p u t e r I n s t r u m e n t a t i o n C h e c k l a m p , s p l i t t e r C h e c k la m p , r a n g e - c h a n g e S w i t c h , g e a r s e l e c t o r l e v e r P l u g c o n n . , e n g i n n e / E D C / g e a r b o x I I I P l u g c o n n ., g e a r b o x P l u g c o n n . , s w i t c h i n g e a r s h i f t k n o b P l u g c o n n . , e n g i n e / g e a r b o x P l u g c o n n . , p e d a l s , o u t s i d d e S o l e n o i d v a l v e , s p l i i t t e r a n d r a n g e - c h a n g e C l u t c h s e r v o

K 1 0 0

2 n d e d it io n

1 3 4


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 7 6



— — A 1 A 3 A 4 A 4 1 H H 3 4 S 1 5 X X 1 5 X 1 6 X 1 9 X 1 9 3 Y Y 3

– 0 0 0 2 0 3 0 7 9 5 7 7 7 7 5 3 6 2 0 4 4 8 7 2 0 7 0 8

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i cc a l s y s t e m C e n t r a l c o m p u t e r 2 V e h i c l e m a n a g e m e n t c o m p u t e r I n s t r u m e n t a t i o n C h e c k l a m p , s p l i t t e r C h e c k la m p , r a n g e - c h a n g e S w i t c h , g e a r s e l e c t o r l e v e r P l u g c o n n . , e n g i n n e / E D C / g e a r b o x I I I P l u g c o n n ., g e a r b o x P l u g c o n n . , s w i t c h i n g e a r s h i f t k n o b P l u g c o n n . , e n g i n e / g e a r b o x P l u g c o n n . , p e d a l s , o u t s i d d e S o l e n o i d v a l v e , s p l i i t t e r a n d r a n g e - c h a n g e C l u t c h s e r v o

K 1 0 0

2 n d e d it io n

1 3 4


D I A G R A M S


K 1 0 0

2

d

d it i

1 3 5


D I A G R A M S


K 1 0 0

2 n d e d it io n


W IR IN G

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 7 6


D a t e : 0 9 . 2 0 0 6 L e g e n d A C B G C G D T E R F C

— — A 1 A 3 A 4 3 B B 3 B 4 F 3 1 S S 1 1 5 X X 1 5 X 1 5 X 1 6 X 1 9 X 1 9 X 1 9

– 0 0 0 2 0 3 6 2 6 8 3 4 1 4 0 4 7 2 5 3 5 9 6 2 2 7 4 8 7 2 8 3

lu e e -C e lu

tc h a rb o a rb o A N v e rs tc h

t r a v e l s e n s o r x in p u t s p e e d x n e u t r a l n e t w o r k e g e a r s w i t c h  u i d l e v e l p r o b e

— — — — — — — — — — — — — — — C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 V e h i c l e m a n a g e m e n t c o m p u t e r C l u t c h t r a v e l s e n s o r In d u c tiv e p ic k u p , g e a r b o x in p u t s p C l u t c h  u i d l e v e l p r o b e F u s e , r e v e r s i n g l i g h t S w i t c h , r e v e r s e g e a r S w i t c h , n e u t r a l , g e a r b o x P l u g c o n n . , e n g i n e / E D C / g e a r b o x P l u g c o n n . , e n g i n e / E D C / g e a r b o x P l u g c o n n ., g e a r b o x P l u g c o n n . , R e v e r s in g l i g h t P l u g c o n n . , e n g i n e / g e a r b o x P l u g c o n n . , p e d a l s , o u t s i d e T h r e a d e d p in M 6 ( m o t o r p o w e r b o

— — — — — — –

e e d

I I I I V

x )

K 1 0 0

2 n d e d it io n

1 3 6


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 7 6


D a t e : 0 9 . 2 0 0 6 L e g e n d A C B G C G D T E R F C

— — A 1 A 3 A 4 3 B B 3 B 4 F 3 1 S S 1 1 5 X X 1 5 X 1 5 X 1 6 X 1 9 X 1 9 X 1 9

– 0 0 0 2 0 3 6 2 6 8 3 4 1 4 0 4 7 2 5 3 5 9 6 2 2 7 4 8 7 2 8 3

lu e e -C e lu

tc h a rb o a rb o A N v e rs tc h

t r a v e l s e n s o r x in p u t s p e e d x n e u t r a l n e t w o r k e g e a r s w i t c h  u i d l e v e l p r o b e

— — — — — — — — — — — — — — — C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 V e h i c l e m a n a g e m e n t c o m p u t e r C l u t c h t r a v e l s e n s o r In d u c tiv e p ic k u p , g e a r b o x in p u t s p C l u t c h  u i d l e v e l p r o b e F u s e , r e v e r s i n g l i g h t S w i t c h , r e v e r s e g e a r S w i t c h , n e u t r a l , g e a r b o x P l u g c o n n . , e n g i n e / E D C / g e a r b o x P l u g c o n n . , e n g i n e / E D C / g e a r b o x P l u g c o n n ., g e a r b o x P l u g c o n n . , R e v e r s in g l i g h t P l u g c o n n . , e n g i n e / g e a r b o x P l u g c o n n . , p e d a l s , o u t s i d e T h r e a d e d p in M 6 ( m o t o r p o w e r b o

— — — — — — –

e e d

I I I I V

x )

K 1 0 0

2 n d e d it io n

1 3 6


D I A G R A M S


K 1 0 0

2

d

d it i

1 3 7


D I A G R A M S


K 1 0 0

2 n d e d it io n


W IR IN G

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 7 4 8



— — A 1 A 3 A 4 A 4 1 H H 3 4 S 1 5 X X 1 5 X 1 6 X 1 9 X 1 9 3 Y Y 3

– 0 0 0 2 0 3 0 7 9 5 7 7 7 7 5 3 6 2 0 4 4 8 7 2 0 7 0 8

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 V e h i c l e m a n a g e m e n t c o m p u t e r I n s t r u m e n t a t i o n C h e c k l a m p , s p l i t t e r C h e c k la m p , r a n g e - c h a n g e S w i t c h , g e a r s e l e c t o r l e v e r P l u g c o n n . , e n g i n e / E D C / g e a r b o x I I I P l u g c o n n ., g e a r b o x P l u g c o n n . , s w i t c h i n g e a r s h i f t k n o b P l u g c o n n . , e n g i n e / g e a r b o x P l u g c o n n . , p e d a l s , o u t s i d e S o l e n o i d v a l v e , s p l i t t e r a n d r a n g e - c h a n g e C l u t c h s e r v o

K 1 0 0

2 n d e d it io n

1 3 8


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 7 4 8



— — A 1 A 3 A 4 A 4 1 H H 3 4 S 1 5 X X 1 5 X 1 6 X 1 9 X 1 9 3 Y Y 3

– 0 0 0 2 0 3 0 7 9 5 7 7 7 7 5 3 6 2 0 4 4 8 7 2 0 7 0 8

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 V e h i c l e m a n a g e m e n t c o m p u t e r I n s t r u m e n t a t i o n C h e c k l a m p , s p l i t t e r C h e c k la m p , r a n g e - c h a n g e S w i t c h , g e a r s e l e c t o r l e v e r P l u g c o n n . , e n g i n e / E D C / g e a r b o x I I I P l u g c o n n ., g e a r b o x P l u g c o n n . , s w i t c h i n g e a r s h i f t k n o b P l u g c o n n . , e n g i n e / g e a r b o x P l u g c o n n . , p e d a l s , o u t s i d e S o l e n o i d v a l v e , s p l i t t e r a n d r a n g e - c h a n g e C l u t c h s e r v o

K 1 0 0

2 n d e d it io n

1 3 8


D I A G R A M S


K 1 0 0

2

d

d it i

1 3 9


D I A G R A M S


K 1 0 0

2 n d e d it io n


W IR IN G

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 7 4 8


D a t e : 1 1 . 2 0 0 8 L e g e n d A C B G C G D T E C F C G S

— — A 1 A 3 A 4 3 B B 3 B 4 F 3 2 K 1 S S 1 1 5 X X 1 5 X 1 5 X 1 6 X 1 6 X 1 9 X 1 9 X 1 9

– 0 0 0 2 0 3 6 2 6 8 3 4 1 4 5 0 0 4 7 2 5 3 5 9 6 2 2 7 4 4 4 8 7 2 8 3

lu t c h e a rb o e a rb o -C A N lu t c h o n tro w itc h

p o s itio n s e x in p u t s p e x n e u t r a l n e t w o r k  u id le v e l p l, r e v e rs in g , re v e rs e g e

n s o r e d

r o b e l i g h t a r

— — — — — — — — — — — — — — — C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 V e h i c l e m a n a g e m e n t c o m p u t e r C l u t c h p o s i t i o n s e n s o r In d u c tiv e p ic k u p , g e a r b o x in p u t s p C l u t c h  u i d l e v e l p r o b e F u s e , r e v e r s i n g l i g h t R e l a y , r e v e r s i n g l i g h t S w i t c h , r e v e r s e g e a r S w i t c h , n e u t r a l , g e a r b o x P l u g c o n n . , e n g i n e / E D C / g e a r b o x P l u g c o n n . , e n g i n e / E D C / g e a r b o x P l u g c o n n ., g e a r b o x P l u g c o n n . , r e v e r s i n g l i g h t E a r t h i n g p o i n t , c a b , n e x t t o c e n t r a P l u g c o n n . , e n g i n e / g e a r b o x P l u g c o n n . , p e d a l s , o u t s i d e T h r e a d e d p in M 6 ( m o t o r p o w e r b o

— — — — — — –

e e d

I I I I V l e l e c t r i c a l s y s t e m x )

K 1 0 0

2 n d e d it io n

1 4 0


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 7 4 8


D a t e : 1 1 . 2 0 0 8 L e g e n d A C B G C G D T E C F C G S

— — A 1 A 3 A 4 3 B B 3 B 4 F 3 2 K 1 S S 1 1 5 X X 1 5 X 1 5 X 1 6 X 1 6 X 1 9 X 1 9 X 1 9

– 0 0 0 2 0 3 6 2 6 8 3 4 1 4 5 0 0 4 7 2 5 3 5 9 6 2 2 7 4 4 4 8 7 2 8 3

lu t c h e a rb o e a rb o -C A N lu t c h o n tro w itc h

p o s itio n s e x in p u t s p e x n e u t r a l n e t w o r k  u id le v e l p l, r e v e rs in g , re v e rs e g e

n s o r e d

r o b e l i g h t a r

— — — — — — — — — — — — — — — C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 V e h i c l e m a n a g e m e n t c o m p u t e r C l u t c h p o s i t i o n s e n s o r In d u c tiv e p ic k u p , g e a r b o x in p u t s p C l u t c h  u i d l e v e l p r o b e F u s e , r e v e r s i n g l i g h t R e l a y , r e v e r s i n g l i g h t S w i t c h , r e v e r s e g e a r S w i t c h , n e u t r a l , g e a r b o x P l u g c o n n . , e n g i n e / E D C / g e a r b o x P l u g c o n n . , e n g i n e / E D C / g e a r b o x P l u g c o n n ., g e a r b o x P l u g c o n n . , r e v e r s i n g l i g h t E a r t h i n g p o i n t , c a b , n e x t t o c e n t r a P l u g c o n n . , e n g i n e / g e a r b o x P l u g c o n n . , p e d a l s , o u t s i d e T h r e a d e d p in M 6 ( m o t o r p o w e r b o

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N O . 8 1 .9 9 1 9 2 .1 3 7 4

S e a t b e l t i n d i c a t o r , d r i v e r s h e e t 1 o f 1

D a t e : 1 0 . 2 0 0 6 L e g e n d A S e a t b e l t i n d i c a t o r

— — A 1 A 3 A 4 1 H 2 S 6 X X 2 5

– 0 0 0 2 0 7 7 7 5 2 0 0 4 1

— — — — — — — — — — — — — — C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 I n s t r u m e n t a t i o n C h e c k l a m p , s e a t b e l t S w it c h in s e a t b e lt b u c k l e , d r iv e P lu g c o n n . , s e a t b e l t i n d ic a t o r , d P o t e n tia l d i s t r ib u to r , 2 1 - p i n , lin e

— — — — — — — –

r r i v e r / c e n t r e s e a t 3 1 0 0 0

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D a t e : 1 0 . 2 0 0 6 L e g e n d A S e a t b e l t i n d i c a t o r

— — A 1 A 3 A 4 1 H 2 S 6 X X 2 5

– 0 0 0 2 0 7 7 7 5 2 0 0 4 1

— — — — — — — — — — — — — — C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 I n s t r u m e n t a t i o n C h e c k l a m p , s e a t b e l t S w it c h in s e a t b e lt b u c k l e , d r iv e P lu g c o n n . , s e a t b e l t i n d ic a t o r , d P o t e n tia l d i s t r ib u to r , 2 1 - p i n , lin e

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T r a ile r c h a r g e , 2 4 V

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N O . 8 1 .9 9 1 9 2 .3 2 9 2 s h e e t 1 o f 1

D a t e : 1 1 . 2 0 0 5 L e g e n d A T r a i l e r c h a r g e

— — A 1 A 3 A 3 F 2 G 1 G 1 3 K 1 X X 8 X 8 X 8 X 8 X 4 6

– 0 0 0 2 7 2 2 9 0 0 0 1 1 9 0 0 0 5 0 6 0 7 0 8 4 3

— — — — — — — — — — — — — — — — C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 D i s t r i b u t o r b o x , t r a i l e r c h a r g e , 2 4 V F u s e , t r a i l e r c h a r g e , 2 4 V B a t t e r y 1 B a t t e r y 2 R e l a y , t r a i l e r c h a r g e , 2 4 V G r o u n d c o n n e c t i o n , e n g i n e P lu g c o n n e c tio n fo r tr a ile r c h a r g e 2 4 P lu g c o n n e c tio n fo r tr a ile r c h a r g e 2 4 P lu g c o n n e c tio n fo r tr a ile r c h a r g e 2 4 S o c k e t , t r a i l e r c h a r g e , 2 4 V P o t e n t i a l d i s t r i b u t o r , l i n e 5 9 1 0 4

— — — — — –

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N o t e

I n s t a l l a t i o n p o s i t i o n f o r X 8 0 8 f o r s e m i t r a i l e r E 8 !

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T r a ile r c h a r g e , 2 4 V

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 9 2 s h e e t 1 o f 1

D a t e : 1 1 . 2 0 0 5 L e g e n d A T r a i l e r c h a r g e

— — A 1 A 3 A 3 F 2 G 1 G 1 3 K 1 X X 8 X 8 X 8 X 8 X 4 6

– 0 0 0 2 7 2 2 9 0 0 0 1 1 9 0 0 0 5 0 6 0 7 0 8 4 3

— — — — — — — — — — — — — — — — C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 D i s t r i b u t o r b o x , t r a i l e r c h a r g e , 2 4 V F u s e , t r a i l e r c h a r g e , 2 4 V B a t t e r y 1 B a t t e r y 2 R e l a y , t r a i l e r c h a r g e , 2 4 V G r o u n d c o n n e c t i o n , e n g i n e P lu g c o n n e c tio n fo r tr a ile r c h a r g e 2 4 P lu g c o n n e c tio n fo r tr a ile r c h a r g e 2 4 P lu g c o n n e c tio n fo r tr a ile r c h a r g e 2 4 S o c k e t , t r a i l e r c h a r g e , 2 4 V P o t e n t i a l d i s t r i b u t o r , l i n e 5 9 1 0 4

— — — — — –

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s h e e t 1 o f 1

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c a b ( s t a n d a r d ) s h e e t 1 o f 1

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— — A 1 0 A 3 0 A 4 0 A 4 0 F 3 9 1 5 3 X X 1 6 4

–

0

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m 2 C e n t r a l c o m p u t e r 2 7 I n s t r u m e n t a t i o n 8 T a c h o g r a p h 8 F u s e , i n s t r u m e n t a t i o n , t a c h o g r a p h ( t e r m i n a l 1 5 ) 5 P l u g c o n n . , t a c h o g r a p h 4 E a r t h i n g p o i n t , c a b , n e x t t o c e n t r a l e l e c t r i c a l s y s t e m

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In t e r io r lig h tin g , r o o f , w h i t e /r e d

s h e e t 1 o f 1

D a t e : 0 4 . 2 0 0 6 L e g e n d A I n t e r i o r l i g h t i n g , r o o f , w h i t e / r e d

— — A 1 A 3 2 E E 2 4 S S 5 1 5 X X 1 5 X 2 5 X 2 5 X 4 7

– 0 0 0 2 7 5 7 6 0 5 4 0 8 0 8 1 4 1 4 3 3 2

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 I n t e r i o r l i g h t , r o o f , w h i t e / r e d I n t e r i o r l i g h t , r o o f , w h i t e / r e d S w i t c h , i n t e r i o r l i g h t i n g , r e d S w i t c h , i n t e r i o r l i g h t i n g , w h i t e P l u g c o n n . , i n t e r io r l i g h t i n g P l u g c o n n . , s w i t c h , i n t e r i o r l i g h t i n g P o t e n t i a l d i s t r i b u t o r , 2 1 - p i n , l i n e 3 1 0 0 0 P o t e n t i a l d i s t r i b u t o r , 2 1 - p i n , l i n e 3 0 0 0 6 P o t e n t i a l d i s t r i b u t o r , l i n e 1 6 0 0 0 , s w i t c h l i g h t i n g

K 1 0 0

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D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 9 3

In t e r io r lig h tin g , r o o f , w h i t e /r e d

s h e e t 1 o f 1

D a t e : 0 4 . 2 0 0 6 L e g e n d A I n t e r i o r l i g h t i n g , r o o f , w h i t e / r e d

— — A 1 A 3 2 E E 2 4 S S 5 1 5 X X 1 5 X 2 5 X 2 5 X 4 7

– 0 0 0 2 7 5 7 6 0 5 4 0 8 0 8 1 4 1 4 3 3 2

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 I n t e r i o r l i g h t , r o o f , w h i t e / r e d I n t e r i o r l i g h t , r o o f , w h i t e / r e d S w i t c h , i n t e r i o r l i g h t i n g , r e d S w i t c h , i n t e r i o r l i g h t i n g , w h i t e P l u g c o n n . , i n t e r io r l i g h t i n g P l u g c o n n . , s w i t c h , i n t e r i o r l i g h t i n g P o t e n t i a l d i s t r i b u t o r , 2 1 - p i n , l i n e 3 1 0 0 0 P o t e n t i a l d i s t r i b u t o r , 2 1 - p i n , l i n e 3 0 0 0 6 P o t e n t i a l d i s t r i b u t o r , l i n e 1 6 0 0 0 , s w i t c h l i g h t i n g

K 1 0 0

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A D D I T IO N A L W IR I N G In t e r io r lig h tin g , r o o f , w h i t e /r e d

D I A G R A M S

s h e e t 1 o f 1

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s h e e t 1 o f 1

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D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 4 6 1

I n t e r i o r l i g h t s w i t h a m b i e n t l i g h t s h e e t 1 o f 1

D a t e : 0 3 . 2 0 0 6 L e g e n d A I n t e r i o r l i g h t s w i t h a m b i e n t l i g h t

— — A 1 A 3 E 4 E 4 3 X X 2 5 X 4 7

–

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 9 6 I n t e r i o r l i g h t / a m b i e n t l i g h t , l e f t 9 7 I n t e r i o r l i g h t / a m b i e n t l i g h t , r i g h t 9 5 P l u g c o n n . , o u t l i n e l i g h t a n d i n t e r i o r l i g h t , l e f t a n d r i g h t 4 2 P o t e n t i a l d i s t r i b u t o r , 2 1 - p i n , l i n e 5 8 0 0 0 2 0 P l u g c o n n . , i n t e r i o r l i g h t / a m b i e n t l i g h t 0 0 0 2

K 1 0 0

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D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 4 6 1


D a t e : 0 3 . 2 0 0 6 L e g e n d A I n t e r i o r l i g h t s w i t h a m b i e n t l i g h t

— — A 1 A 3 E 4 E 4 3 X X 2 5 X 4 7

–

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 9 6 I n t e r i o r l i g h t / a m b i e n t l i g h t , l e f t 9 7 I n t e r i o r l i g h t / a m b i e n t l i g h t , r i g h t 9 5 P l u g c o n n . , o u t l i n e l i g h t a n d i n t e r i o r l i g h t , l e f t a n d r i g h t 4 2 P o t e n t i a l d i s t r i b u t o r , 2 1 - p i n , l i n e 5 8 0 0 0 2 0 P l u g c o n n . , i n t e r i o r l i g h t / a m b i e n t l i g h t 0 0 0 2

K 1 0 0

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D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 9 5

I n t a r d e r s h e e t 1 o f 1

D a t e : 0 4 . 2 0 0 8 L e g e n d A S B S C T D S E D F V

— — A 1 A 1 A 3 A 4 A 4 A 4 A 9 B 1 F 1 F 3 1 H 1 5 X X 1 5 X 1 6 X 1 9 X 1 9 X 2 5 X 4 3 1 Y Y 1 — —

– 0 0 4 4 0 2 0 3 0 7 3 7 4 2 3 4 5 2 7 4 4 5 5 3 5 9 4 4 5 1 6 9 4 4 9 7 3 3 3 4 – 1 2

u s t a i n e d - a c t i o n b r a k e l e v e r w i t h o u t m u l t i f u n c t i o n a l s t e e r i n g w h e e l u s t a i n e d - a c t i o n b r a k e l e v e r i f m u l t i f u n c t i o n a l s t e e r i n g w h e e l i s  t t e d e m p e r a tu r e s e n s o r o l e n o i d v a lv e i a g n o s i s o l t a g e s u p p l y

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C o n t r o l u n i t , r e t a r d e r C e n t r a l c o m p u t e r 2 V e h i c l e m a n a g e m e n t c o m p u t e r I n s t r u m e n t a t i o n S u s t a i n e d - a c t i o n b r a k e l e v e r S t e e r i n g c o l u m n s t a l k , r e t a r d e r / g e a r b o x T e m p e r a t u r e s e n s o r , r e t a r d e r ( c o o l i n g w a t e r ) F u s e , r e t a r d e r ( t e r m i n a l 1 5 ) F u s e , r e t a r d e r ( t e r m i n a l 3 0 ) C h e c k l a m p , r e t a r d e r P l u g c o n n . , e n g i n e / E D C / g e a r b o x I I I P l u g c o n n . , e n g i n e / E D C / g e a r b o x I V E a r t h i n g p o i n t , c a b , n e x t t o c e n t r a l e l e c t r i c a l s y s t e m P l u g c o n n . , e n g i n e / g e a r b o x ( m o t o r p o w e r b o x ) P l u g c o n n . , e n g i n e b r a k e s w i t c h P o t e n t i a l d i s t r i b u t o r , 2 1 - p i n , K - l i n e P l u g c o n n . , m u l t i f u n c t i o n a l s t e e r i n g w h e e l P r o p o r t i o n a l v a l v e , r e t a r d e r S o l e n o i d v a l v e , a c c u m u l a t o r — — — — — — — — — — — — — — — — — — — — — – V e h i c le m a n a g e m e n t c o m p u t e r G r o u n d

K 1 0 0

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D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 9 5


D a t e : 0 4 . 2 0 0 8 L e g e n d A S B S C T D S E D F V

— — A 1 A 1 A 3 A 4 A 4 A 4 A 9 B 1 F 1 F 3 1 H 1 5 X X 1 5 X 1 6 X 1 9 X 1 9 X 2 5 X 4 3 1 Y Y 1 — —

– 0 0 4 4 0 2 0 3 0 7 3 7 4 2 3 4 5 2 7 4 4 5 5 3 5 9 4 4 5 1 6 9 4 4 9 7 3 3 3 4 – 1 2

u s t a i n e d - a c t i o n b r a k e l e v e r w i t h o u t m u l t i f u n c t i o n a l s t e e r i n g w h e e l u s t a i n e d - a c t i o n b r a k e l e v e r i f m u l t i f u n c t i o n a l s t e e r i n g w h e e l i s  t t e d e m p e r a tu r e s e n s o r o l e n o i d v a lv e i a g n o s i s o l t a g e s u p p l y

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C o n t r o l u n i t , r e t a r d e r C e n t r a l c o m p u t e r 2 V e h i c l e m a n a g e m e n t c o m p u t e r I n s t r u m e n t a t i o n S u s t a i n e d - a c t i o n b r a k e l e v e r S t e e r i n g c o l u m n s t a l k , r e t a r d e r / g e a r b o x T e m p e r a t u r e s e n s o r , r e t a r d e r ( c o o l i n g w a t e r ) F u s e , r e t a r d e r ( t e r m i n a l 1 5 ) F u s e , r e t a r d e r ( t e r m i n a l 3 0 ) C h e c k l a m p , r e t a r d e r P l u g c o n n . , e n g i n e / E D C / g e a r b o x I I I P l u g c o n n . , e n g i n e / E D C / g e a r b o x I V E a r t h i n g p o i n t , c a b , n e x t t o c e n t r a l e l e c t r i c a l s y s t e m P l u g c o n n . , e n g i n e / g e a r b o x ( m o t o r p o w e r b o x ) P l u g c o n n . , e n g i n e b r a k e s w i t c h P o t e n t i a l d i s t r i b u t o r , 2 1 - p i n , K - l i n e P l u g c o n n . , m u l t i f u n c t i o n a l s t e e r i n g w h e e l P r o p o r t i o n a l v a l v e , r e t a r d e r S o l e n o i d v a l v e , a c c u m u l a t o r — — — — — — — — — — — — — — — — — — — — — – V e h i c le m a n a g e m e n t c o m p u t e r G r o u n d

K 1 0 0

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N O . 8 1 .9 9 1 9 2 .3 0 4 3

T a c h o g r a p h c h e c k la m p s h e e t 1 o f 1

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— — — C e n tra C e n tr a In s tr u m D ig ita l C h e c k

— l e l c e ta la

— — — — — — — — — — — — — — — — — – l e c t r i c a l s y s t e m o m p u t e r 2 n t a t i o n c h o g r a p h m p , d i g i t a l t a c h o g r a p h

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N O . 8 1 .9 9 1 9 2 .3 0 4 3


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— — A 1 A 3 A 4 A 9 3 H

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— — — C e n tra C e n tr a In s tr u m D ig ita l C h e c k

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— — — — — — — — — — — — — — — — — – l e c t r i c a l s y s t e m o m p u t e r 2 n t a t i o n c h o g r a p h m p , d i g i t a l t a c h o g r a p h

K 1 0 0

2 n d e d it io n

1 5 6


D I A G R A M S


K 1 0 0

2

d

d it i

1 5 7


D I A G R A M S


K 1 0 0

2 n d e d it io n


W IR IN G

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 3 0 4

F u e l  lte r h e a te r s h e e t 1

o f 1

D a t e : 1 1 . 2 0 0 5 L e g e n d A F u e l  l t e r h e a t e r

— — A 1 A 3 A 4 A 7 F 1 F 3 3 H 1 5 X X 1 5 X 1 9 X 3 3

– 0 0 0 2 0 7 1 5 5 6 5 5 4 5 5 1 5 9 8 3 9 1

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 I n s t r u m e n t a t i o n F u e l  l t e r h e a t e r - P T C F u s e , f u e l  l t e r h e a t e r M a in f u s e 3 0 - 2 C h e c k l a m p , f u e l  l t e r h e a t e r P l u g c o n n . , e n g i n e / E D C / g e a r b o x I I P l u g c o n n . , e n g i n e / E D C / g e a r b o x I V T h r e a d e d p in M 6 ( m o t o r p o w e r b o x ) J u m p e r , l i n e 3 0 0 7 6 ( m o t o r p o w e r b o x )

K 1 0 0

2 n d e d it io n

1 5 8


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 3 0 4

F u e l  lte r h e a te r s h e e t 1

o f 1

D a t e : 1 1 . 2 0 0 5 L e g e n d A F u e l  l t e r h e a t e r

— — A 1 A 3 A 4 A 7 F 1 F 3 3 H 1 5 X X 1 5 X 1 9 X 3 3

– 0 0 0 2 0 7 1 5 5 6 5 5 4 5 5 1 5 9 8 3 9 1

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 I n s t r u m e n t a t i o n F u e l  l t e r h e a t e r - P T C F u s e , f u e l  l t e r h e a t e r M a in f u s e 3 0 - 2 C h e c k l a m p , f u e l  l t e r h e a t e r P l u g c o n n . , e n g i n e / E D C / g e a r b o x I I P l u g c o n n . , e n g i n e / E D C / g e a r b o x I V T h r e a d e d p in M 6 ( m o t o r p o w e r b o x ) J u m p e r , l i n e 3 0 0 7 6 ( m o t o r p o w e r b o x )

K 1 0 0

2 n d e d it io n

1 5 8

A D D I T IO N A L W IR I N G F u e l  lte r h e a te r s h e e t 1

D I A G R A M S

o f 1

K 1 0 0

2

d

d it i

1 5 9

A D D I T IO N A L W IR I N G F u e l  lte r h e a te r s h e e t 1

o f 1

K 1 0 0

2 n d e d it io n


W IR IN G

D IA G R A M

D I A G R A M S

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 3 0 5

F u e l  l t e r h e a t e r , S e p a r s h e e t 1 o f 1

D a t e : 1 1 . 2 0 0 5 L e g e n d A F u e l  l t e r h e a t e r , S e p a r B S e p a r f u e l  l t e r h e a t e r in c a s e o f e le c tr ic a l a n d m a s t e r s w i t c h

— — A 1 0 A 3 0 F 5 4 G 1 0 G 1 0 K 1 7 Q 1 0 1 1 R 1 4 S 2 2 0 X X 4 6 4 — —

– 0 2 9 0 1 7 5 0 9 1 3 – 1

m e c h a n i c a l b a t t e r y

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 F u s e , l in e 3 0 0 0 0 B a t t e r y 1 B a t t e r y 2 R e l a y , f u e l  l t e r h e a t e r I s o l a t o r s w i t c h , b a t t e r y + F u e l  l t e r h e a t e r 1 I s o l a t o r s w i t c h , b a t t e r y + P l u g c o n n . , f u e l  l t e r h e a t e r , S e p a r P o t e n t i a l d i s t r i b u t o r , l i n e 5 9 1 0 4 — — — — — — — — — — — — — — — — — — — — — – I n c a s e o f m e c h a n i c a l b a t t e r y m a s t e r s w i t c h

K 1 0 0

2 n d e d it io n

1 6 0


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 3 0 5


D a t e : 1 1 . 2 0 0 5 L e g e n d A F u e l  l t e r h e a t e r , S e p a r B S e p a r f u e l  l t e r h e a t e r in c a s e o f e le c tr ic a l a n d m a s t e r s w i t c h

— — A 1 0 A 3 0 F 5 4 G 1 0 G 1 0 K 1 7 Q 1 0 1 1 R 1 4 S 2 2 0 X X 4 6 4 — —

– 0 2 9 0 1 7 5 0 9 1 3 – 1

m e c h a n i c a l b a t t e r y

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 F u s e , l in e 3 0 0 0 0 B a t t e r y 1 B a t t e r y 2 R e l a y , f u e l  l t e r h e a t e r I s o l a t o r s w i t c h , b a t t e r y + F u e l  l t e r h e a t e r 1 I s o l a t o r s w i t c h , b a t t e r y + P l u g c o n n . , f u e l  l t e r h e a t e r , S e p a r P o t e n t i a l d i s t r i b u t o r , l i n e 5 9 1 0 4 — — — — — — — — — — — — — — — — — — — — — – I n c a s e o f m e c h a n i c a l b a t t e r y m a s t e r s w i t c h

K 1 0 0

2 n d e d it io n

1 6 0


D I A G R A M S


K 1 0 0

2

d

d it i

1 6 1


D I A G R A M S


K 1 0 0

2 n d e d it io n


W IR IN G

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 3 0 0

C u s t o m e r - s p e c i c c o n t r o l m o d u l e ( K S M ) s h e e t 1 o f 2

D a t e : 0 2 . 2 0 0 8 L e g e n d A Z B Z C D D V

— — A 1 A 3 A 3 F 4 F 4 1 6 X X 1 9 X 1 9 X 2 5

– 0 0 0 2 1 2 2 8 2 9 4 4 9 6 9 7 4 4

D R D R ia g o lta

in t e r f a c e ( F F R ) in t e r f a c e ( K S M ) n o s is g e s u p p l y

— — — — — — — — — — — — C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 C u s to m e r- s p e c i c c o n tr o l m F u s e , K S M ( t e r m in a l 1 5 ) F u s e , K S M ( t e r m in a l 3 0 ) E a r t h i n g p o i n t , c a b , n e x t t o P l u g c o n n . , Z D R i n t e r f a c e P l u g c o n n . , Z D R i n t e r f a c e P o t e n t i a l d i s t r ib u t o r , 2 1 - p i n

— — — — — — — — — – o d u l e c e n t r a l e l e c t r i c a l s y s t e m ( v e h i c l e m a n a g e m e n t c o m p u t e r ) ( K S M ) , K - l i n e

K 1 0 0

2 n d e d it io n

1 6 2


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 3 0 0


D a t e : 0 2 . 2 0 0 8 L e g e n d A Z B Z C D D V

— — A 1 A 3 A 3 F 4 F 4 1 6 X X 1 9 X 1 9 X 2 5

– 0 0 0 2 1 2 2 8 2 9 4 4 9 6 9 7 4 4

D R D R ia g o lta

in t e r f a c e ( F F R ) in t e r f a c e ( K S M ) n o s is g e s u p p l y

— — — — — — — — — — — — C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 C u s to m e r- s p e c i c c o n tr o l m F u s e , K S M ( t e r m in a l 1 5 ) F u s e , K S M ( t e r m in a l 3 0 ) E a r t h i n g p o i n t , c a b , n e x t t o P l u g c o n n . , Z D R i n t e r f a c e P l u g c o n n . , Z D R i n t e r f a c e P o t e n t i a l d i s t r ib u t o r , 2 1 - p i n

— — — — — — — — — – o d u l e c e n t r a l e l e c t r i c a l s y s t e m ( v e h i c l e m a n a g e m e n t c o m p u t e r ) ( K S M ) , K - l i n e

K 1 0 0

2 n d e d it io n

1 6 2


D I A G R A M S


K 1 0 0

2

d

d it i

1 6 3


D I A G R A M S


K 1 0 0

2 n d e d it io n


W IR IN G

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 3 0 0


D a t e : 0 2 . 2 0 0 8 L e g e n d A Z D R in t e r f a c e ( K S M ) B S c o p e , p r e p a r a tio n , b o d y m a n u fa c t u r e r, tr a v e l/r o a d

— — A 1 0 A 3 0 A 3 1 A 4 0 B 1 1 1 4 2 X X 1 5 3 X 1 5 3 X 1 6 2 X 1 6 4 X 3 3 1 X 4 3 6 X 4 6 4 X 4 6 5 X 4 6 6 X 4 6 6 — —

– 0 2 2 8 0 8 6 7 7 4 1 6 3 9 0 3 – 1 2

— — — — — — — — — — — — — — — — — — — C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 C u s t o m e r - s p e c i  e d c o n t r o l m o d u l e T a c h o g r a p h P u l s e g e n e r a t o r , t a c h o g r a p h P l u g c o n n . , t r a v e l p u l s e , b o d y m a n u f a c t u r e P l u g c o n n . , t a c h o g r a p h P l u g c o n n . , s p e e d o m e t e r s e n s o r P l u g c o n n . , r e v e r s i n g l i g h t E a r t h i n g p o i n t , c a b , n e x t t o c e n t r a l e l e c t r i c P l u g c o n n . , Z D R in t e r f a c e 2 ( K S M ) P l u g c o n n . , P u l s e g e n e r a t o r , t a c h o g r a p h P o t e n t i a l d i s t r i b u t o r , l i n e 5 9 1 0 4 P l u g c o n n . , V - s ig n a l , l i n e 1 6 5 0 0 P l u g c o n n . , 4 p u l s e s / m e t e r , l i n e 1 6 5 0 7 P l u g c o n n . , a d a p t a t i o n , V - s i g n a l , l i n e 1 6 5 1 — — — — — — — — — — — — — — — — — — — P o w e r ta k e - o f f, e n g i n e - d e p e n d e n t , in s t a lle d G e a r b o x , a u t o m a t i c

s p e e d s i g n a l

— — –

r

a l s y s t e m

4 — — – o n f r o n t o f g e a r b o x ( N M V )

K 1 0 0

2 n d e d it io n

1 6 4


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 3 0 0


D a t e : 0 2 . 2 0 0 8 L e g e n d A Z D R in t e r f a c e ( K S M ) B S c o p e , p r e p a r a tio n , b o d y m a n u fa c t u r e r, tr a v e l/r o a d

— — A 1 0 A 3 0 A 3 1 A 4 0 B 1 1 1 4 2 X X 1 5 3 X 1 5 3 X 1 6 2 X 1 6 4 X 3 3 1 X 4 3 6 X 4 6 4 X 4 6 5 X 4 6 6 X 4 6 6 — —

– 0 2 2 8 0 8 6 7 7 4 1 6 3 9 0 3 – 1 2

— — — — — — — — — — — — — — — — — — — C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 C u s t o m e r - s p e c i  e d c o n t r o l m o d u l e T a c h o g r a p h P u l s e g e n e r a t o r , t a c h o g r a p h P l u g c o n n . , t r a v e l p u l s e , b o d y m a n u f a c t u r e P l u g c o n n . , t a c h o g r a p h P l u g c o n n . , s p e e d o m e t e r s e n s o r P l u g c o n n . , r e v e r s i n g l i g h t E a r t h i n g p o i n t , c a b , n e x t t o c e n t r a l e l e c t r i c P l u g c o n n . , Z D R in t e r f a c e 2 ( K S M ) P l u g c o n n . , P u l s e g e n e r a t o r , t a c h o g r a p h P o t e n t i a l d i s t r i b u t o r , l i n e 5 9 1 0 4 P l u g c o n n . , V - s ig n a l , l i n e 1 6 5 0 0 P l u g c o n n . , 4 p u l s e s / m e t e r , l i n e 1 6 5 0 7 P l u g c o n n . , a d a p t a t i o n , V - s i g n a l , l i n e 1 6 5 1 — — — — — — — — — — — — — — — — — — — P o w e r ta k e - o f f, e n g i n e - d e p e n d e n t , in s t a lle d G e a r b o x , a u t o m a t i c

s p e e d s i g n a l

— — –

r

a l s y s t e m

4 — — – o n f r o n t o f g e a r b o x ( N M V )

K 1 0 0

2 n d e d it io n

1 6 4


D I A G R A M S


K 1 0 0

2

d

d it i

1 6 5


D I A G R A M S


K 1 0 0

2 n d e d it io n


W IR IN G

D IA G R A M


D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 3 1 4

r e g u l a t o r s h e e t 1 o f 1

D a t e : 0 5 . 2 0 0 6 L e g e n d A H e a d lig h t b e a m

— — A 1 0 A 1 8 A 1 8 A 3 0 M 1 1 M 1 1 R 1 0 1 5 4 X X 1 5 5 X 1 6 4 X 1 6 4 X 1 8 2 — —

– 0 7 8 2 7 8 9 5 0 2 4 7 – 1 2 3

r e g u l a t o r

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m H e a d l i g h t , l e f t H e a d l i g h t , r i g h t C e n t r a l c o m p u t e r 2 S e r v o m o t o r , h e a d l i g h t b e a m r e g u l a t o r , l e f t S e r v o m o t o r , h e a d l i g h t b e a m r e g u l a t o r , r i g h t P o t e n t i o m e t e r , h e a d l i g h t b e a m r e g u l a t o r P l u g c o n n . , f r o n t e n d , l e f t P l u g c o n n . , f r o n t e n d , r i g h t E a r t h i n g p o i n t , c a b b e h i n d i n s t r u m e n t p a n e l E a r t h i n g p o i n t , c a b , n e x t t o c e n t r a l e l e c t r i c a l s y s t e m C r i m p e d c o n n e c t o r , l i n e 3 1 0 0 0 — — — — — — — — — — — — — — — — — — — — — – P a r k i n g l i g h t , l e f t P a r k i n g l i g h t , r i g h t f o r h e a d l i g h t s

K 1 0 0

2 n d e d it io n

1 6 6


D IA G R A M


D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 3 1 4


D a t e : 0 5 . 2 0 0 6 L e g e n d A H e a d lig h t b e a m

— — A 1 0 A 1 8 A 1 8 A 3 0 M 1 1 M 1 1 R 1 0 1 5 4 X X 1 5 5 X 1 6 4 X 1 6 4 X 1 8 2 — —

– 0 7 8 2 7 8 9 5 0 2 4 7 – 1 2 3

r e g u l a t o r

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m H e a d l i g h t , l e f t H e a d l i g h t , r i g h t C e n t r a l c o m p u t e r 2 S e r v o m o t o r , h e a d l i g h t b e a m r e g u l a t o r , l e f t S e r v o m o t o r , h e a d l i g h t b e a m r e g u l a t o r , r i g h t P o t e n t i o m e t e r , h e a d l i g h t b e a m r e g u l a t o r P l u g c o n n . , f r o n t e n d , l e f t P l u g c o n n . , f r o n t e n d , r i g h t E a r t h i n g p o i n t , c a b b e h i n d i n s t r u m e n t p a n e l E a r t h i n g p o i n t , c a b , n e x t t o c e n t r a l e l e c t r i c a l s y s t e m C r i m p e d c o n n e c t o r , l i n e 3 1 0 0 0 — — — — — — — — — — — — — — — — — — — — — – P a r k i n g l i g h t , l e f t P a r k i n g l i g h t , r i g h t f o r h e a d l i g h t s

K 1 0 0

2 n d e d it io n

1 6 6

A D D I T IO N A L W IR I N G H e a d lig h t b e a m

D I A G R A M S


K 1 0 0

2

d

d it i

1 6 7

A D D I T IO N A L W IR I N G H e a d lig h t b e a m


K 1 0 0

2 n d e d it io n


W IR IN G

D I A G R A M S

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 1 2 0

F a n c lu t c h w i t h s p e e d f e e d b a c k s h e e t 1 o f 1


A A A 1 X X 1 X 1

3 0 2 4 0 3 9 6 8 5 5 1 5 6 2 9 0 4

C V F P P T

e n tr a l c o m p u te r e h ic le m a n a g e m a n c lu tc h w ith s p l u g c o n n . , e n g i n lu g c o n n ., g e a r b h r e a d e d p in M 6

2 e n t c o m p u e e d s e n s o e /E D C /g e a o x ( m o to r p o w

t e r r r b o x I I e r b o x )

K 1 0 0

2 n d e d it io n

1 6 8


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 1 2 0



A A A 1 X X 1 X 1

3 0 2 4 0 3 9 6 8 5 5 1 5 6 2 9 0 4

C V F P P T

e n tr a l c o m p u te r e h ic le m a n a g e m a n c lu tc h w ith s p l u g c o n n . , e n g i n lu g c o n n ., g e a r b h r e a d e d p in M 6

2 e n t c o m p u e e d s e n s o e /E D C /g e a o x ( m o to r p o w

t e r r r b o x I I e r b o x )

K 1 0 0

2 n d e d it io n

1 6 8


D I A G R A M S


K 1 0 0

2

d

d it i

1 6 9


D I A G R A M S


K 1 0 0

2 n d e d it io n


W IR IN G

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .1 6 5 6

E n g i n e b r a k e s h e e t 1 o f 1

D a t e : 0 7 . 2 0 0 2 L e g e n d A E n g i n e b r a k e

— — A 1 0 A 3 0 A 4 0 1 5 5 X X 3 3 8 2 8 Y

– 0 2 3 7 5 1

— — — — C e n tra l e C e n tr a l c V e h ic le m P lu g c o n P lu g c o n S o le n o id

— — — — — — — — — — — — — — — — — – l e c t r i c a l s y s t e m o m p u t e r 2 a n a g e m e n t c o m p u t e r n . , f r a m e , l e f t n . , e n g i n e b r a k e /E V B v a lv e , e n g i n e b r a k e / E V B

K 1 0 0

2 n d e d it io n

1 7 0


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .1 6 5 6


D a t e : 0 7 . 2 0 0 2 L e g e n d A E n g i n e b r a k e

— — A 1 0 A 3 0 A 4 0 1 5 5 X X 3 3 8 2 8 Y

– 0 2 3 7 5 1

— — — — C e n tra l e C e n tr a l c V e h ic le m P lu g c o n P lu g c o n S o le n o id

— — — — — — — — — — — — — — — — — – l e c t r i c a l s y s t e m o m p u t e r 2 a n a g e m e n t c o m p u t e r n . , f r a m e , l e f t n . , e n g i n e b r a k e /E V B v a lv e , e n g i n e b r a k e / E V B

K 1 0 0

2 n d e d it io n

1 7 0


D I A G R A M S


K 1 0 0

2

d

d it i

1 7 1


D I A G R A M S


K 1 0 0

2 n d e d it io n


W IR IN G

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 3 1 6

E n g i n e b r a k e , a u t o m a t i c , o f f s h e e t 1 o f 1

D a t e : 0 9 . 2 0 0 6 L e g e n d A E n g i n e b r a k e , a u t o m a t i c

— — A 1 A 3 A 4 9 S

–

— — — — C e n tra l C e n tr a l V e h ic le 4 3 B u tto n , 0 0 0 2 0 3

— — — — — — — — — — — — — — — — — – e l e c t r i cc a l s y s t e m c o m p u t e r 2 m a n a g e m e n t c o m p u t e r e n g i n e b r a k e

N o t e

E n g i n e b r a k e b u t t o n S 9 4 3 i s p l u g g e d a t s w i t c h s o c k e t S 1 1 3 3 !

K 1 0 0

2 n d e d it io n

1 7 2


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 3 1 6


D a t e : 0 9 . 2 0 0 6 L e g e n d A E n g i n e b r a k e , a u t o m a t i c

— — A 1 A 3 A 4 9 S

–

— — — — C e n tra l C e n tr a l V e h ic le 4 3 B u tto n , 0 0 0 2 0 3

— — — — — — — — — — — — — — — — — – e l e c t r i cc a l s y s t e m c o m p u t e r 2 m a n a g e m e n t c o m p u t e r e n g i n e b r a k e

N o t e

E n g i n e b r a k e b u t t o n S 9 4 3 i s p l u g g e d a t s w i t c h s o c k e t S 1 1 3 3 !

K 1 0 0

2 n d e d it io n

1 7 2


D I A G R A M S


K 1 0 0

2

d

d it i

1 7 3


D I A G R A M S


K 1 0 0

2 n d e d it io n


W IR IN G

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 5 0 1

M u l tif u n c t io n a l s t e e r in g

w h e e l s h e e t 1 o f 1


A A A A 4 X —

3 4 4 9

0 0 3 4

2 3 7 2

3 9 7 — –

C V S S P — 1 A 2 V 3 G

e n t r a l c o m p u t e r 2 e h ic le m a n a g e m e n t u s ta in e d -a c tio n b ra k te e rin g c o lu m n s ta lk l u g c o n n . , m u l t i f f u n c — — — — — — — — — 4 0 7 / X 1 / 1 5 e h i c le m a n a g e m e n t r o u n d

c o m p u t e r e l e v e r , r e t a r d e r / g e a r b o x t i o n a l s t e e r i n g w h e e l — — — — — — — — — — — – c o m p u t e r ( t e r m i n a l 1 5 )

N o t e

I n t h e c a s e o f t h e d i gg i t a l e n g i n e b r a k e s w i t c h , A 9 4 2 ( s t e e r i n g c o l u m n s t a l k k , r e t a r d e r / g e a r b o x ) i s n o t p a r t o f s t a n d a r d s p e c i  c a t i o n !

K 1 0 0

2 n d e d it io n

1 7 4


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 5 0 1

M u l tif u n c t io n a l s t e e r in g



A A A A 4 X —

3 4 4 9

0 0 3 4

2 3 7 2

3 9 7 — –

C V S S P — 1 A 2 V 3 G

e n t r a l c o m p u t e r 2 e h ic le m a n a g e m e n t u s ta in e d -a c tio n b ra k te e rin g c o lu m n s ta lk l u g c o n n . , m u l t i f f u n c — — — — — — — — — 4 0 7 / X 1 / 1 5 e h i c le m a n a g e m e n t r o u n d

c o m p u t e r e l e v e r , r e t a r d e r / g e a r b o x t i o n a l s t e e r i n g w h e e l — — — — — — — — — — — – c o m p u t e r ( t e r m i n a l 1 5 )

N o t e

I n t h e c a s e o f t h e d i gg i t a l e n g i n e b r a k e s w i t c h , A 9 4 2 ( s t e e r i n g c o l u m n s t a l k k , r e t a r d e r / g e a r b o x ) i s n o t p a r t o f s t a n d a r d s p e c i  c a t i o n !

K 1 0 0

2 n d e d it io n

1 7 4

A D D I T IO N A L W IR I N G M u l tif u n c t io n a l s t e e r in g

D I A G R A M S


K 1 0 0

2

d

d it i

1 7 5

A D D I T IO N A L W IR I N G M u l tif u n c t io n a l s t e e r in g


K 1 0 0

2 n d e d it io n


W IR IN G

D IA G R A M

D I A G R A M S

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 3 6 6

F o g la m p s / a d d i t io n a l h i g h

b e a m

h e a d l ig h ts a n d

c o r n e r in g

lig h t s h e e t 1

o f 1

D a t e : 1 0 . 2 0 0 7 L e g e n d A R B F C A D C

— — A 1 0 A 3 0 A 4 0 A 4 3 A 4 3 1 2 E E 1 2 E 1 9 E 1 9 E 4 8 E 4 8 1 1 1 S 1 5 4 X X 1 5 5 X 1 6 4 X 1 6 4

– 0 2 7 8 9 2 3 4 5 0 1 2 5 0 2 4

o t o g d d o r

a r y l i g h t s w i t c h la m p s itio n a l h i g h b e a m n e r i n g l i g h t

h e a d l i g h t s

— — — — — — — — — — — — — — — — C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 I n s t r u m e n t a t i o n L i g h t s u r r o u n d , r i g h t L i g h t s u r r o u n d , l e f t F o g la m p , r ig h t F o g l a m p , l e f t H i g h b e a m h e a d l i g h t , r i g h t H i g h b e a m h e a d l i g h t , l e f t C o r n e r i n g l i g h t , r i g h t C o r n e r i n g l i g h t , l e f t R o t a r y l i g h t s w i t c h w i t h r e a r f o g l a P l u g c o n n . , f r o n t e n d , l e f t P l u g c o n n . , f r o n t e n d , r i g h t E a r t h i n g p o i n t , c a b b e h i n d i n s t r u m E a r t h i n g p o i n t , c a b , n e x t t o c e n t r a l

— — — — — –

m p e n t p a n e l e l e c t r i c a l s y s t e m

K 1 0 0

2 n d e d it io n

1 7 6


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 3 6 6

F o g la m p s / a d d i t io n a l h i g h

b e a m


c o r n e r in g

lig h t s h e e t 1

o f 1

D a t e : 1 0 . 2 0 0 7 L e g e n d A R B F C A D C

— — A 1 0 A 3 0 A 4 0 A 4 3 A 4 3 1 2 E E 1 2 E 1 9 E 1 9 E 4 8 E 4 8 1 1 1 S 1 5 4 X X 1 5 5 X 1 6 4 X 1 6 4

– 0 2 7 8 9 2 3 4 5 0 1 2 5 0 2 4

o t o g d d o r

a r y l i g h t s w i t c h la m p s itio n a l h i g h b e a m n e r i n g l i g h t

h e a d l i g h t s

— — — — — — — — — — — — — — — — C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 I n s t r u m e n t a t i o n L i g h t s u r r o u n d , r i g h t L i g h t s u r r o u n d , l e f t F o g la m p , r ig h t F o g l a m p , l e f t H i g h b e a m h e a d l i g h t , r i g h t H i g h b e a m h e a d l i g h t , l e f t C o r n e r i n g l i g h t , r i g h t C o r n e r i n g l i g h t , l e f t R o t a r y l i g h t s w i t c h w i t h r e a r f o g l a P l u g c o n n . , f r o n t e n d , l e f t P l u g c o n n . , f r o n t e n d , r i g h t E a r t h i n g p o i n t , c a b b e h i n d i n s t r u m E a r t h i n g p o i n t , c a b , n e x t t o c e n t r a l

— — — — — –

m p e n t p a n e l e l e c t r i c a l s y s t e m

K 1 0 0

2 n d e d it io n

1 7 6

A D D I T IO N A L W IR I N G F o g la m p s / a d d i t io n a l h i g h

b e a m


c o r n e r in g

lig h t s h e e t 1

D I A G R A M S

o f 1

K 1 0 0

2

d

d it i

1 7 7

A D D I T IO N A L W IR I N G F o g la m p s / a d d i t io n a l h i g h

b e a m


c o r n e r in g

lig h t s h e e t 1

o f 1

K 1 0 0

2 n d e d it io n


W IR IN G

D IA G R A M

D I A G R A M S

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 3 3 7

P r i t a r d e r / I n t a r d e r , a u t o m a t i c , o f f s h e e t 1 o f 1

D a t e : 1 1 . 2 0 0 5 L e g e n d A P r i t a r d e r / I n t a r d e r , a u t o m a t i c

— — A 1 A 3 A 4 1 1 S

– 0 0 0 2 0 3 3 3

— — — — C e n tra l C e n tr a l V e h ic le B u tto n ,

— — — — — — — — — — — — — — — — — – e l e c t r i c a l s y s t e m c o m p u t e r 2 m a n a g e m e n t c o m p u t e r s u s t a i n e d - a c t i o n b r a k e

K 1 0 0

2 n d e d it io n

1 7 8


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 3 3 7


D a t e : 1 1 . 2 0 0 5 L e g e n d A P r i t a r d e r / I n t a r d e r , a u t o m a t i c

— — A 1 A 3 A 4 1 1 S

– 0 0 0 2 0 3 3 3

— — — — C e n tra l C e n tr a l V e h ic le B u tto n ,

— — — — — — — — — — — — — — — — — – e l e c t r i c a l s y s t e m c o m p u t e r 2 m a n a g e m e n t c o m p u t e r s u s t a i n e d - a c t i o n b r a k e

K 1 0 0

2 n d e d it io n

1 7 8


D I A G R A M S


K 1 0 0

2

d

d it i

1 7 9


D I A G R A M S


K 1 0 0

2 n d e d it io n


W IR IN G

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 1 3 4

B a s i c l i n e r a d i o s h e e t 1 o f 1

D a t e : 0 1 . 2 0 0 7 L e g e n d A B a s i c l i n e r a d i o

— — A 1 0 A 3 0 A 4 0 A 4 0 A 5 6 6 8 B B 6 8 B 6 8 B 6 9 F 6 0 1 0 Q W 1 7 1 5 4 X X 1 5 4 X 1 6 2 X 1 6 4 X 1 8 6 X 1 8 6 X 1 9 7 X 4 3 6 X 4 6 4 X 4 6 6 X 4 6 7 X 4 8 2

–

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m 2 C e n t r a l c o m p u t e r 2 7 I n s t r u m e n t a t i o n 8 T a c h o g r a p h 4 R a d i o w i t h C D 7 L o u d s p e a k e r , t w e e t e r , l e f t 8 L o u d s p e a k e r , t w e e t e r , r i g h t 9 L o u d s p e a k e r , w i d e - b a n d , l e f t 0 L o u d s p e a k e r , w i d e - b a n d , r i g h t 0 F u s e , r a d i o ( t e r m i n a l 1 5 ) 1 S t e e r i n g l o c k 7 C o m b i n a t i o n a e r i a l , r a d i o , D / E n e t w o r k , G P S 6 P l u g c o n n . , d o o r , r i g h t 7 P l u g c o n n . , d o o r , l e f t 7 P l u g c o n n . , r e v e r s i n g l i g h t 4 E a r t h i n g p o i n t , c a b , n e x t t o c e n t r a l e l e c t r i c a l s y s t e m 3 P l u g c o n n ., l o u d s p e a k e r 4 P l u g c o n n ., l o u d s p e a k e r 4 P l u g c o n n . f o r a c t i v e a e r i a l 6 P l u g c o n n . , p u l s e d i s t r i b u t o r - t a c h o g r a p h 6 P o t e n t i o m e t e r , l i n e 5 8 3 0 0 0 P l u g c o n n . , 4 p u l s e s / m e t e r , l i n e 1 6 5 0 7 4 P l u g c o n n . , H - C A N / M u t e s ig n a l 9 P l u g c o n n . , i g n i t i o n l o c k ( t e r m i n a l R ) 0

N o t e

I f t h e v e h i c l e i s e q u i p p e d w i t h a t e l e p h o n e / m o b i l e , w i d e - b a n d l o u d s p e a k e r B 6 9 0 i s r e p l a c e d b y B 6 9 1 !

K 1 0 0

2 n d e d it io n

1 8 0


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 1 3 4


D a t e : 0 1 . 2 0 0 7 L e g e n d A B a s i c l i n e r a d i o

— — A 1 0 A 3 0 A 4 0 A 4 0 A 5 6 6 8 B B 6 8 B 6 8 B 6 9 F 6 0 1 0 Q W 1 7 1 5 4 X X 1 5 4 X 1 6 2 X 1 6 4 X 1 8 6 X 1 8 6 X 1 9 7 X 4 3 6 X 4 6 4 X 4 6 6 X 4 6 7 X 4 8 2

–

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m 2 C e n t r a l c o m p u t e r 2 7 I n s t r u m e n t a t i o n 8 T a c h o g r a p h 4 R a d i o w i t h C D 7 L o u d s p e a k e r , t w e e t e r , l e f t 8 L o u d s p e a k e r , t w e e t e r , r i g h t 9 L o u d s p e a k e r , w i d e - b a n d , l e f t 0 L o u d s p e a k e r , w i d e - b a n d , r i g h t 0 F u s e , r a d i o ( t e r m i n a l 1 5 ) 1 S t e e r i n g l o c k 7 C o m b i n a t i o n a e r i a l , r a d i o , D / E n e t w o r k , G P S 6 P l u g c o n n . , d o o r , r i g h t 7 P l u g c o n n . , d o o r , l e f t 7 P l u g c o n n . , r e v e r s i n g l i g h t 4 E a r t h i n g p o i n t , c a b , n e x t t o c e n t r a l e l e c t r i c a l s y s t e m 3 P l u g c o n n ., l o u d s p e a k e r 4 P l u g c o n n ., l o u d s p e a k e r 4 P l u g c o n n . f o r a c t i v e a e r i a l 6 P l u g c o n n . , p u l s e d i s t r i b u t o r - t a c h o g r a p h 6 P o t e n t i o m e t e r , l i n e 5 8 3 0 0 0 P l u g c o n n . , 4 p u l s e s / m e t e r , l i n e 1 6 5 0 7 4 P l u g c o n n . , H - C A N / M u t e s ig n a l 9 P l u g c o n n . , i g n i t i o n l o c k ( t e r m i n a l R ) 0

N o t e

I f t h e v e h i c l e i s e q u i p p e d w i t h a t e l e p h o n e / m o b i l e , w i d e - b a n d l o u d s p e a k e r B 6 9 0 i s r e p l a c e d b y B 6 9 1 !

K 1 0 0

2 n d e d it io n

1 8 0


D I A G R A M S


K 1 0 0

2

d

d it i

1 8 1


D I A G R A M S


K 1 0 0

2 n d e d it io n


W IR IN G

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 4 9 0

T o p l i n e r a d i o s h e e t 1 o f 2

D a t e : 0 1 . 2 0 0 7 L e g e n d A T o p l i n e r a d i o

— — A 1 0 A 3 0 A 4 0 A 5 6 6 8 B B 6 8 B 6 8 B 6 9 F 6 0 1 0 Q 1 1 T 1 5 4 X X 1 5 4 X 1 6 2 X 1 6 4 X 1 8 6 X 1 8 6 X 4 6 4 X 4 6 7 X 4 7 4 X 4 7 4 X 4 8 2

–

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m 2 C e n t r a l c o m p u t e r 2 7 I n s t r u m e n t a t i o n 4 R a d i o w i t h C D 7 L o u d s p e a k e r , t w e e t e r , l e f t 8 L o u d s p e a k e r , t w e e t e r , r i g h t 9 L o u d s p e a k e r , w i d e - b a n d , l e f t 0 L o u d s p e a k e r , w i d e - b a n d , r i g h t 0 F u s e , r a d i o ( t e r m i n a l 3 0 ) 1 S t e e r i n g l o c k 9 M o d u l a r v o l t a g e t r a n s f o r m e r 6 P l u g c o n n . , d o o r , r i g h t 7 P l u g c o n n . , d o o r , l e f t 7 P l u g c o n n . , r e v e r s i n g l i g h t 4 E a r t h i n g p o i n t , c a b , n e x t t o c e n t r a l e l e c t r i c a l s y s t e m 3 P l u g c o n n ., l o u d s p e a k e r 4 P l u g c o n n ., l o u d s p e a k e r 6 P o t e n t i a l d i s t r i b u t o r , l i n e 5 8 3 0 0 4 P l u g c o n n . , H - C A N / M u t e s ig n a l 4 A d a p t a t i o n , 1 2 V , f o r C D c h a n g e r 5 P l u g c o n n . , T B M - n a v i g a t i o n d e v i c e 9 P l u g c o n n . , i g n i t i o n l o c k ( t e r m i n a l R ) 0

N o t e

If t h e B 6 9 0 S h e a ta p e

v e h i c is r e p th e d c a t d e v

l e i s l a c e a b le ic e A

e q d b fr o 5 6

u i p p e d w i t h a t e l e p h o n e / m o b i l e , w i d e - b a n d l o u d s p e a k e r y B 6 9 1 ! m A 5 6 4 t o X 4 7 4 5 m u s t b e i d e n t i  e d w i t h r e d i n s u l a t i n g 4 !

N o t e

S h e a t h e d c a b l e f r o m A 5 6 4 t o X 4 7 4 5 m u s t b e i d e n t i  e d w i t h r e d i n s u l a t i n g t a p e a t d e v ic e A 5 6 4 ! K 1 0 0

2 n d e d it io n

1 8 2


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 4 9 0


D a t e : 0 1 . 2 0 0 7 L e g e n d A T o p l i n e r a d i o

— — A 1 0 A 3 0 A 4 0 A 5 6 6 8 B B 6 8 B 6 8 B 6 9 F 6 0 1 0 Q 1 1 T 1 5 4 X X 1 5 4 X 1 6 2 X 1 6 4 X 1 8 6 X 1 8 6 X 4 6 4 X 4 6 7 X 4 7 4 X 4 7 4 X 4 8 2

–

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m 2 C e n t r a l c o m p u t e r 2 7 I n s t r u m e n t a t i o n 4 R a d i o w i t h C D 7 L o u d s p e a k e r , t w e e t e r , l e f t 8 L o u d s p e a k e r , t w e e t e r , r i g h t 9 L o u d s p e a k e r , w i d e - b a n d , l e f t 0 L o u d s p e a k e r , w i d e - b a n d , r i g h t 0 F u s e , r a d i o ( t e r m i n a l 3 0 ) 1 S t e e r i n g l o c k 9 M o d u l a r v o l t a g e t r a n s f o r m e r 6 P l u g c o n n . , d o o r , r i g h t 7 P l u g c o n n . , d o o r , l e f t 7 P l u g c o n n . , r e v e r s i n g l i g h t 4 E a r t h i n g p o i n t , c a b , n e x t t o c e n t r a l e l e c t r i c a l s y s t e m 3 P l u g c o n n ., l o u d s p e a k e r 4 P l u g c o n n ., l o u d s p e a k e r 6 P o t e n t i a l d i s t r i b u t o r , l i n e 5 8 3 0 0 4 P l u g c o n n . , H - C A N / M u t e s ig n a l 4 A d a p t a t i o n , 1 2 V , f o r C D c h a n g e r 5 P l u g c o n n . , T B M - n a v i g a t i o n d e v i c e 9 P l u g c o n n . , i g n i t i o n l o c k ( t e r m i n a l R ) 0

N o t e

If t h e B 6 9 0 S h e a ta p e

v e h i c is r e p th e d c a t d e v

l e i s l a c e a b le ic e A

e q d b fr o 5 6

u i p p e d w i t h a t e l e p h o n e / m o b i l e , w i d e - b a n d l o u d s p e a k e r y B 6 9 1 ! m A 5 6 4 t o X 4 7 4 5 m u s t b e i d e n t i  e d w i t h r e d i n s u l a t i n g 4 !

N o t e

S h e a t h e d c a b l e f r o m A 5 6 4 t o X 4 7 4 5 m u s t b e i d e n t i  e d w i t h r e d i n s u l a t i n g t a p e a t d e v ic e A 5 6 4 ! K 1 0 0

2 n d e d it io n

1 8 2


D I A G R A M S


K 1 0 0

2

d

d it i

1 8 3


D I A G R A M S


K 1 0 0

2 n d e d it io n


W IR IN G

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 4 9 0


D a t e : 0 4 . 2 0 0 6 L e g e n d A T o p l i n e r a d i o B S u b w o o f e r

— — A 1 0 A 3 0 A 4 0 A 5 6 6 8 B B 6 8 B 9 8 W 1 7 1 5 4 X X 1 5 4 X 1 6 4 X 1 9 7 X 4 3 6 X 4 6 6 X 4 6 7

–

— — — — — — — — — — — — — — C e n t r a l e l e c t r i c a l s y s t e m 2 C e n t r a l c o m p u t e r 2 8 T a c h o g r a p h 4 R a d i o w i t h C D 5 L o u d s p e a k e r , b a s s , l e f t 6 L o u d s p e a k e r , b a s s , r i g h t 6 S u b w o o fe r 1 7 C o m b i n a t i o n a e r i a l , r a d i o , D / E 6 P l u g c o n n . , d o o r , r i g h t 7 P l u g c o n n . , d o o r , l e f t 4 E a r t h i n g p o i n t , c a b , n e x t t o c e n 4 P l u g c o n n . f o r a c t i v e a e r i a l 6 P lu g c o n n ., p u ls e d is tr ib u to r - ta 0 P lu g c o n n . , 4 p u ls e s /m e t e r , lin e 1 P l u g c o n n ., s u b w o o f e r

— — — — — — — –

0

n e t w o r k , G P S t r a l e l e c t r i c a l s y s t e m c h o g r a p h 1 6 5 0 7

K 1 0 0

2 n d e d it io n

1 8 4


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 4 9 0


D a t e : 0 4 . 2 0 0 6 L e g e n d A T o p l i n e r a d i o B S u b w o o f e r

— — A 1 0 A 3 0 A 4 0 A 5 6 6 8 B B 6 8 B 9 8 W 1 7 1 5 4 X X 1 5 4 X 1 6 4 X 1 9 7 X 4 3 6 X 4 6 6 X 4 6 7

–

— — — — — — — — — — — — — — C e n t r a l e l e c t r i c a l s y s t e m 2 C e n t r a l c o m p u t e r 2 8 T a c h o g r a p h 4 R a d i o w i t h C D 5 L o u d s p e a k e r , b a s s , l e f t 6 L o u d s p e a k e r , b a s s , r i g h t 6 S u b w o o fe r 1 7 C o m b i n a t i o n a e r i a l , r a d i o , D / E 6 P l u g c o n n . , d o o r , r i g h t 7 P l u g c o n n . , d o o r , l e f t 4 E a r t h i n g p o i n t , c a b , n e x t t o c e n 4 P l u g c o n n . f o r a c t i v e a e r i a l 6 P lu g c o n n ., p u ls e d is tr ib u to r - ta 0 P lu g c o n n . , 4 p u ls e s /m e t e r , lin e 1 P l u g c o n n ., s u b w o o f e r

— — — — — — — –

0

n e t w o r k , G P S t r a l e l e c t r i c a l s y s t e m c h o g r a p h 1 6 5 0 7

K 1 0 0

2 n d e d it io n

1 8 4


D I A G R A M S


K 1 0 0

2

d

d it i

1 8 5


D I A G R A M S


K 1 0 0

2 n d e d it io n


W IR IN G

D IA G R A M

B u n k lig h t , b o t to m

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 3 4 9 s h e e t 1

o f 1

D a t e : 0 4 . 2 0 0 6 L e g e n d A B u n k

— — A 1 A 3 2 E 1 5 X X 2 5 X 2 5

l i g h t , b o t t o m

–

— — — — — — — — — — — — — — — — — — — — — – 0 0 C e n t r a l e l e c t r i cc a l s y s t e m 0 2 C e n t r a l c o m p u t e r 2 7 4 B u n k l i gg h t , b o t t o m 7 3 P l u g c o n n . , b u n k l i g h t , b o t t o m 4 1 P o t e n t i a l d i s t r i b u t o r , 2 1 - p i n , l i n e 3 1 0 0 0 4 3 P o t e n t i a l d i s t r i b u t o r , 2 1 - p i n , l i n e 3 0 0 0 6

K 1 0 0

2 n d e d it io n

1 8 6


D IA G R A M

B u n k lig h t , b o t to m

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 3 4 9 s h e e t 1

o f 1

D a t e : 0 4 . 2 0 0 6 L e g e n d A B u n k

— — A 1 A 3 2 E 1 5 X X 2 5 X 2 5

l i g h t , b o t t o m

–

— — — — — — — — — — — — — — — — — — — — — – 0 0 C e n t r a l e l e c t r i cc a l s y s t e m 0 2 C e n t r a l c o m p u t e r 2 7 4 B u n k l i gg h t , b o t t o m 7 3 P l u g c o n n . , b u n k l i g h t , b o t t o m 4 1 P o t e n t i a l d i s t r i b u t o r , 2 1 - p i n , l i n e 3 1 0 0 0 4 3 P o t e n t i a l d i s t r i b u t o r , 2 1 - p i n , l i n e 3 0 0 0 6

K 1 0 0

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1 8 6

A D D I T IO N A L W IR I N G B u n k lig h t , b o t to m

s h e e t 1

D I A G R A M S

o f 1

K 1 0 0

2

d

d it i

1 8 7

A D D I T IO N A L W IR I N G B u n k lig h t , b o t to m

s h e e t 1

o f 1

K 1 0 0

2 n d e d it io n


W IR IN G

D IA G R A M

D I A G R A M S

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .2 5 9 2

S i d e m a r k e r l i g h t s s h e e t 1 o f 1

D a t e : 0 1 . 2 0 0 7 L e g e n d A S i d e m a r k e r l i g h t s , l e f t B S i d e m a r k e r l i g h t s , r i g h t

— — A 1 A 3 2 E E 2 E 2 E 2

X X X X X X

– 0 0 0 2 1 0 1 1 1 2 1 3

E .. E ... G 1 0 1 1 0 0 X 1 1 6 9 1 1 7 0 1 1 7 1 1 1 7 2 1 5 4 4 1 5 5 7 X ..

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i cc a l s y s t e m C e n t r a l c o m p u t e r 2 1 s t s i d e m a r k e r l i g h t , r i gg h t 1 s t s i d e m a r k e r l i g h t , l e f t 2 n d s id e m a r k e r l i g h t , r i g h t 2 n d s id e m a r k e r l i g h t , l e f t F u r t h e r s i d e m a r k e r l i g h t s w i t h o u t d e s i g n a t io n L a s t s i d d e m a r k e r l i i g h t s w i t t h o u t d e s i g n a t i o n B a t t e r y 2 E a r t h i n g p o i n t , e n g i n n e 3 - w a y d i v i d e r f o r 1 s t s i d e m a r k e r l i g g h t , r i g h t 3 - w a y d i v i d e r f o r 1 s t s i d e m a r k e r l i g h t , l e f t 3 - w a y d i v i d e r f o r 2 n d s i d e m a r k e r l i i g g h t , r i g h t 3 - w a y d i v i d e r f o r 2 n d s i d e m a r k e r l i g h t , l e f t P lu g c o n n ., f r a m e I I I P l u g c o n n . , f r a m e , l e f t F u r t h e r c o n n e c t o r s w i t h o u t d e s i g n a t i o n N o t e

I n t h e c a s e o f t h e s i d d e m a r k e r l i g h t s , t h e c o r r e s p o n d i n g n u m b e r i nn g a n d t h e n u m b e r d e p e n d s o n t h e i nn d i v i d u a l m o d e l s s , w h e e l b a s e l e n g t h s a n d o v e r h a n g s !

K 1 0 0

2 n d e d it io n

1 8 8


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .2 5 9 2


D a t e : 0 1 . 2 0 0 7 L e g e n d A S i d e m a r k e r l i g h t s , l e f t B S i d e m a r k e r l i g h t s , r i g h t

— — A 1 A 3 2 E E 2 E 2 E 2

X X X X X X

– 0 0 0 2 1 0 1 1 1 2 1 3

E .. E ... G 1 0 1 1 0 0 X 1 1 6 9 1 1 7 0 1 1 7 1 1 1 7 2 1 5 4 4 1 5 5 7 X ..

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i cc a l s y s t e m C e n t r a l c o m p u t e r 2 1 s t s i d e m a r k e r l i g h t , r i gg h t 1 s t s i d e m a r k e r l i g h t , l e f t 2 n d s id e m a r k e r l i g h t , r i g h t 2 n d s id e m a r k e r l i g h t , l e f t F u r t h e r s i d e m a r k e r l i g h t s w i t h o u t d e s i g n a t io n L a s t s i d d e m a r k e r l i i g h t s w i t t h o u t d e s i g n a t i o n B a t t e r y 2 E a r t h i n g p o i n t , e n g i n n e 3 - w a y d i v i d e r f o r 1 s t s i d e m a r k e r l i g g h t , r i g h t 3 - w a y d i v i d e r f o r 1 s t s i d e m a r k e r l i g h t , l e f t 3 - w a y d i v i d e r f o r 2 n d s i d e m a r k e r l i i g g h t , r i g h t 3 - w a y d i v i d e r f o r 2 n d s i d e m a r k e r l i g h t , l e f t P lu g c o n n ., f r a m e I I I P l u g c o n n . , f r a m e , l e f t F u r t h e r c o n n e c t o r s w i t h o u t d e s i g n a t i o n N o t e

I n t h e c a s e o f t h e s i d d e m a r k e r l i g h t s , t h e c o r r e s p o n d i n g n u m b e r i nn g a n d t h e n u m b e r d e p e n d s o n t h e i nn d i v i d u a l m o d e l s s , w h e e l b a s e l e n g t h s a n d o v e r h a n g s !

K 1 0 0

2 n d e d it io n

1 8 8


D I A G R A M S


K 1 0 0

2

d

d it i

1 8 9


D I A G R A M S


K 1 0 0

2 n d e d it io n


W IR IN G

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 9 8

S e a t h e a t i n g , d r i v e r s h e e t 1 o f 1

D a t e : 1 2 . 2 0 0 5 L e g e n d A S e a t h e a t i n g , d r i v e r

— — A 1 A 2 A 3 F 1 R 1 1 5 X X 1 6

–

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m S e a t , d r i v e r s i d e C e n t r a l c o m p u t e r 2 F u s e , s e a t h e a t i n g 3 5 P o t e n t i o m e t e r , s e a t h e a t i n g , d r i v e r 6 5 P l u g c o n n . , S e a t h e a t i n g 4 2 E a r t h i n g p o i n t , c a b b e h i n d i n s t r u m e n t p a n e l 0 0 3 3 0 2 9 8

K 1 0 0

2 n d e d it io n

1 9 0


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 9 8


D a t e : 1 2 . 2 0 0 5 L e g e n d A S e a t h e a t i n g , d r i v e r

— — A 1 A 2 A 3 F 1 R 1 1 5 X X 1 6

–

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m S e a t , d r i v e r s i d e C e n t r a l c o m p u t e r 2 F u s e , s e a t h e a t i n g 3 5 P o t e n t i o m e t e r , s e a t h e a t i n g , d r i v e r 6 5 P l u g c o n n . , S e a t h e a t i n g 4 2 E a r t h i n g p o i n t , c a b b e h i n d i n s t r u m e n t p a n e l 0 0 3 3 0 2 9 8

K 1 0 0

2 n d e d it io n

1 9 0


D I A G R A M S


K 1 0 0

2

d

d it i

1 9 1


D I A G R A M S


K 1 0 0

2 n d e d it io n


W IR IN G

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 3 1 3

V o lta g e tra n s fo r m e r, 1 2 V

s h e e t 1 o f 1

D a t e : 1 2 . 2 0 0 5 L e g e n d A V o l t a g e t r a n s f o r m e r , 1 2 V

— — A 1 0 A 3 0 F 2 1 1 1 T 7 2 X X 1 6 4 X 4 6 4

–

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m 2 C e n t r a l c o m p u t e r 2 6 F u s e , v o l t a g e t r a n s f o r m e r , 1 2 V 9 M o d u l a r v o l t a g e t r a n s f o r m e r 3 S o c k e t, 1 2 V 4 E a r t h i n g p o i n t , c a b , n e x t t o c e n t r a l e l e c t r i c a l s y s t e m 5 P o t e n t i a l d i s t r i b u t o r , l i n e 1 6 0 0 0 0

K 1 0 0

2 n d e d it io n

1 9 2


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 3 1 3

V o lta g e tra n s fo r m e r, 1 2 V

s h e e t 1 o f 1

D a t e : 1 2 . 2 0 0 5 L e g e n d A V o l t a g e t r a n s f o r m e r , 1 2 V

— — A 1 0 A 3 0 F 2 1 1 1 T 7 2 X X 1 6 4 X 4 6 4

–

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m 2 C e n t r a l c o m p u t e r 2 6 F u s e , v o l t a g e t r a n s f o r m e r , 1 2 V 9 M o d u l a r v o l t a g e t r a n s f o r m e r 3 S o c k e t, 1 2 V 4 E a r t h i n g p o i n t , c a b , n e x t t o c e n t r a l e l e c t r i c a l s y s t e m 5 P o t e n t i a l d i s t r i b u t o r , l i n e 1 6 0 0 0 0

K 1 0 0

2 n d e d it io n

1 9 2

A D D I T IO N A L W IR I N G V o lta g e tra n s fo r m e r, 1 2 V

D I A G R A M S

s h e e t 1 o f 1

K 1 0 0

2

d

d it i

1 9 3

A D D I T IO N A L W IR I N G V o lta g e tra n s fo r m e r, 1 2 V

s h e e t 1 o f 1

K 1 0 0

2 n d e d it io n


W IR IN G

D IA G R A M

S T A R T /S T O P

D I A G R A M S

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 3 1 7

d e v i c e o n e n g in e s h e e t 1 o f 1

D a t e : 1 2 . 2 0 0 5 L e g e n d A S T A R T /S T O P

— — A 1 0 A 3 0 A 4 0 A 4 3 B 4 9 2 6 K 1 0 Q 5 8 S S 5 8 6 6 X X 1 5 5 X 1 9 6 X 2 3 3 X 2 5 4 X 4 6 4 — —

– 0 2 3 5 3 6 1 0 1 9 1 6 4 1 4 – 1 2 3

d e v ic e o n e n g in e

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 V e h i c l e m a n a g e m e n t c o m p u t e r C o n t r o l u n i t , E D C P r e s s u r e s w i t c h , p a r k i n g b r a k e s w i t c h , s t a r t / s t o p , e x t e r n a l R e l a y , p a r k i n g b r a k e i f s t a r t / s t o p  t t e d S t e e r i n g l o c k B u t t o n , e n g i n e s t a r t ( M P b o x ) B u t t o n , e n g in e s t o p ( M P b o x ) P l u g c o n n . , S t a r t e r i n t e r l o c k P l u g c o n n . , e n g i n e / E D C / g e a r b o x I I P l u g c o n n . , i g n i t i o n l o c k P l u g c o n n . , s t a r t / s t o p d e v i c e P o t e n t i a l d i s t r i b u t o r , 2 1 - p i n , l i n e 3 1 0 0 0 P o t e n t i a l d i s t r i b u t o r , l i n e 6 0 0 2 8 — — — — — — — — — — — — — — — — — — — — — – I m m o b i l i s e r G e a r b o x n e u t r a l S t a r t e r , t e r m i n a l 5 0

K 1 0 0

2 n d e d it io n

1 9 4


D IA G R A M

S T A R T /S T O P

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 3 1 7


D a t e : 1 2 . 2 0 0 5 L e g e n d A S T A R T /S T O P

— — A 1 0 A 3 0 A 4 0 A 4 3 B 4 9 2 6 K 1 0 Q 5 8 S S 5 8 6 6 X X 1 5 5 X 1 9 6 X 2 3 3 X 2 5 4 X 4 6 4 — —

– 0 2 3 5 3 6 1 0 1 9 1 6 4 1 4 – 1 2 3

d e v ic e o n e n g in e

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 V e h i c l e m a n a g e m e n t c o m p u t e r C o n t r o l u n i t , E D C P r e s s u r e s w i t c h , p a r k i n g b r a k e s w i t c h , s t a r t / s t o p , e x t e r n a l R e l a y , p a r k i n g b r a k e i f s t a r t / s t o p  t t e d S t e e r i n g l o c k B u t t o n , e n g i n e s t a r t ( M P b o x ) B u t t o n , e n g in e s t o p ( M P b o x ) P l u g c o n n . , S t a r t e r i n t e r l o c k P l u g c o n n . , e n g i n e / E D C / g e a r b o x I I P l u g c o n n . , i g n i t i o n l o c k P l u g c o n n . , s t a r t / s t o p d e v i c e P o t e n t i a l d i s t r i b u t o r , 2 1 - p i n , l i n e 3 1 0 0 0 P o t e n t i a l d i s t r i b u t o r , l i n e 6 0 0 2 8 — — — — — — — — — — — — — — — — — — — — — – I m m o b i l i s e r G e a r b o x n e u t r a l S t a r t e r , t e r m i n a l 5 0

K 1 0 0

2 n d e d it io n

1 9 4

A D D I T IO N A L W IR I N G S T A R T /S T O P

D I A G R A M S


K 1 0 0

2

d

d it i

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A D D I T IO N A L W IR I N G S T A R T /S T O P


K 1 0 0

2 n d e d it io n


W IR IN G

D I A G R A M S

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 3 9 5

S t o r a g e l o c k e r l i g h t i n g , r e a r l e f t s h e e t 1 o f 1

D a t e : 0 1 . 2 0 0 6 L e g e n d A S t o r a g e l o c k e r l i g h t i n g , r e a r l e f t

— — A 1 0 A 3 0 2 8 E 1 5 6 X X 1 8 2

– 0 2 1 9 7

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 S t o r a g e l o c k e r l i g h t , r e a r P l u g c o n n . , s t o r a g e l o c k e r l i g h t i n g C r i m p e d c o n n e c t o r , l i n e 3 1 0 0 0

K 1 0 0

2 n d e d it io n

1 9 6


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 3 9 5


D a t e : 0 1 . 2 0 0 6 L e g e n d A S t o r a g e l o c k e r l i g h t i n g , r e a r l e f t

— — A 1 0 A 3 0 2 8 E 1 5 6 X X 1 8 2

– 0 2 1 9 7


K 1 0 0

2 n d e d it io n

1 9 6


D I A G R A M S


K 1 0 0

2

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D I A G R A M S


K 1 0 0

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W IR IN G

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 3 9 6

S t o r a g e l o c k e r l i g h t i n g , r e a r r i g h t s h e e t 1 o f 1

D a t e : 0 1 . 2 0 0 6 L e g e n d A S t o r a g e l o c k e r l i g h t i n g , r e a r r i g h t

— — A 1 0 A 3 0 2 8 E 1 5 7 X X 1 8 2

– 0 2 0 0 9


K 1 0 0

2 n d e d it io n

1 9 8


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 3 9 6


D a t e : 0 1 . 2 0 0 6 L e g e n d A S t o r a g e l o c k e r l i g h t i n g , r e a r r i g h t

— — A 1 0 A 3 0 2 8 E 1 5 7 X X 1 8 2

– 0 2 0 0 9


K 1 0 0

2 n d e d it io n

1 9 8


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K 1 0 0

2

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K 1 0 0

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D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 3 5 0

S t o r a g e lo c k e r lig h t in g , t o p

(le ft, m

i d d l e ) s h e e t 1 o f 1

D a t e : 0 4 . 2 0 0 6 L e g e n d A S to r a g e lo c k e r lig h tin g , t o p

— — A 1 A 3 2 E E 2 1 5 X X 2 5 X 2 5

– 0 0 0 2 7 7 7 9 6 8 4 1 4 3

(le f t, m

— — — — — — — — — — — — — — C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 S t o r a g e l o c k e r l i g h t , t o p S t o r a g e l o c k e r l i g h t , t o p P lu g c o n n . , s t o r a g e lo c k e r lig h t, P o t e n tia l d i s t r ib u to r , 2 1 - p i n , lin e P o t e n tia l d i s t r ib u to r , 2 1 - p i n , lin e

i d d l e )

— — — — — — — –

t o p 3 1 0 0 0 3 0 0 0 6

K 1 0 0

2 n d e d it io n

2 0 0


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 3 5 0

S t o r a g e lo c k e r lig h t in g , t o p

(le ft, m


D a t e : 0 4 . 2 0 0 6 L e g e n d A S to r a g e lo c k e r lig h tin g , t o p

— — A 1 A 3 2 E E 2 1 5 X X 2 5 X 2 5

– 0 0 0 2 7 7 7 9 6 8 4 1 4 3

(le f t, m

— — — — — — — — — — — — — — C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 S t o r a g e l o c k e r l i g h t , t o p S t o r a g e l o c k e r l i g h t , t o p P lu g c o n n . , s t o r a g e lo c k e r lig h t, P o t e n tia l d i s t r ib u to r , 2 1 - p i n , lin e P o t e n tia l d i s t r ib u to r , 2 1 - p i n , lin e

i d d l e )

— — — — — — — –

t o p 3 1 0 0 0 3 0 0 0 6

K 1 0 0

2 n d e d it io n

2 0 0

A D D I T IO N A L W IR I N G S t o r a g e lo c k e r lig h t in g , t o p

(le ft, m

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K 1 0 0

2

d

d it i

2 0 1

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W IR IN G

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S to r a g e

lo c k e r lig h t in g , t o p ( le f t , m

D I A G R A M S

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 3 5 1 i d d l e , r i g h t ) s h e e t 1 o f 1

D a t e : 0 4 . 2 0 0 6 L e g e n d A S t o r a g e lo c k e r lig h t in g , t o p

— — A 1 A 3 2 E E 2 E 2 1 5 X X 2 5 X 2 5

– 0 0 0 2 7 7 7 8 7 9 6 8 4 1 4 3

( l e f t , m i d d l e , r i g h t )

— — — — — — — — — — — — — — C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 S t o r a g e l o c k e r l i g h t , t o p S t o r a g e l o c k e r l i g h t , t o p S t o r a g e l o c k e r l i g h t , t o p P lu g c o n n . , s t o r a g e lo c k e r lig h t, P o t e n tia l d i s t r ib u to r , 2 1 - p i n , lin e P o t e n tia l d i s t r ib u to r , 2 1 - p i n , lin e

— — — — — — — –

t o p 3 1 0 0 0 3 0 0 0 6

K 1 0 0

2 n d e d it io n

2 0 2


D IA G R A M

S to r a g e


D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 3 5 1 i d d l e , r i g h t ) s h e e t 1 o f 1

D a t e : 0 4 . 2 0 0 6 L e g e n d A S t o r a g e lo c k e r lig h t in g , t o p

— — A 1 A 3 2 E E 2 E 2 1 5 X X 2 5 X 2 5

– 0 0 0 2 7 7 7 8 7 9 6 8 4 1 4 3

( l e f t , m i d d l e , r i g h t )

— — — — — — — — — — — — — — C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 S t o r a g e l o c k e r l i g h t , t o p S t o r a g e l o c k e r l i g h t , t o p S t o r a g e l o c k e r l i g h t , t o p P lu g c o n n . , s t o r a g e lo c k e r lig h t, P o t e n tia l d i s t r ib u to r , 2 1 - p i n , lin e P o t e n tia l d i s t r ib u to r , 2 1 - p i n , lin e

— — — — — — — –

t o p 3 1 0 0 0 3 0 0 0 6

K 1 0 0

2 n d e d it io n

2 0 2

A D D I T IO N A L W IR I N G S to r a g e


D I A G R A M S

i d d l e , r i g h t ) s h e e t 1 o f 1

K 1 0 0

2

d

d it i

2 0 3

A D D I T IO N A L W IR I N G S to r a g e


i d d l e , r i g h t ) s h e e t 1 o f 1

K 1 0 0

2 n d e d it io n


W IR IN G

D IA G R A M

D I A G R A M S

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 3 6 7

S o c k e ts in c a b , 1 2 V a n d 2 4 V

s h e e t 1 o f 1

D a t e : 1 2 . 2 0 0 5 L e g e n d A S o c k e t , 1 2 V B S o c k e t , 2 4 V

— — A 1 0 A 3 0 F 2 1 F 2 1 1 1 T 7 2 X X 7 2 X 1 6 4

–

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m 2 C e n t r a l c o m p u t e r 2 6 F u s e , v o l t a g e t r a n s f o r m e r , 1 2 V 7 F u s e , s o c k e t , 2 4 V 9 M o d u l a r v o l t a g e t r a n s f o r m e r 3 S o c k e t, 1 2 V 4 S o c k e t, 2 4 V 4 E a r t h i n g p o i n t , c a b , n e x t t o c e n t r a l e l e c t r i c a l s y s t e m

0

K 1 0 0

2 n d e d it io n

2 0 4


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 3 6 7

S o c k e ts in c a b , 1 2 V a n d 2 4 V

s h e e t 1 o f 1

D a t e : 1 2 . 2 0 0 5 L e g e n d A S o c k e t , 1 2 V B S o c k e t , 2 4 V

— — A 1 0 A 3 0 F 2 1 F 2 1 1 1 T 7 2 X X 7 2 X 1 6 4

–

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m 2 C e n t r a l c o m p u t e r 2 6 F u s e , v o l t a g e t r a n s f o r m e r , 1 2 V 7 F u s e , s o c k e t , 2 4 V 9 M o d u l a r v o l t a g e t r a n s f o r m e r 3 S o c k e t, 1 2 V 4 S o c k e t, 2 4 V 4 E a r t h i n g p o i n t , c a b , n e x t t o c e n t r a l e l e c t r i c a l s y s t e m

0

K 1 0 0

2 n d e d it io n

2 0 4

A D D I T IO N A L W IR I N G S o c k e ts in c a b , 1 2 V a n d 2 4 V

D I A G R A M S

s h e e t 1 o f 1

K 1 0 0

2

d

d it i

2 0 5

A D D I T IO N A L W IR I N G S o c k e ts in c a b , 1 2 V a n d 2 4 V

s h e e t 1 o f 1

K 1 0 0

2 n d e d it io n


W IR IN G

D IA G R A M

D I A G R A M S

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 0 8 2

A n t i-ja c k k n ife b r a k e fo r E B S 5

s h e e t 1 o f 1

D a t e : 0 4 . 2 0 0 5 L e g e n d A P i l o t s w i t c h , a n t i - j a c k k n i f e b r a k e

— — A 1 A 3 A 4 7 S 2 5 X X 3 1

– 0 0 0 2 0 2 8 1 4 1 3 1

— — — — — — — — — — — — — — C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 C o n t r o l u n i t , E B S S w i t c h f o r a n t i - j a c k k n i f e b r a k e P o t e n tia l d i s t r ib u to r , 2 1 - p i n , lin e P l u g c o n n . , s w i t c h i n a n t i - j a c k k

— — — — — — — –

a c t u a t i o n 3 1 0 0 0 n i f e b r a k e a c t u a t o r

K 1 0 0

2 n d e d it io n

2 0 6


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 0 8 2

A n t i-ja c k k n ife b r a k e fo r E B S 5

s h e e t 1 o f 1

D a t e : 0 4 . 2 0 0 5 L e g e n d A P i l o t s w i t c h , a n t i - j a c k k n i f e b r a k e

— — A 1 A 3 A 4 7 S 2 5 X X 3 1

– 0 0 0 2 0 2 8 1 4 1 3 1

— — — — — — — — — — — — — — C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 C o n t r o l u n i t , E B S S w i t c h f o r a n t i - j a c k k n i f e b r a k e P o t e n tia l d i s t r ib u to r , 2 1 - p i n , lin e P l u g c o n n . , s w i t c h i n a n t i - j a c k k

— — — — — — — –

a c t u a t i o n 3 1 0 0 0 n i f e b r a k e a c t u a t o r

K 1 0 0

2 n d e d it io n

2 0 6

A D D I T IO N A L W IR I N G A n t i-ja c k k n ife b r a k e fo r E B S 5

D I A G R A M S

s h e e t 1 o f 1

K 1 0 0

2

d

d it i

2 0 7

A D D I T IO N A L W IR I N G A n t i-ja c k k n ife b r a k e fo r E B S 5

s h e e t 1 o f 1

K 1 0 0

2 n d e d it io n


W IR IN G T -C A N

D IA G R A M te r m in a tin g

D I A G R A M S

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 2 1 r e s is t o r i n c a b s h e e t 1 o f 1

D a t e : 1 0 . 2 0 0 5 L e g e n d A F B E C E D P E Z F K G H H A I R J T

— — A 1 A 1 A 1 A 3 A 3 A 4 A 4 A 4 A 6 1 R 1 5 X X 1 9 X 2 0 X 2 4 X 2 5 X 2 5 — —

– 0 0 4 3 4 4 0 2 1 2 0 2 0 3 7 9 2 6 5 5 5 9 4 8 4 1 8 4 0 5 1 4 –

F R ( v e h ic le B S C A S r iT a r d e r B R (c e n tr a l S M (c u s to m V A (h y d ro s t C C A S - E C /H P g e r m in a t in g r

m a n a g e m e n t c o m p u t e r )

o n - b o a r d c o m p u t e r ) e r - s p e c i  c c o n t r o l m o d u l e ) a t i c f r o n t - a x l e d r iv e ) e a r b o x e s i s t o r

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C o n t r o l u n i t , E C A S C o n t r o l u n i t , r e t a r d e r C e n t r a l c o m p u t e r 2 C u s t o m e r - s p e c i  e d c o n t r o l m o d u l e C o n t r o l u n i t , E B S V e h i c l e m a n a g e m e n t c o m p u t e r A C C c o n t r o l u n i t C o n t r o l u n i t , h y d r o s t a t i c f r o n t a x l e d r i v e T e r m i n a t i n g r e s i s t o r , T - C A N P l u g c o n n . , e n g i n e / E D C / g e a r b o x I V P l u g c o n n . , e n g i n e / g e a r b o x P l u g c o n n . , a d a p t a t i o n , A S - T r o n i c P l u g c o n n . , B - p i l l a r , R A S - E C / H P g e a r b o x P l u g c o n n ., C A N , R A S - E C / H P g e a r b o x P l u g c o n n ., C A N , R A S - E C / H P g e a r b o x — — — — — — — — — — — — — — — — — — — — — – 1 W i r i n g f o r e n g i n e D 2 0 6 6 2 W i r i n g f o r e n g i n e D 0 8 3 6 , D 2 8 6 6 , D 2 8 7 6 N o t e

I n v e h i c l e s w i t h T P M , t h e T - C A N t e r m i n a t i n g r e s i s t o r s i t s i n t h e f r a m e o n t h e T P M m o d u le ! K 1 0 0

2 n d e d it io n

2 0 8

A D D I T IO N A L W IR I N G W IR IN G T -C A N

D IA G R A M te r m in a tin g

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 2 2 1 r e s is t o r i n c a b s h e e t 1 o f 1

D a t e : 1 0 . 2 0 0 5 L e g e n d A F B E C E D P E Z F K G H H A I R J T

— — A 1 A 1 A 1 A 3 A 3 A 4 A 4 A 4 A 6 1 R 1 5 X X 1 9 X 2 0 X 2 4 X 2 5 X 2 5 — —

– 0 0 4 3 4 4 0 2 1 2 0 2 0 3 7 9 2 6 5 5 5 9 4 8 4 1 8 4 0 5 1 4 –

F R ( v e h ic le B S C A S r iT a r d e r B R (c e n tr a l S M (c u s to m V A (h y d ro s t C C A S - E C /H P g e r m in a t in g r


o n - b o a r d c o m p u t e r ) e r - s p e c i  c c o n t r o l m o d u l e ) a t i c f r o n t - a x l e d r iv e ) e a r b o x e s i s t o r

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C o n t r o l u n i t , E C A S C o n t r o l u n i t , r e t a r d e r C e n t r a l c o m p u t e r 2 C u s t o m e r - s p e c i  e d c o n t r o l m o d u l e C o n t r o l u n i t , E B S V e h i c l e m a n a g e m e n t c o m p u t e r A C C c o n t r o l u n i t C o n t r o l u n i t , h y d r o s t a t i c f r o n t a x l e d r i v e T e r m i n a t i n g r e s i s t o r , T - C A N P l u g c o n n . , e n g i n e / E D C / g e a r b o x I V P l u g c o n n . , e n g i n e / g e a r b o x P l u g c o n n . , a d a p t a t i o n , A S - T r o n i c P l u g c o n n . , B - p i l l a r , R A S - E C / H P g e a r b o x P l u g c o n n ., C A N , R A S - E C / H P g e a r b o x P l u g c o n n ., C A N , R A S - E C / H P g e a r b o x — — — — — — — — — — — — — — — — — — — — — – 1 W i r i n g f o r e n g i n e D 2 0 6 6 2 W i r i n g f o r e n g i n e D 0 8 3 6 , D 2 8 6 6 , D 2 8 7 6 N o t e

I n v e h i c l e s w i t h T P M , t h e T - C A N t e r m i n a t i n g r e s i s t o r s i t s i n t h e f r a m e o n t h e T P M m o d u le ! K 1 0 0

2 n d e d it io n

2 0 8

A D D I T IO N A L W IR I N G T -C A N

te r m in a tin g

D I A G R A M S

r e s is t o r i n c a b s h e e t 1 o f 1

K 1 0 0

2

d

d it i

2 0 9


te r m in a tin g

r e s is t o r i n c a b s h e e t 1 o f 1

K 1 0 0

2 n d e d it io n


W IR IN G T -C A N

D IA G R A M

D I A G R A M S

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 1 7 4

s ta n d a r d /E C A S

s h e e t 1 o f 1

D a t e : 0 9 . 2 0 0 5 L e g e n d A F B E C E D Z E A F T

— — A 1 A 1 A 3 A 4 A 4 1 R 1 5 X X 1 9 X 2 0 X 4 6 — —

– 0 0 4 3 0 2 0 2 0 3 5 5 5 9 4 8 4 1 6 9 –

F R ( v e h ic le B S C A S B R (c e n tr a d a p t a tio n , e r m in a t in g


l o n - b o a r d c o m p u t e r ) s u p p l e m e n t a r y e q u i p m e n t r e s i s t o r

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C o n t r o l u n i t , E C A S C e n t r a l c o m p u t e r 2 C o n t r o l u n i t , E B S V e h i c l e m a n a g e m e n t c o m p u t e r T e r m i n a t i n g r e s i s t o r , T - C A N P l u g c o n n . , e n g i n e / E D C / g e a r b o x I V P l u g c o n n . , e n g i n e / g e a r b o x P l u g c o n n . , a d a p t a t i o n , A S - T r o n i c A d a p t a t i o n , s u p p l e m e n t a r y e q u i p m e n t — — — — — — — — — — — — — — — — — — — — — – 1 W i r i n g f o r e n g i n e D 2 0 6 6 2 W i r i n g f o r e n g i n e D 0 8 3 6 , D 2 8 6 6 , D 2 8 7 6 N o t e


K 1 0 0

2 n d e d it io n

2 1 0


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 1 7 4


s h e e t 1 o f 1

D a t e : 0 9 . 2 0 0 5 L e g e n d A F B E C E D Z E A F T

— — A 1 A 1 A 3 A 4 A 4 1 R 1 5 X X 1 9 X 2 0 X 4 6 — —

– 0 0 4 3 0 2 0 2 0 3 5 5 5 9 4 8 4 1 6 9 –

F R ( v e h ic le B S C A S B R (c e n tr a d a p t a tio n , e r m in a t in g



— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C o n t r o l u n i t , E C A S C e n t r a l c o m p u t e r 2 C o n t r o l u n i t , E B S V e h i c l e m a n a g e m e n t c o m p u t e r T e r m i n a t i n g r e s i s t o r , T - C A N P l u g c o n n . , e n g i n e / E D C / g e a r b o x I V P l u g c o n n . , e n g i n e / g e a r b o x P l u g c o n n . , a d a p t a t i o n , A S - T r o n i c A d a p t a t i o n , s u p p l e m e n t a r y e q u i p m e n t — — — — — — — — — — — — — — — — — — — — — – 1 W i r i n g f o r e n g i n e D 2 0 6 6 2 W i r i n g f o r e n g i n e D 0 8 3 6 , D 2 8 6 6 , D 2 8 7 6 N o t e


K 1 0 0

2 n d e d it io n

2 1 0



D I A G R A M S

s h e e t 1 o f 1

K 1 0 0

2

d

d iti

2 1 1



s h e e t 1 o f 1

K 1 0 0

2 n d e d itio n


W IR IN G T -C A N

D IA G R A M

D I A G R A M S

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 1 7 5

s t a n d a r d / E C A S / I n t a r d e r s h e e t 1 o f 1

D a t e : 0 9 . 2 0 0 5 L e g e n d A F F R ( v e h ic le B E B S C E C A S D I n t a r d e r E Z B R (c e n tr a F A d a p t a tio n , G T e r m in a t in g

— — A 1 A 1 A 1 A 3 A 4 A 4 1 R 1 5 X X 1 9 X 2 0 X 4 6 — —

– 0 0 4 3 4 4 0 2 0 2 0 3 5 5 5 9 4 8 4 1 6 9 –



— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C o n t r o l u n i t , E C A S C o n t r o l u n i t , r e t a r d e r C e n t r a l c o m p u t e r 2 C o n t r o l u n i t , E B S V e h i c l e m a n a g e m e n t c o m p u t e r T e r m i n a t i n g r e s i s t o r , T - C A N P l u g c o n n . , e n g i n e / E D C / g e a r b o x I V P l u g c o n n . , e n g i n e / g e a r b o x P l u g c o n n . , a d a p t a t i o n , A S - T r o n i c A d a p t a t i o n , s u p p l e m e n t a r y e q u i p m e n t — — — — — — — — — — — — — — — — — — — — — – 1 W i r i n g f o r e n g i n e D 2 0 6 6 2 W i r i n g f o r e n g i n e D 0 8 3 6 , D 2 8 6 6 , D 2 8 7 6 N o t e

I n v e h i c l e s w i t h T P M , t h e T - C A N t e r m i n a t i n g r e s i s t o r s i t s i n t h e f r a m e o n t h e T P M m o d u le ! N o t e

T h e p i n a s s i g n m e n t f o r c o n t r o l u n i t A 1 4 4 s h o w n o n t h e w i r i n g d i a g r a m a p p l i e s t o I n t a r d e r E S T 4 8 o n l y ! P i n a s s i g n m e n t f o r V o i t h R e t a r d e r i s : C A N H i g h : X 1 / 3 ; C A N L o w : X 1 / 1 .

K 1 0 0

2 n d e d it io n

2 1 2


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 1 7 5


D a t e : 0 9 . 2 0 0 5 L e g e n d A F F R ( v e h ic le B E B S C E C A S D I n t a r d e r E Z B R (c e n tr a F A d a p t a tio n , G T e r m in a t in g

— — A 1 A 1 A 1 A 3 A 4 A 4 1 R 1 5 X X 1 9 X 2 0 X 4 6 — —

– 0 0 4 3 4 4 0 2 0 2 0 3 5 5 5 9 4 8 4 1 6 9 –



— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C o n t r o l u n i t , E C A S C o n t r o l u n i t , r e t a r d e r C e n t r a l c o m p u t e r 2 C o n t r o l u n i t , E B S V e h i c l e m a n a g e m e n t c o m p u t e r T e r m i n a t i n g r e s i s t o r , T - C A N P l u g c o n n . , e n g i n e / E D C / g e a r b o x I V P l u g c o n n . , e n g i n e / g e a r b o x P l u g c o n n . , a d a p t a t i o n , A S - T r o n i c A d a p t a t i o n , s u p p l e m e n t a r y e q u i p m e n t — — — — — — — — — — — — — — — — — — — — — – 1 W i r i n g f o r e n g i n e D 2 0 6 6 2 W i r i n g f o r e n g i n e D 0 8 3 6 , D 2 8 6 6 , D 2 8 7 6 N o t e



K 1 0 0

2 n d e d it io n

2 1 2


D I A G R A M S


K 1 0 0

2

d

d it i

2 1 3


D I A G R A M S


K 1 0 0

2 n d e d it io n


W IR IN G T -C A N

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 1 7 8

s t a n d a r d / I n t a r d e r s h e e t 1 o f 1

D a t e : 0 9 . 2 0 0 5 L e g e n d A F F R ( v e h ic le B E B S C I n t a r d e r D Z B R (c e n tr a E A d a p t a tio n , F T e r m in a t in g

— — A 1 A 1 A 3 A 4 A 4 1 R 1 5 X X 1 9 X 2 0 X 4 6 — —

– 0 0 4 4 0 2 0 2 0 3 5 5 5 9 4 8 4 1 6 9 –



— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C o n t r o l u n i t , r e t a r d e r C e n t r a l c o m p u t e r 2 C o n t r o l u n i t , E B S V e h i c l e m a n a g e m e n t c o m p u t e r T e r m i n a t i n g r e s i s t o r , T - C A N P l u g c o n n . , e n g i n e / E D C / g e a r b o x I V P l u g c o n n . , e n g i n e / g e a r b o x P l u g c o n n . , a d a p t a t i o n , A S - T r o n i c A d a p t a t i o n , s u p p l e m e n t a r y e q u i p m e n t — — — — — — — — — — — — — — — — — — — — — – 1 W i r i n g f o r e n g i n e D 2 0 6 6 2 W i r i n g f o r e n g i n e D 0 8 3 6 , D 2 8 6 6 , D 2 8 7 6 N o t e



K 1 0 0

2 n d e d it io n

2 1 4


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 1 7 8


D a t e : 0 9 . 2 0 0 5 L e g e n d A F F R ( v e h ic le B E B S C I n t a r d e r D Z B R (c e n tr a E A d a p t a tio n , F T e r m in a t in g

— — A 1 A 1 A 3 A 4 A 4 1 R 1 5 X X 1 9 X 2 0 X 4 6 — —

– 0 0 4 4 0 2 0 2 0 3 5 5 5 9 4 8 4 1 6 9 –



— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C o n t r o l u n i t , r e t a r d e r C e n t r a l c o m p u t e r 2 C o n t r o l u n i t , E B S V e h i c l e m a n a g e m e n t c o m p u t e r T e r m i n a t i n g r e s i s t o r , T - C A N P l u g c o n n . , e n g i n e / E D C / g e a r b o x I V P l u g c o n n . , e n g i n e / g e a r b o x P l u g c o n n . , a d a p t a t i o n , A S - T r o n i c A d a p t a t i o n , s u p p l e m e n t a r y e q u i p m e n t — — — — — — — — — — — — — — — — — — — — — – 1 W i r i n g f o r e n g i n e D 2 0 6 6 2 W i r i n g f o r e n g i n e D 0 8 3 6 , D 2 8 6 6 , D 2 8 7 6 N o t e



K 1 0 0

2 n d e d it io n

2 1 4


D I A G R A M S


K 1 0 0

2

d

d it i

2 1 5


D I A G R A M S


K 1 0 0

2 n d e d it io n


W IR IN G T -C A N

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 1 8 0

( K S M ) s h e e t 1 o f 1

D a t e : 0 9 . 2 0 0 5 L e g e n d A F B E C Z D K E T

— — A 1 A 3 A 3 A 4 A 4 1 R 1 5 X X 1 9 X 4 6

– 0 0 0 2 1 2 0 2 0 3 5 5 5 9 4 8 6 9

F R B S B R S M e r m

( v e h ic le (c e n tr a l (c u s to m in a t in g r

m a n a g e m e n t c o m p u t e r ) o n - b o a r d c o m p u t e r ) e r - s p e c i c c o n t r o l m o d u l e ) e s i s t o r

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 C u s t o m e r - s p e c i  e d c o n t r o l m o d u l e C o n t r o l u n i t , E B S V e h i c l e m a n a g e m e n t c o m p u t e r T e r m i n a t i n g r e s i s t o r , T - C A N P l u g c o n n . , e n g i n e / E D C / g e a r b o x I V P l u g c o n n . , e n g i n e / g e a r b o x A d a p t a t i o n , s u p p l e m e n t a r y e q u i p m e n t N o t e


K 1 0 0

2 n d e d it io n

2 1 6


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 1 8 0

( K S M ) s h e e t 1 o f 1

D a t e : 0 9 . 2 0 0 5 L e g e n d A F B E C Z D K E T

— — A 1 A 3 A 3 A 4 A 4 1 R 1 5 X X 1 9 X 4 6

– 0 0 0 2 1 2 0 2 0 3 5 5 5 9 4 8 6 9

F R B S B R S M e r m

( v e h ic le (c e n tr a l (c u s to m in a t in g r

m a n a g e m e n t c o m p u t e r ) o n - b o a r d c o m p u t e r ) e r - s p e c i c c o n t r o l m o d u l e ) e s i s t o r

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 C u s t o m e r - s p e c i  e d c o n t r o l m o d u l e C o n t r o l u n i t , E B S V e h i c l e m a n a g e m e n t c o m p u t e r T e r m i n a t i n g r e s i s t o r , T - C A N P l u g c o n n . , e n g i n e / E D C / g e a r b o x I V P l u g c o n n . , e n g i n e / g e a r b o x A d a p t a t i o n , s u p p l e m e n t a r y e q u i p m e n t N o t e


K 1 0 0

2 n d e d it io n

2 1 6


D I A G R A M S

( K S M ) s h e e t 1 o f 1

K 1 0 0

2

d

d it i

2 1 7


D I A G R A M S

( K S M ) s h e e t 1 o f 1

K 1 0 0

2 n d e d it io n


W IR IN G

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 0 7 7

D o o r m o d u le s h e e t 1 o f 5

D a t e : 0 3 . 2 0 0 5 L e g e n d A C e n t r a l l o c k i n g , d r i v e r d o o r B W i n d o w l i f t e r , d r i v e r d o o r

— — A 1 0 A 3 0 A 4 5 A 4 5 A 4 6 5 1 S 1 5 4 X X 1 7 3

–

0

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m 2 C e n t r a l c o m p u t e r 2 1 D o o r m o d u l e , l e f t 3 W i n d o w l i f t e r , l e f t 5 D o o r l o c k , l e f t 9 D o o r l o c k s w i t c h , l e f t 7 P l u g c o n n . , d o o r , l e f t 3 P l u g c o n n . , s w i t c h , w i n d o w l i f t e r s

K 1 0 0

2 n d e d it io n

2 1 8


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 0 7 7


D a t e : 0 3 . 2 0 0 5 L e g e n d A C e n t r a l l o c k i n g , d r i v e r d o o r B W i n d o w l i f t e r , d r i v e r d o o r

— — A 1 0 A 3 0 A 4 5 A 4 5 A 4 6 5 1 S 1 5 4 X X 1 7 3

–

0

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m 2 C e n t r a l c o m p u t e r 2 1 D o o r m o d u l e , l e f t 3 W i n d o w l i f t e r , l e f t 5 D o o r l o c k , l e f t 9 D o o r l o c k s w i t c h , l e f t 7 P l u g c o n n . , d o o r , l e f t 3 P l u g c o n n . , s w i t c h , w i n d o w l i f t e r s

K 1 0 0

2 n d e d it io n

2 1 8


D I A G R A M S


K 1 0 0

2

d

d it i

2 1 9


D I A G R A M S


K 1 0 0

2 n d e d it io n


W IR IN G

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 0 7 7


D a t e : 0 4 . 2 0 0 6 L e g e n d A M B D C V D C

— — A 1 0 A 1 5 A 2 5 A 3 0 A 4 5 1 5 4 X X 1 5 8 X 1 5 8 X 2 5 4 — —

–

ir r o r ia g n o lta g A N

a d j u s t m e n t / m i r r o r h e a t e r , d r i v e r d o o r o s is e s u p p l y , d r i v e r d o o r

— — — — — — — — — — — — — C e n t r a l e l e c t r i c a l s y s t e m 7 M a i n m i r r o r , l e f t 1 W i d e - a n g l e m i r r o r , l e f t 2 C e n t r a l c o m p u t e r 2 1 D o o r m o d u l e , l e f t 7 P l u g c o n n . , d o o r , l e f t 3 P l u g c o n n . , m a i n a n d w i d e - a 5 P l u g c o n n . , k e r b m i r r o r , l e f t 4 P o t e n t i a l d i s t r ib u t o r , 2 1 - p i n , K – — — — — — — — — — — — — — 1 T h e f t w a r n i n g

— — — — — — — — –

0

n g l e m i r r o r , l e f t - l i n e — — — — — — — — –

K 1 0 0

2 n d e d it io n

2 2 0


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 0 7 7


D a t e : 0 4 . 2 0 0 6 L e g e n d A M B D C V D C

— — A 1 0 A 1 5 A 2 5 A 3 0 A 4 5 1 5 4 X X 1 5 8 X 1 5 8 X 2 5 4 — —

ir r o r ia g n o lta g A N

a d j u s t m e n t / m i r r o r h e a t e r , d r i v e r d o o r o s is e s u p p l y , d r i v e r d o o r

–

— — — — — — — — — — — — — C e n t r a l e l e c t r i c a l s y s t e m 7 M a i n m i r r o r , l e f t 1 W i d e - a n g l e m i r r o r , l e f t 2 C e n t r a l c o m p u t e r 2 1 D o o r m o d u l e , l e f t 7 P l u g c o n n . , d o o r , l e f t 3 P l u g c o n n . , m a i n a n d w i d e - a 5 P l u g c o n n . , k e r b m i r r o r , l e f t 4 P o t e n t i a l d i s t r ib u t o r , 2 1 - p i n , K – — — — — — — — — — — — — — 1 T h e f t w a r n i n g

— — — — — — — — –

0

n g l e m i r r o r , l e f t - l i n e — — — — — — — — –

K 1 0 0

2 n d e d it io n

2 2 0


D I A G R A M S


K 1 0 0

2

d

d it i

2 2 1


D I A G R A M S


K 1 0 0

2 n d e d it io n


W IR IN G

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 0 7 7


D a t e : 0 4 . 2 0 0 6 L e g e n d A C e n t r a l l o c k i n g , c o - d r iv e r d o o r B W i n d o w l i f t e r , c o - d r i v e r d o o r

— — A 1 0 A 3 0 A 4 5 A 4 5 A 4 6 5 1 S 1 5 4 X X 1 7 3

–

0

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m 2 C e n t r a l c o m p u t e r 2 2 D o o r m o d u l e , r i g h t 4 W i n d o w l i f t e r , r i g h t 6 D o o r l o c k , r i g h t 8 D o o r l o c k s w i t c h , r i g h t 6 P l u g c o n n . , d o o r , r i g h t 3 P l u g c o n n . , s w i t c h , w i n d o w l i f t e r s

K 1 0 0

2 n d e d it io n

2 2 2


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 0 7 7


D a t e : 0 4 . 2 0 0 6 L e g e n d A C e n t r a l l o c k i n g , c o - d r iv e r d o o r B W i n d o w l i f t e r , c o - d r i v e r d o o r

— — A 1 0 A 3 0 A 4 5 A 4 5 A 4 6 5 1 S 1 5 4 X X 1 7 3

–

0

— — — — — — — — — — — — — — — — — — — — — – C e n t r a l e l e c t r i c a l s y s t e m 2 C e n t r a l c o m p u t e r 2 2 D o o r m o d u l e , r i g h t 4 W i n d o w l i f t e r , r i g h t 6 D o o r l o c k , r i g h t 8 D o o r l o c k s w i t c h , r i g h t 6 P l u g c o n n . , d o o r , r i g h t 3 P l u g c o n n . , s w i t c h , w i n d o w l i f t e r s

K 1 0 0

2 n d e d it io n

2 2 2


D I A G R A M S


K 1 0 0

2

d

d it i

2 2 3


D I A G R A M S


K 1 0 0

2 n d e d it io n


W IR IN G

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 0 7 7


D a t e : 0 3 . 2 0 0 5 L e g e n d A M i r r o r a d j u s t m e n t / m i r r o r h e a t e r , c o - d r iv e r d o o r B V o l t a g e s u p p l y , c o - d r i v e r d o o r C S l i d i n g r o o f

— — A 1 A 1 A 2 A 3 A 4 1 X X 1 5 X 1 5 X 1 5 X 4 2 — —

– 0 0 5 6 5 2 0 2 5 2 4 7 4 6 8 2 8 4 5 9 –

— — — — — — — — — — — — — — C e n t r a l e l e c t r i c a l s y s t e m M a i n m i r r o r , r i g h t W i d e - a n g l e m i r r o r , r i g h t C e n t r a l c o m p u t e r 2 D o o r m o d u l e , r i g h t P l u g c o n n . , s l i d i n g r o o f P l u g c o n n . , d o o r , r i g h t P l u g c o n n . , m a i n a n d w i d e - a n g P l u g c o n n . , k e r b m i r r o r , r i g h t A d a p t a t i o n , r e v e r s i n g b u z z e r i n — — — — — — — — — — — — — — 1 S l i d i n g r o o f

— — — — — — — –

l e m i r r o r , r i g h t r e a r l i g h t — — — — — — — –

K 1 0 0

2 n d e d it io n

2 2 4


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 0 7 7


D a t e : 0 3 . 2 0 0 5 L e g e n d A M i r r o r a d j u s t m e n t / m i r r o r h e a t e r , c o - d r iv e r d o o r B V o l t a g e s u p p l y , c o - d r i v e r d o o r C S l i d i n g r o o f

— — A 1 A 1 A 2 A 3 A 4 1 X X 1 5 X 1 5 X 1 5 X 4 2 — —

– 0 0 5 6 5 2 0 2 5 2 4 7 4 6 8 2 8 4 5 9 –

— — — — — — — — — — — — — — C e n t r a l e l e c t r i c a l s y s t e m M a i n m i r r o r , r i g h t W i d e - a n g l e m i r r o r , r i g h t C e n t r a l c o m p u t e r 2 D o o r m o d u l e , r i g h t P l u g c o n n . , s l i d i n g r o o f P l u g c o n n . , d o o r , r i g h t P l u g c o n n . , m a i n a n d w i d e - a n g P l u g c o n n . , k e r b m i r r o r , r i g h t A d a p t a t i o n , r e v e r s i n g b u z z e r i n — — — — — — — — — — — — — — 1 S l i d i n g r o o f

— — — — — — — –

l e m i r r o r , r i g h t r e a r l i g h t — — — — — — — –

K 1 0 0

2 n d e d it io n

2 2 4


D I A G R A M S


K 1 0 0

2

d

d it i

2 2 5


D I A G R A M S


K 1 0 0

2 n d e d it io n


W IR IN G

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 0 7 7


D a t e : 0 3 . 2 0 0 5 L e g e n d A V o l t a g e s u p p l y

— — A 1 A 3 F 3 F 3 F 3 1 7 X

– 0 0 0 2 7 6 8 2 8 3 3 3

— — — — C e n tra l e C e n tr a l c F u s e , c a F u s e , d o F u s e , d o P lu g c o n

— — — — — — — — — — — — — — — — — – l e c t r i c a l s y s t e m o m p u t e r 2 b , i n s i d e ( t e r m i n a l 1 5 ) o r m o d u le o r m o d u le n . , s w i t c h , w i n d o w l i f t e r s

K 1 0 0

2 n d e d it io n

2 2 6


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 0 7 7


D a t e : 0 3 . 2 0 0 5 L e g e n d A V o l t a g e s u p p l y

— — A 1 A 3 F 3 F 3 F 3 1 7 X

– 0 0 0 2 7 6 8 2 8 3 3 3

— — — — C e n tra l e C e n tr a l c F u s e , c a F u s e , d o F u s e , d o P lu g c o n

— — — — — — — — — — — — — — — — — – l e c t r i c a l s y s t e m o m p u t e r 2 b , i n s i d e ( t e r m i n a l 1 5 ) o r m o d u le o r m o d u le n . , s w i t c h , w i n d o w l i f t e r s

K 1 0 0

2 n d e d it io n

2 2 6


D I A G R A M S


K 1 0 0

2

d

d it i

2 2 7


D I A G R A M S


K 1 0 0

2 n d e d it io n


W IR IN G

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 3 0 3

P r e p a r a t i o n , t r a n s v e r s e d i f f e r e n t i a l l o c k , r e a r a x l e ( 2 - a x l e v e h i c l e ) s h e e t 1 o f 1

D a t e : 0 1 . 2 0 0 6 L e g e n d A P r e p a r a t i o n , t r a n s v e r s e d i f f e r e n t i a l l o c k , r e a r a x l e

— — A 1 A 3 A 4 H 3 1 S 1 5 X X 1 5 X 2 5 X 4 7

–

— — — — — — — — — — — — — — — — — — — C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 I n s t r u m e n t a t i o n 9 8 C h e c k la m p , d iffe r e n t ia l l o c k , tr a n s v e r s e , r e 8 7 S w i t c h , t r a n s v e r s e d i f f e r e n t i a l l o c k , r e a r a x 4 4 P lu g c o n n . , f r a m e I I I 5 7 P l u g c o n n . , f r a m e , l e f t 4 1 P o t e n t i a l d i s t r i b u t o r , 2 1 - p i n , l i n e 3 1 0 0 0 3 2 P o t e n t i a l d i s t r i b u t o r , l i n e 1 6 0 0 0 , s w i t c h l i g h

— — –

0 0 0 2 0 7

a r a x l e l e

t i n g

K 1 0 0

2 n d e d it io n

2 2 8


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 3 0 3


D a t e : 0 1 . 2 0 0 6 L e g e n d A P r e p a r a t i o n , t r a n s v e r s e d i f f e r e n t i a l l o c k , r e a r a x l e

— — A 1 A 3 A 4 H 3 1 S 1 5 X X 1 5 X 2 5 X 4 7

–

— — — — — — — — — — — — — — — — — — — C e n t r a l e l e c t r i c a l s y s t e m C e n t r a l c o m p u t e r 2 I n s t r u m e n t a t i o n 9 8 C h e c k la m p , d iffe r e n t ia l l o c k , tr a n s v e r s e , r e 8 7 S w i t c h , t r a n s v e r s e d i f f e r e n t i a l l o c k , r e a r a x 4 4 P lu g c o n n . , f r a m e I I I 5 7 P l u g c o n n . , f r a m e , l e f t 4 1 P o t e n t i a l d i s t r i b u t o r , 2 1 - p i n , l i n e 3 1 0 0 0 3 2 P o t e n t i a l d i s t r i b u t o r , l i n e 1 6 0 0 0 , s w i t c h l i g h

— — –

0 0 0 2 0 7

a r a x l e l e

t i n g

K 1 0 0

2 n d e d it io n

2 2 8


D I A G R A M S


K 1 0 0

2

d

d it i

2 2 9


D I A G R A M S


K 1 0 0

2 n d e d it io n


W IR IN G

D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 3 7 9

P r e p a r a tio n , c e n t r a l l u b r ic a t io n

s y s te m

s h e e t 1 o f 1

D a t e : 0 1 . 2 0 0 6 L e g e n d A C e n t r a l l u b r ic a t io n

— — A 1 A 3 A 4 1 H M 1 4 S 7 X X 1 6 X 2 5 X 4 7

s y s t e m

–

— — — — — — — — — — — — — — — — — — — — — – 0 0 C e n t r a l e l e c t r i c a l s y s t e m 0 2 C e n t r a l c o m p u t e r 2 0 7 I n s t r u m e n t a t i o n 1 6 C h e c k l a m p , c e n t r a l l u b r i c a t i o n s y s t e m 3 1 C e n t r a l l u b r i c a t i o n p u m p 0 7 B u t t o n , i n t e r i m l u b r i c a t i o n 1 8 P l u g c o n n . , c a b - c e n t r a l l u b r i c a t i o n s y s t e m 4 4 E a r t h i n g p o i n t , c a b , n e x t t o c e n t r a l e l e c t r i c a l s y s t e m 4 1 P o t e n t i a l d i s t r i b u t o r , 2 1 - p i n , l i n e 3 1 0 0 0 3 2 P o t e n t i a l d i s t r i b u t o r , l i n e 1 6 0 0 0 , s w i t c h l i g h t i n g

K 1 0 0

2 n d e d it io n

2 3 0


D IA G R A M

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 3 7 9

P r e p a r a tio n , c e n t r a l l u b r ic a t io n

s y s te m

s h e e t 1 o f 1


— — A 1 A 3 A 4 1 H M 1 4 S 7 X X 1 6 X 2 5 X 4 7

s y s t e m

–


K 1 0 0

2 n d e d it io n

2 3 0

A D D I T IO N A L W IR I N G P r e p a r a tio n , c e n t r a l l u b r ic a t io n

s y s te m

D I A G R A M S

s h e e t 1 o f 1

K 1 0 0

2

d

d it i

2 3 1

A D D I T IO N A L W IR I N G P r e p a r a tio n , c e n t r a l l u b r ic a t io n

s y s te m

s h e e t 1 o f 1

K 1 0 0

2 n d e d it io n


W IR IN G

D IA G R A M

C e n t r a l lu b r ic a tio n

D I A G R A M S

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 3 5 2 s y s te m

s h e e t 1 o f 1


— — A 1 A 3 A 4 1 H M 1 4 S 7 X X 1 6 X 2 5 X 4 7

s y s t e m

–


K 1 0 0

2 n d e d it io n

2 3 2


D IA G R A M

C e n t r a l lu b r ic a tio n

D I A G R A M S

N O . 8 1 .9 9 1 9 2 .3 3 5 2 s y s te m

s h e e t 1 o f 1


— — A 1 A 3 A 4 1 H M 1 4 S 7 X X 1 6 X 2 5 X 4 7

s y s t e m

–


K 1 0 0

2 n d e d it io n

2 3 2

A D D I T IO N A L W IR I N G C e n t r a l lu b r ic a tio n

s y s te m

D I A G R A M S

s h e e t 1 o f 1

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