Solucionario Granville

Solu cionario de Cal culo Int egr al

SOLUCIONARlO DE

CALCULO DIFERENCIAL E INTE GRAL - G RANVILLE

llMUSA

Problemas. Páginas 272, 273, 274 . “Integración por Partes” Para esta clase de problemas se aplica la siguiente fórmula: ∫ u . dv = u.v - ∫ v . du . 1.-

∫ x sen x dx u =x dv = sen x dx Para obtener “v” , se integra dv = senx ,en ambos miembros. De igual modo se efectua en todos los problemas. u =x ∫ dv = ∫ sen x dx du = dx v = - cos x x(- cos x) - ∫ - cos x . dx = - x . cos x + ∫ cos x . dx = - x .cos x + sen x = sen x - x cos x + c .

2.-

∫ ln x dx = x (ln x - 1) + c . u = ln x du = 1 dx x

dv = dx v= x

ln x . x - ∫ x . 1 dx = ln x . x - ∫ dx = x ln x - x = x(ln x - 1) + c . x 3.-

∫ x sen x dx = 4 sen x - 2x cos x d + c . 2 2 2 u =x du = dx

∫ dv = 2∫ sen x .½ dx 2 v = - 2 cos x 2 .

x (- 2 cos x ) - ∫ 2 .cos x . dx = - 2x cos x - 2 .2 ∫ cos x .(½) dx 2 2 2 2 - 2x cos x - 4 ∫ cos x .(½) dx = - 2x cos x - 4(- sen x ). 2 2 2 2

- 2x cos x + 4 sen x = 4 sen x - 2x cos x + c . 2 2 2 2 4.-

∫ x cos nx dx = cos nx + x sen nx + c . n2 n u =x du = dx du = dx

dv = cos nx . dx ∫ dv = 1/n ∫ cos nx .(n) dx v = sen nx n

.

x . sen nx - ∫ sen nx . dx = x .sen nx - 1 1 n n n n n x .sen nx - 1 n n2 5.-

∫ sen nx .(n)dx =

- cos nx = x .sen nx + cos nx + c . = n n2

∫ u sec2 u du = u tg u + ln cos u + c . u =u dv = sec2 u du ∫ dv = ∫ sec2 u du du = du v = tg u u .tg u - ∫ tg u du = u .tg u - (- ln cos u) = u .tg u + ln cos u + c .

6.-

∫ v sen2 3v dv = ¼ v2 - 1/12 v sen 6v - 1/72 cos 6v u + c . u =v du = dv

dv = sen2 3v dv ∫ dv = ∫ sen2 3v dv

Se aplica : ∫ sen2 u du = ½ u - ¼ sen 2u ; donde u = 3v

v = 1/3 ∫ sen2 3v .(3) dv v =1/3 [½ 3v - ¼ sen 2(3v)] v = 1/6 3v - 1/12 sen 6v v = ½ v - 1/12 sen 6v v (½ v - 1/12 sen 6v) - ∫ (½ v - 1/12 sen 6v) dv = ½ v2 (- v . sen 6v) - ½∫ v dv + 1/12 .1/6 ∫ sen 6v .(6) dv =

12 7.-

∫ y2 sen ny dy = 2 cos ny + 2 y sen ny - y2 cos ny + c . n2 n 2 u =y dv = sen ny dy du = 2y .dy ∫ dv = ∫ sen ny dy v = (1/n)∫ sen ny .(n) dy v = (- cos ny) n y2(- cos ny) - ∫ (- cos ny) 2ydy = n n - y2cos ny + ( 2 )∫ cos ny .y dy = - y2cos ny + ( 2 )∫ y cos ny . dy n n n n Integrando por partes : ∫ y cos ny .dy . u =y du = dy

dv = cos ny dy ∫ dv = ∫ cos ny dy v = (1/n)∫ cos ny .(n) dy v = (sen ny) n

∫ y cos ny.dy = y (sen ny) - ∫ (sen ny).dy = n n ∫ y cos ny.dy = y (sen ny) - 1 . 1 . ∫ (sen ny) .(n)dy n n n ∫ y cos ny.dy = y (sen ny) - 1 . (- cos ny) .(n)dy n n2 ∫ y cos ny.dy = y (sen ny) + ( cos ny) n n2 Enlazando y sustituyendo ∫ y cos ny.dy , en la integral original:

∫ y2 sen ny dy = - y2 cos ny + ( 2 )∫ y cos ny . dy n n ∫ y2 sen ny dy = - y2 cos ny + ( 2 ) y (sen ny) + ( cos ny) n n n n2

=

∫ y2 sen ny dy = - y2 cos ny + 2 y sen ny + 2 cos ny .Ordenando: n n2 n3 ∫ y2 sen ny dy = 2 cos ny + 2 y sen ny - y2 cos ny + c . n3 n2 n 8.-

∫ x ax dx = ax x - 1 ln a ln2 a

+c.

u =x du = dx

dv = ax dx ∫ dv = ∫ ax dx v = ax ln a

.

x . ax - ∫ ax . dx = x . ax - 1 ∫ ax .dx = x . ax - 1 ax ln a ln a n ln a ln a ln a ln a ln a x . ax - ax = ax x - 1 + c . ln a ln2 a ln a ln2 a 9.-

∫ xn ln x dx = xn+1 ln x - 1 n+1 n+1 ∫ x n ln x dx = u = ln x du = 1 dx x

+c.

dv = xn dx ∫ dv = ∫ xn dx v = xn+1 n+1 n+1 n+1 ln x . x - ∫ x . 1 dx = ln x . xn+1 - 1 ∫ xn+1 dx .

.

n+1

n+1

x

n+1

n+1

x

ln x . xn+1 - 1 ∫ xn+1.x -1 dx = ln x . xn+1 - 1 ∫ xn+1-1 dx = n+1 n+1 n+1 n+1 ln x . xn+1 - 1 ∫ xn dx = ln x . xn+1 - 1 . xn+1 = n+1 n+1 n+1 n+1 n+1 xn+1 ln x - 1 + c . n+1 n+1 10.-

∫ arc sen x dx = x arc sen x + √1 - x2 + c . u = arc sen x dv = dx du = 1 dx ∫ dv = ∫ dx 2 √1 - x v =x arc sen x . x - ∫ x . 1 dx = x arc sen x - ∫ x (1 - x2)-1/2 dx = √1 - x2 Ordenando: ∫ x (1 - x2)-1/2 dx y completando el diferencial. x arc sen x - (-½)∫ (1- x2)-1/2.(-2)x dx = x arc sen x + ½(1- x2)-1/2+1 -1/2+1 x arc sen x + (1- x2)1/2 = x arc sen x + (1- x2)1/2 = 2(1/2) x arc sen x + √1- x2 + c .

11.-

∫ arc tg x dx = x arc tg x - ½ ln (1 + x2) + c . u = arc tg x du = 1 dx 1 + x2 arc tg x . x - ∫ x . 1 1 + x2 arc tg x . x - ∫

x

dv = dx ∫ dv = ∫ dx v =x dx .

dx . Completando el diferencial.

1 + x2 v = 1 + x2 Falta (2) para completar el diferencial.Se aplica: dv = 2x dx ∫ dv = ln v + c v arc tg x . x - (½)∫ (2)x dx . Completando el diferencial y ordenando.

1 + x2 x arc tg x - ½ ln (1 + x2) = x arc sen x - ½ ln (1 + x2) + c . 12.-

∫ arc cot y dy = y arc cot y + ½ ln (1 + y2) + c . u = arc cot y du = 1 dx 1 + y2 arc cot y . y - ∫ y . 1 1 + x2 y .arc cot y + ∫

dv = dy ∫ dv = ∫ dy v =y dx .

y . dy. Completando el diferencial. 1 + y2

v = 1 + y2 Falta (2) para completar el diferencial.Se aplica: dv = 2y dy ∫ dv = ln v + c v y .arc cot y + ∫ y . dy . Completando el diferencial 1 + y2 y arc cot y + ½ ln (1 + y2) + c . 13.-

∫ arc cos 2x ax . dx = x arc cos 2x - ½ √1 - 4x2 + c . u = arc cos 2x du = 2 .dx 2 √1 - (2x) du = -

2 .dx √1 - 4x2

dv = dx ∫ dv = ∫ dx v =x

arc cos 2x . x - ∫ x 2 dx . √1 - 4x2 x arc cos 2x + ∫

2x dx . √1 - 4x2

x arc cos 2x + ∫ (1 - 4x2)-1/2 . 2x dx .Completando el diferencial. v = 1 - 4x2 Falta (- 4) para completar el diferencial.Se aplica: dv = - 8x dx ∫ vn dv = vn+1 + c n+1 x arc cos 2x + (- ¼) ∫ (1 - 4x2)-1/2 .(- 4) 2x dx . x arc cos 2x + (- ¼)(1 - 4x2)-1/2+1 = x arc cos 2x - ¼ .(1 - 4x2)1/2 = -1/2+1 1/2

x arc cos 2x - ( ¼ )(2)(1 - 4x2)1/2 = x arc cos 2x - ½ (1 - 4x2)1/2 x arc cos 2x - ½ √1 - 4x2 + c . 14.-

∫ arc sec y . dy = y arc sec y - ln (y + √y2 - 1 + c . u = arc sec y du = 1 dx 2 y √y - 1

dv = dy ∫ dv = ∫ dy v =y

arc sec y . y - ∫ y

dy .

arc sec y . y - ∫

1 y √y2 - 1

y y √y - 1

dy .

y y √y2 - 1

dy .

2

arc sec y . y - ∫

y arc sec y - ∫ dy . √ y2 - 1 Se aplica : ∫ dv = ln [v + √ v2 - 1 ] 2 √v - 1

y arc sec y - ln [y + √y2 - 1 ] + c . 15.-

∫ arc csc t . dt = t arc csc t + 2 ln (t + √t2 - 4 ) + c . 2 2 u = arc csc t . dv = dt 2 du = -½ dt . ∫ dv = ∫ dt 2 ½ t √(½ t ) - 1 v =t arc csc t . t - ∫ t -½ dt . 2 2 ½ t √(½ t ) - 1 arc csc t . t - ∫ t 2

-½ dt . ½ t √(½ t )2 - 1

arc csc t . t + ∫ dt 2 2 √¼ t - 1

=

v = ½ t Falta (½) para completar el diferencial.Se aplica: 2 dv = ½ ∫ dv = ln [v + √(½ t ) - 1 + c √ v2 - a2 t arc csc t + 2 ∫ 2

16.-

(½) dt t2 - 4 4

=

t arc csc t + 2 ln [v + √(½ t )2 - 1 ]+ c 2

∫ x arc csc x . dx = x2 + 1 arc tg x - x + c . 2 2 u = arc csc x . dv = dx . du =

-1 x √x 2 - 1

arc csc x . x - ∫ x

dx . -1 x √x 2 - 1

∫ dv = ∫ dx v =x dt .

arc csc t . t - ∫ t

-½ dt . ½ t √(½ t )2 - 1

3

arc csc t . t + ∫ dt 2 √¼ t 2 - 1

=

v = ½ t Falta (½) para completar el diferencial.Se aplica: 2 dv = ½ ∫ dv = ln [v + √(½ t ) - 1 + c 2 2 √v -a 18 .

∫x

2

e −x dx = −e −x (2 + 2 x + x 2 ) +c.

u =x

∫ dv

2

du = 2 x.dx ( x )( −e 2

−x

= ∫e

v = −e

) − ∫ ( −e

−x

−x

)( 2 x ) dx = - x 2 . e −x + 2 ∫ x.e −x dx . (1 ra solución).

u =x

∫ dv =∫ e

du = dx

v = −e

( x )( −e

−x

) − ∫ −e

−x

−x

−x

]

.( −) dx

.

dx = - x e

− xe −x −e −x (2 da solución).

[

(-) dx

−x

−x

+( −) ∫ (e

Tomando

−x

)( −) dx =.

contacto

con la 1ra solución.

- x 2 . e −x + 2 − xe −x −e −x = - x 2 . e −x −2 xe −x −2e −x . -e 19 .

−x

∫e

θ

[x

2

cos θ.dθ =

u =eθ du = e θ.dθ

∫e

θ

]

+ 2 x + 2 +c. θ

e (sen θ+cos θ) +c. 2 ∫ dv =∫ cos θ v = sen θ

cos θ.dθ = e θ sen θ− ∫ e θ sen θdθ.

t arc csc t + 2 ∫ 2

(½) dt t2 - 4 4

=

t arc csc t + 2 ln [v + √(½ t )2 - 1 ]+ c 2

u =e

∫ dv = sen θ dθ

θ

du = e dθ

v = −cos θ

θ

∫ e cos θ.dθ = e sen θ−[− e cos θ− ∫ − e cos θ dθ]. ∫ e cos θ.dθ = e sen θ−[− e cos θ+ ∫ e cos θ dθ]. ∫ e cos θ.dθ = e sen θ+ e cos θ− ∫ e cos θ dθ. ∫ e cos θ.dθ+ ∫ e cos θ.dθ = e ( sen θ+ cos θ). 2 ∫ e cos θ.dθ = e ( sen θ + cos θ). θ

θ

θ

θ

θ

θ

θ

θ

θ

θ

θ

θ

θ

θ

θ

θ

θ

e θ ( sen θ + cos θ) + c. 2 ln x dx x 20 . ∫ = ln x − ln( x +1) + c. ( x +1) x +1 1 u = ln x ∫ dv = ∫ ( x +1) 2 dx

∫ e cos θ.dθ = θ

du = −

1 dx x

v=

( x +1) −2+1 ( x +1) −1 1 = =− + c. − 2 +1 −1 ( x +1)

ln x 1  1  ln x dx ln x dx  − − + =− +  .dx = − x +1 ∫  x +1  x  x +1 ∫ x ( x +1) x +1 ∫ x 2 + x

Solucionando: x2 + x , completando con cuadrados. 2 2 1 1  1 1  x2 + x + − =x +  =  . 4 4  2 2 1 1 − ln x dx ln x 1 2 2 = − +∫ =− + ln 2 2 1 1 x +1 x +1  1  1 1   2  x + +  x +  −    2 2 2 2 2     ln x x ln x − + ln =− + ln x − ln( x +1) = x +1 x +1 x +1 x+

− ln x + (ln x )( x +1) (ln x )( x + 1 −1) − ln( x + 1) = − ln( x +1) = x +1 x +1 x .lnx − ln(x + 1) + c. x +1 x3 x2 +2 21 . ∫ x 2 arc sen x dx = arc sen x + 1 − x 2 + c. 3 9

∫ dv = ∫ x

u = arc sen x du =

1

v=

1− x2

2

dx

x3 3

1 x3  x3 x3 1 1 − arc sen x − ∫  . = arc sen x − ∫ (1 - x 2 ) 2 x 3 dx  3 3 3  3 1− x 2  1 x3 1 arc sen x − ∫ x 2 .(1 − x 2 ) 2 x dx .Integrando por partes la 2 da integral 3 3

u = x2

du = 2 x dx

1 -1  1 ∫ dv = ∫ (1 − x 2 ) 2 x dx dv =  −  (1 − x 2 ) 2 .(-2)x dx  2

∫

∫

1  −1 +1  1 1  1− x2 2  (1 − x 2 ) 2 2)2 v=−  = − = − ( 1 − x  2 1 1  − +1  2   2  2

(

)

v = − 1− x 2 x3 1 arc sen x − ( x 2 ) − 1 − x 2 - ∫ - 1 - x 2 ( 2 x ) dx 3 3 3 1 x 1  arc sen x − ( x 2 ) − 1 − x 2 - ∫ (1 − x 2 ) 2 .(- 2 x ) dx  3 3 

[

x3 3

arc sen x +

x2 1− x2 3

( (

) ( )

1 +1    (1 - x 2 ) 2  +   3 1   +1  2  1

)

]

3  x3 x 2 1 −x 2 1 (1 - x 2 ) 2 arc sen x + +  3 3 3 3  2 

     

x3 x 2 1 −x 2 2 arc sen x + + (1 - x 2 ) 1 − x 2 3 3 9 3 2  2 x 2(1 −x )  2 x  arc sen x + 1 − x  + 3 9  3    3 3x 2 +2 −2 x 2  x  arc sen x + 1 − x 2  3 9     3 x 2 + 2  x  arc sen x + 1 −x 2  3  9    x3 x 2 +2 arc sen x + . 1 −x 2 + c . 3 9 ln( x +1) dx 22 . ∫ = 2 x +1[ln( x +1) −2] + c. x +1 −1 1 u = ln( x +1) dv = ∫ = ∫( x +1) 2 dx x +1 1 − +1

1

1 ( x +1) 2 ( x +1) 2 v= = = 2( x +1) 2 −1 1 +1 2 2 1 1 1 2( x +1) 2 . ln( x +1) − ∫2( x +1) 2 . dx 2 ( x +1) 2

1 du = dx x +1

1

2( x +1) 2 ln( x +1) −2 ∫ 1

1

dx ( x +1)

2( x +1) 2 [ln( x +1) −2] + c .

1 2

= 2( x +1) 2 ln( x +1) −2 ∫( x +1)

1 − 2

dx

23 .

x e x dx

∫ (1 + x ) ∫e

x

2

=

ex + c. 1+x

1 .dx (1 + x ) 2

.x.

1

∫ dv = ∫ (1 + x )

u = e x .x

2

dx

v = ∫ (1 + x ) dx −2

du = e x + xe x du = e (1 + x ) = e ( x + 1) x

x

−2 +1 ( 1+ x) v=

− 2 +1

−1 ( 1+ x) =

−1

=−

1

(1 + x )

( e x .x ) -

.

1  1  x   − ∫−  . ( e )( x + 1) dx 1 + x 1 + x    − xe x − xe x + e x (1 + x ) e x ( − x + 1 + x )  − xe x  + ex = = =   + ∫ e x dx = 1+ x 1+ x 1+ x  1+ x 

e x (1) ex = + c. 1+ x 1+ x 24 .

e − t ( πsen πt − cos πt ) π2 + 1 dv = cos πt . dt

∫ e − t cos πt . dt = u = e−t

;

du = − e − t ;

1

∫ dv = ∫ cos πt . dt =  π ∫ cos πt .( π) dt

sen πt . π  sen πt   sen πt  ∫ e − t cos πt . dt = ( e − t )  π  − ∫  π  ( − e − t ) dt

du = − e − t

∫e

−t

v=

 sen πt  1 cos πt . dt = ( e − t )   + ∫ e − t . sen πt dt π   π

u = e−t

;

du = − e − t ;

dv = sen πt ; ∫ dv = ∫ sen πt dt . v = ∫ sen πt dt = (1 π) ∫ sen πt .( π) dt = −

cos πt π

(

∫ e − t cos πt . dt = e − t

)  senππt  + 1π ∫ e − t .

  sen π t   + ∫ e − t cos πt . dt = ( e − t )  π  

1 π

sen πt dt

( t )  − cosπ πt  − ∫  − cosπ πt ( e − t ) dt

 − e 



( ) (cos πt) dt

1  sen πt  e − t . cos πt − − ∫ e − t cos πt . dt = e − t  ∫ e− t π 2   π π2

(

26 .

∫ x.cos

2

)

2 x dx

∫ (e − t )( cos πt ) dt +

[

1

πt ( ) (cos πt) dt = ( e − t )  senππt  − e − t . cos 2

∫ e− t

dv π=2 cos 2 2 x dx ; ∫ dv = ∫ cos 2 2 x dx π sen πt  e − t . cos πt 1   −t)  (e − t )( cos πt ) dt 1 +  1 = ( 1  4x   − = 1 dx + 1 cos 4 x dx ∫ du = dx v = ∫π2  + e cos  dx  2 2  π  2 ∫π 2 2∫  sen e − t . cos πt 1 .π1t  ( cos x+ v=1 4 x).( 4) dx e − t  − ∫  2  2π 4 π2 − t )( cos πt ) dt = ∫ (e 4 x = x + sen 4 x 1 v = 1 x + 1 sen 2 8 1 + 2  2 8 u =x

[

]

]

( )



π 

4xt . -cosπxt + sen4πxsen ∫x.cos 2 2x dx =ex−t.xsen+ πsen πt  t e−  ∫ 2 e − t 8  .−dx − −8   2π  2    π2  π −t 2 ( e )( cos π t ) dt = = x sen 4 x - 1 x. dx − 1 sen 4 x. dx = ∫= x + ∫ ∫  π2 + 1 2  π2 + 18 2 8 2 2  π2 = x 2 + x sen 4 x - 1 . x -π 1 . 1 ∫ sen 4 x . ( 4)dx e − t 2(πsen 2 πt)8 4 2 8 + c. 22 ∫ (e − t )(2 cosx πt ) dt = sen 4 x π + x = x + - 11 [ - cos 4 x ] = 4 32 2 2 x 8 25 . ∫ x. sec dx . 2 2 = x −2 x + x sen 4 x + cos 4x = 4 32 x 2 8 x u=x dv2 = sec 2 dx ; ∫ dv = 2 ∫ sec22 .(1 2) dx . 2 2 2 = 2 x − x + x sen 4 x + cos 4 x = x + x sen 4 x + cos 4 x + c . x 4 4 32 32 8 du =4 dx v = 2 tg8 2 2 27 . ∫x cos x dx x   x  ( xu)=2 xtg2 x  − 2∫  tgdvx = (1 2 ) dx = x tg ; − 2dv ( 2)=∫  tg  dx cos=x2dx cos dx 2 2 2 ∫     ∫ 2  du =x2 x dx vx = sen x 2 x tg − 4 ln sec + c . = x 2 2sen x - ∫ (sen2x)( 2 x ) dx = x 2 sen x - 2∫ x .sen x dx = integrando por partes la integral : ∫ x .sen x dx = u = x ; du = dx ; dv = sen x dx ;

∫x ∫x ∫x

2 2 2

∫ dv = ∫ sen x dx

cos x dx = x 2 sen x - 2 ∫ x .sen x dx =

[

cos x dx = x 2 sen x - 2 ( x )( - cos x) - ∫ (- cos x) dx cos x dx = x 2 sen x + 2x cos x - 2 ∫cos x dx

; v = - cos x.

]

∫x cos x dx = x ∫ arc sen mx dx. 2

28 .

2

sen x + 2 x cos x - 2sen x + c .

u = arc sen mx m du = 1- m2x 2

dv = dx v=x

mx dx 1- m2 x 2 -1 2 x arc sen mx -  - 1 ∫ (1 - m 2 x 2 ) .(- 2m) mx.dx  2m   (1 - m 2 x 2 ) 1 2  x arc sen mx +  1     2m   12  x arc sen mx - ∫

x arc sen mx + 2 1 - m 2 x 2 = x arc sen mx + 1 - m 2 x 2 + c . 2m m 29. ∫ arc cot x dx 2

u = arc cot du =

dv = dx .

x 2

-1

2

=

-2 x2 + 4

v =x. 1+ x 4 x arc cot x - ∫ - 2x . dx = x arc cot x +∫ (2x) dx = x arc cot x2 + 4 2 x2 + 4 2 2 ( ) x + c . x arc cot + ln x + 4 2

x 2

+ ln

2

30 .

∫ arc cos 1x dx . u = arc cos 1 . x

dv = dx ; v = x .

- 1 - 1 - 12 - 1 2 2 x x 1 = = = x = x2 = du = 2 2 x -1 1- 1 x 2 -1 x 2 -1 x x 2 -1 1 - 1x x2 x2 x x2 - 12 x

()

  dx .   1 x arc cos 1 - ∫ (x) = x arc cos 1 + ∫  1  dx  x x  x x 2 -1   x 2 -1  x arc cos 1 + ln x + x 2 - 1 + c . x 31. ∫ arc sec 1 dy y u = arc sec 1 . dv = dy ; v = y y

[

du =

- 12 y 1 y

1 -1 y2

]

=

-1 y 1- y y2

-y

y arc sec 1 - ∫ y

1- y

2

2

=

-1 y 1- y y

2

=

2

-1 y 1- y y

2

=-

1 1- y2

[

2 −1 2 +1    (1 - y 2 )1 2  1 1 y arc sec 1 - 1  (1 - y ) y arc sec =   y 2  −1 2 +1  y 2 1 2  y arc sec 1 - 2 (1 - y 2 )1 2 = y arc sec 1 - 1 - y 2 + c . y 2 y 32. ∫ arc csc nt dt

[

]

dv = dt .

u = arc csc nt

-n . dt v =t. 2 2 nt n t - 1 . dt t arc csc nt dt -n t arc csc nt - ∫ (t)  = +∫   (nt) 2 - 12  n t n 2 t 2 - 1

du =

[

]

. dy = y arc sec 1 - 1 ∫ (1 - y 2 ) −1 2 .( -2)y dy = y 2

]

t arc csc nt + ln n t n 2 t 2 - 1 + c. x dx 33. ∫ arc sen 2 u = arc sen x dv = dx 2 1 du = v =x 2 x 2-x

x arc sen x arc sen x arc sen

 x - (x)  1   dx = ∫ 2 2 x 2 - x   x -1  x   dx = 2 2 ∫  x ( 2 - x)   

∫ 



 x  dx = 2x - x 2 

u =x

∫ dv = ∫

x -1 2 2

du = dx x arc sen x arc sen x arc sen

[

1 1 =∫ = 2 2 2x - x 1 - (x - 1) 2 v = arc sen (x - 1)

]

x - 1 x arc sen (x - 1) - arc sen (x - 1) dx ∫ 2 2 x - x arc sen (x - 1) + 1 ( x −1) arcsen( x −1) + 1 - (x - 1) 2 2 2 2

[

x x arc sen (x - 1) + ( x −1) arcsen( x -1) + 1 - (x - 1) 2 2 2 2 2

Factorizan do : arcsen( x -1) . 2

x arc sen

x -  arcsen( x -1)  [ x - (x - 1) ] + 1 - (x - 1) 2  2  2 2  

x arc sen

x -  arcsen( x -1)  [ x - x + 1) ] + 1 - (x - 1) 2  2  2 2  

x arc sen

x -  arcsen( x -1)  [1] + 1 - (x - 1) 2  2  2 2  

x arc sen x arc sen x arc sen

x - arcsen( x -1) + 1 - (x - 1) 2 2 2 2 x -  1  arcsen( x -1) 2 - 1 - (x - 1) 2  2   2 x - arcsen( x -1) - 1 - (x - 1) + c . 2 2

[

]

]

∫x

34 .

3

arc sen x dx .

u =x 3 du =3x

dv =arc sen x 2

dx

v

3

3

3

4

= x arc sen x + ∫ 1 - x 2

∫x arc senx dx =x [x arc sen x + ∫x arc senx dx = x arc senx +x ∫x arc senx dx = x arc senx +x 4 ∫x a rc sen x dx = x arc sen x +x ∫

3

2

4

3

3

4

3

3

4

3

∫(3x 2 )(x arc sen x + 1 - x 2 )] 1 - x - 3∫x arcsen x dx - 3∫x 1 - x dx 1 - x - 3∫x arcsen x dx - 3∫x (1 - x ) 1 - x 2 - 3(- 1 )∫x . (1 - x ) (-2)x dx . 2

1- x2 -

4 x a rc sen x dx = x arc sen x +x 3

2

3

2

2

3

1 - x 2 +3 2

∫x . (1 - x

4

)

(1 - x )

1 2 +1

(

. (- 2)x dx .

1 2 +1

2

2 1- x2

2 x (1 - x 2)3 2 1 - x 2 +3  3 2  

(-2)x dx . 1 2

v= 3

2 1 2

; ∫ dv = ∫ (1 - x 2 )

du = dx ; v =

∫

2 1 2

2 1 2

u =x

4 x a rc sen x dx = x arc sen x +x 3

2

)

3 2

3

 -  

.dx