ejercicios-resueltos-ecuaciones-diferenciales

E

j

e

r

c

i

c

i

o

s

r

e

s

u

e

l

t

H

o

u

s

g

d

o

L

1

1

E

1

1

.

c

1

u

E

a

c

c

u

i

a

o

c

i

n

o

e

n

s

e

d

s

l

i

i

f

n

e

e

r

a

o

r

i

y

r

i

a

r

u

a

b

c

s

c

b

A

n

e

e

m

3

e

l

e

e

d

l

l

a

o

2

e

i

F

0

1

c

i

o

r

e

b

n

e

e

s

s

p

l

e

r

s

i

m

a

e

e

s

dy + 2y 2y = 0 dx e

f

i

n

i

m

o

s

e

l

f

a

c

p( p(x) = 2 f

a

c

t

m

o

u

l

r

t

i

i

p

n

l

t

i

e

c

g

a

r

a

m

n

o

t

s

e

l

:

o

´

2dx

e

a

t

e

c

r

i

n

t

a

c

i

g

r

a

n

t

e

.

e2x

=

u

e

o

n

p

o

r

e

l

f

a

c

t

o

r

i

n

t

e

g

r

a

n

e2x ddxy + 2e 2e2x = 0 e

l

l

a

d

o

i

z

q

d 2x dx [e y ] s

e

p

a

r

a

m

u

i

e

r

d

o

d

e

l

a

e

c

u

a

c

i

o

n

s

e

r

e

d

u

c

e

a

s

v

a

r

i

a

b

l

e

s

e

i

n

t

e

g

´

r

a

m

o

s

.

d 2x dx [e y ]

=0

´

dx + c

y = ce−2x .

dy = 3y 3y dx f

o

r

m

a

l

i

n

e

a

l

.

dy dx

− 3y = 0 p( p(x) = −3

´

F

m

a

c

u

t

l

o

t

r

i

p

i

l

n

i

t

c

e2x y = c

2

:

=0 o

e

a

g

m

r

o

a

n

s

t

p

e

o

:

r

e −3dx e−3x

=

f

a

c

t

o

r

i

n

t

e

g

r

a

n

t

e

.

1

i

f

e

r

e

n

c

i

a

.

D

d

d

u

o

l

1

s

d

c

t

e

.

t

r

a

o

s

.

r

d

e

n

l

e

s

e−3x ddxy

− 3e−3xy = 0

´ dy −3x ´ [ e y = 0 dx + c dx e−3x y = c y = ce3x 3

.

3 p

a

s

a

m

o

s

l

a

e

c

u

a

c

i

o

n

a

l

a

f

o

r

m

dy + 12y 12y = 4 dx a

l

dy dx

i

n

e

a

l

.

+ 4y 4y =

4 3

p( p(x) = 4 ´

F

a

c

t

o

r

i

n

t

e

g

r

a

n

t

e

:

e

4dx

e4x

=

e4x ddxy + 4e 4e4x y = 43 e4x

´

d 4x dx [e y ]

=

´

e4x dx + c

e4x y = 14 e4x + c y= 4

1 4

+ ce−4x

.

y = 2y 2 y + x2 + 5



f

o

r

m

a

l

i

n

e

a

l

y

 − 2y = x2 + 5

´

F

a

c

t

o

r

i

n

t

e

g

r

a

n

t

e

:

e −2dx = e−2x e−2x y

´

5e−2x  − 2e−2xy = e−2xx2 + 5e

d 2x y] dx [e

−

=

´ −2x 2 ´ e x + 5 e−2x + c

(2x2 + 2x 2x + 1) + C − 52 e−2x − 14 e−2x(2x y = − x2 − x2 − 14 + 52 + ce2x

e−2x y =

2

5

.

ydx

4(x + y 6 )dy )dy = 0 − 4(x

ydx = 4(x 4( x + y6 )dy )dy dx dy

=

4(x+y6 ) y

dx dy

;

2

=

4x y

+

4y6 y

e−3x ddxy

− 3e−3xy = 0

´ dy −3x ´ [ e y = 0 dx + c dx e−3x y = c y = ce3x 3

.

3 p

a

s

a

m

o

s

l

a

e

c

u

a

c

i

o

n

a

l

a

f

o

r

m

dy + 12y 12y = 4 dx a

l

dy dx

i

n

e

a

l

.

+ 4y 4y =

4 3

p( p(x) = 4 ´

F

a

c

t

o

r

i

n

t

e

g

r

a

n

t

e

:

e

4dx

e4x

=

e4x ddxy + 4e 4e4x y = 43 e4x

´

d 4x dx [e y ]

=

´

e4x dx + c

e4x y = 14 e4x + c y= 4

1 4

+ ce−4x

.

y = 2y 2 y + x2 + 5



f

o

r

m

a

l

i

n

e

a

l

y

 − 2y = x2 + 5

´

F

a

c

t

o

r

i

n

t

e

g

r

a

n

t

e

:

e −2dx = e−2x e−2x y

´

5e−2x  − 2e−2xy = e−2xx2 + 5e

d 2x y] dx [e

−

=

´ −2x 2 ´ e x + 5 e−2x + c

(2x2 + 2x 2x + 1) + C − 52 e−2x − 14 e−2x(2x y = − x2 − x2 − 14 + 52 + ce2x

e−2x y =

2

5

.

ydx

4(x + y 6 )dy )dy = 0 − 4(x

ydx = 4(x 4( x + y6 )dy )dy dx dy

=

4(x+y6 ) y

dx dy

;

2

=

4x y

+

4y6 y

d

e



n

i

m

o

s

l

a

f

o

r

m

a

l

i

n

e

a

l

.

dx dy

F

a

c

t

o

r

i

n

t

e

g

r

a

n

t

e

:

´

e−4

1 y dy

− 4yx = 4y5 4

log(y) e−4 log( elog(y )

−

;

;

1 dx y4 dy

y −4 =

− y1 4yx = y1 4y5 4

4

d 1 dy [ y 4 x] d 1 dy [ y4 x]

´

;

1 y4 x

= 4y

´

=4

ydy

= 2y2 + C

x = 2y6 + cy4 6

.

xy + y = ex



ex x

y + x1 y =



F

a

c

t

o

r

i

n

t

e

g

r

a

n

t

e

:

´

e

1 x dx

= elog x = x xex x

xy + xx y =



d xy] dx [xy] I

n

t

e

g

r

a

m

o

s

:

= ex

´

d xy] dx [xy]

=

ex dx + c

´

xy = ex + c y = ex x−1 + cx−1 7

.

x dy dx h

a

c

e

m

o

s

l

a

s

u

s

t

i

t

u

c

i

o

n

:

dy 2 +y = 2 dx y

+

y x

u = y 1−n

d

2 xy2

= o

n

d

e

.

.

.

(

1

n=

)

−2

u = y1−(−2) = y 3 u1/3 = y ;

D

e

r

i

v

a

m

o

s

e

s

t

a

u

l

t

i

m

a

.

1 2/3 du 3u dx

−

3

=

dy dx

1 y4

S

u

s

t

i

t

u

i

m

o

s

e

n

l

a

e

c

u

a

c

i

o

n

d

i

f

e

r

e

n

1 2/3 du 3u dx

−

A

c

o

m

o

d

a

m

o

s

a

l

a

f

o

r

m

a

l

i

n

e

a

l

,

s

t

a

e

s

u

n

a

e

c

u

a

c

i

o

n

l

i

n

u

l

t

i

p

l

i

c

a

m

o

s

p

o

r

f

a

c

t

a

o

l

.

D

m

r

i

n

e

a

l

1

.

u1/3 x

u

l

t

i

p

l

i

c

a

n

i

m

o

s

e

n

d

o

t

o

d

a

l

a

e

c

u

a

l

f

a

c

t

o

r

i

n

t

e

g

r

a

n

t

= e3log x = elog x = x3

t

e

g

r

a

n

t

e

.

x3 du 3x3 ux = x3 x6 dx + 3x d 3 dx [x u] i

n

t

e

g

r

a

m

o

s

.

= 6x2

d 3 dx [x u]

´

´

=6

x2 + c

x3 u = 2x3 + c u = 2 + cx−3 S

u

s

t

i

t

u

i

m

o

s

u = y3

y 3 = 2 + cx−3 8

dy y 1/2 dx + y 3/2 = 1

.

;

dy dx

y 3/2 y 1/2

+

u = y 1−n n =

n

d

i

c

i

o

n

y (0) = 4

u = y 1−(−1/2) = y 3/2

−1/2

;

o

dy + y = y −1/2 ↔ dx

1 y 1 /2

=

c

;

u2/3 = y 2 1/3 du dx 3u

−

S

u

s

t

i

t

u

i

m

o

s

.

+ u2/3 = (u ( u2/3 )−1/2

−

u

l

t

i

p

l

i

c

a

m

o

s

l

a

e

c

u

a

c

i

o

n

p

o

r

2 1/3 3u

+ 32 u =

du dx L

F

a

a

e

c

c

t

o

u

a

r

c

i

n

i

o

t

n

e

s

g

dy dx

2 1/3 du dx 3u M

=

r

e

a

r

n

e

t

d

e

u

:

j

e

o

3 2

a

´

u

dx

n

a

l

=e

i

n

e

a

l

.

3 2x

4

c

i

o

6 x

+ 3 ux =



2(u1/3 )2 x

=

3

1 x dx

´

e3 M

e

i

+

du dx E

c

3 2

e

.

n

p

o

r

1 2/3 3u

.

3

3

3

3 3 2x u = e2x e 2 x du dx + e 2 2 3 d 2 x u] dx [e 3 d 2 x u] dx [e

´

3

= 32 e 2 x 3 2x

´ 3

=

2e

3

dx + c

3

e 2 xu = e 2 x + c 3

u = 1 + ce− 2 x S

u

s

t

i

t

u

i

m

o

s

u = y3/2

3

y 3/2 = 1 + ce− 2 x A

h

o

r

a

a

p

l

i

c

a

m

o

s

l

a

s

c

o

n

d

i

c

i

o

n

e

s

i

n

S

o

l

u

c

i

o

n

g

e

n

e

r

a

l

.



i

c

i

a

l

e

s

.

y (0) = 4

3 = 1 + ce− 2 0

43/2

8 1=c c=7

−

S

u

s

t

u

t

u

i

m

o

s

e

l

v

a

l

o

r

d

e

c

e

n

l

a

e

c

u

a

c

i

o

n

g

e

n

e

r

a

l

.

3

y 3/2 = 1 + 7e 7e− 2 x 9

.

y +



u = y 1−n e

n

t

o

n

c

e

s

;

d

:

o

n

d

e

S

o

l

u

c

i

o

n

p

a

r

t

i

c



2 y= x

−2xy2

n =2

1 2

u = y − u = y −1 u−1 = y ;

;

−u−2 ddux = ddxy s

u

s

t

i

t

u

i

m

o

s

e

n

l

a

e

c

u

a

c

i

o

n

.

−u−2 ddux + x2 u−1 = −2x(u−1)2 m

u

l

t

i

p

l

i

c

a

m

o

s

p

o

r

−u2

du dx e

s

o

t

b

a

t

e

e

s

n

u

e

m

n

a

o

e

s

c

e

l

u

f

a

a

c

c

i

t

o

o

n

r

l

i

n

i

n

t

e

e

a

g

l

r

c

a

e−2

o

n

n

t

´

e

.

2x − x2 u = 2x p( p(x) = − x2

1 x dx

x−2 ddux

= elog x

−

n

t

e

g

r

a

m

o

s

.

= x−2

− x−2 x2 u = x−22x

d 2 dx [x u] i

2

−

5

= 2x−1

u

l

a

r

.

d 2 dx [x u]

−

´

=

´

2x−1 dx + c

x−2 u = 2 log x + c u = 2x2 log x + cx2 s

u

s

y

t

l

i

t

a

u

s

i

o

m

l

o

u

c

s

i

u = y−1

ó

n

e

s

e

n

t

o

n

c

e

s

:

1 2x2 log x+cx2

y= 1

0

,

y + xy = xy −1/2



s

e

a

.

n=

−1/2 u = y 1−n u = y 1−(−1/2) u = y 3/2 y = u2/3 ;

;

dy dx s

u

s

t

i

t

u

i

m

o

s

e

n

l

a

e

c

u

a

c

i

o

n

.

+ xu2/3 = x(u2/3 )−1/2

−

u

l

t

i

p

l

i

c

a

du dx F

a

c

t

o

r

i

n

m

o

s

p

o

r

2 1/3 3u

+ 32 xu = 32 x t

e

g

r

a

n

t

e

:

= 23 u−1/3

2 1/3 3u

m

;

q

u

e

e

s

u

n

a

e

c

u

a

c

i

o

n

l

3

3

e4x

´

2

du dx

´

xdx 3

2

+ e4x

3

3 2 xu

t

u

i

m

o

s

l

3 2x

= 32 xe 4 x dx + c

2

d 34 x2 u dx e

=

3

3 2

2

´ 3

2

3

xe 4 x dx + c 2

3

i

2

= e4x

2

u = 1 + ce− 4 x t

a

2

3

d 34 x2 u dx e

3

s

e

= e4x

e4x u = e4x + c

u

n

e2

s

i



u = y3/2 3

y 3/2 = 1 + ce− 4 x

6

2

c

o

n

p(x) = 32 x

1

.

2

E

c

u

a

c

i

o

n

e

s

e

x

a

c

t

a

s

1.(2x M (x, y) = 2x C

o

∂M ∂y

m

p

r

o

b

a

m

y

r

n

A

u

c

i

b

i

h

n

o

t

o

s

q

u

e

l

a

e

c

u

a

c

g

u

r

a

a

l

t

e

s

o

,

m

p

a

o

r

m

l

o

o

s

t

u

a

n

n

a

t

f

o

u

l

i

n

a

o

c

e

i

o

n

c

n

e

g

r

a

m

o

s

r

e

s

p

e

c

t

o

a

x

,

y

l

´ ∂M

s

e

a

e

x

=0

u

a

c

i

o

a

c

t

a

,

∂N ∂x

;

n

a

c

o

n

s

t

e

´

a

s

t

a

f

u

n

c

i

o

n

l

a

d

e

r

i

v

a

m

o

s

c

o

n

r

e

g

e

a

s

t

e

x

a

c

t

a

s

.

o

e

s

s

i

s

e

c

u

m

p

l

e

e

x

a

u

a

l

a

m

o

s

c

o

n

N

(

x

,

y

)

c

t

a

.

n

t

e

t

e

s

d

e

i

n

t

e

e

r

a

c

i

o

n

s

e

r

a

u

n

a

− ´ dx + g(y) .

p

g

c

t

o

d

e

y

.

.

.

(

1

)

= g (y)

g

r

a

m

o

s

r

e

s

p

e

c

t

o

a

y

g(y) = 32 y2 + y + c u

s

t

i

t

u

i

m

o

s

l

a

f

u

n

c

i

o

n

e

n

(

1

)

.

s

2

.

t

a

e

s

u

n

a

s

o

l

u

c

i

o

n

e

n

f

o

r

m

− x + 32 y2 + y = c

x2 e

c

o

n

d

i

c

i

o

n

−1

´  ´ ´ g (y) = 3 ydy + dy + c

s

a

g  (y) = 3y + 1 i

l

=0

− x + g(y)

∂f ∂y

i

n

xdx

f (x, y) = x2 s

s

f x (x, y) = M (x, y)

=2

∂x

E

e

− 1; N (x, y) = 3y + 1

f x (x, y) = 2x i

l

− 1)dx + (3y + 1)dy = 0

∂M ∂y o

d

∂N ∂x

=

s

e

a

i

m

p

l

i

c

i

(seny

t

a

d

e

l

a

e

c

u

a

c

i

o

n

.

− ysenx)dx + (cosx + xcosy − y)dy = 0 M (x, y) = seny − ysenx N (x, y) = cosx + xcosy − y ∂M − senx ∂y = cosy ∂N ∂x = −senx + cosy ;

7

f

u

n

c

i

o

n

g(y)

∂M ∂y t

i

o

m

n

a

t

∂N ∂x

=

e

m

g

o

r

a

s

p

r

l

o

t

a

n

t

o

e

s

u

f x (x, y) = seny

m

o

o

s

c

o

n

r

e

s

p

e

c

´

t

o

n

a

e

c

u

e

r

i

v

a

m

o

s

e

s

t

a

e

c

u

a

c

i

o

n

e

x

a

x

´

i

o

n

t

a

.

f x (x, y)dx = (seny

c

c

− ysenx

a

f (x, y) = xseny d

a

r

e

s

p

e

c

t

− ysenx)dx

− y(−cosx) + g(y)... (

o

a

y

,

e

i

g

u

a

l

a

m

o

s

c

o

1

)

n

N

(

x

,

f y (x, y) = cosx + xcosy + g  (y) = cosx + xcosy g  (y) = i

n

t

e

g

r

a

m

o

s

r

e

s

p

e

c

t

o

d

e

y

y

)

−y

−y

´  ´ g (y) = − ydy + c

− 12 y2 + c

g(y) = s

u

s

t

i

t

u

i

m

o

s

e

n

(

1

)

f (x, y) = xseny + ycosx n

o

s

q

u

e

d

a

l

a

s

o

l

u

c

i

o

n

i

m

p

l

i

c

i

t

a

.

− 12 y2 = c

xseny + ycosx 3

− 12 y2

.

(3x2 y + ey )dx =

−(x3 + xey − 2y)dy

M (x, y) = 3x2 y + ey N (x, y) = x3 + xey

− 2y

;

M y (x, y) = 3x2 + ey N x (x, y) = 3x2 + ey M y (x, y) = N x (x, y) f x (x, y) I

c

o

n

s

n

t

t

e

a

g

n

r

t

a

m

e

d

o

s

e

i

e

n

t

e

g

r

a

c

i

o

n

c

n

t

o

.

o

n

n

c

r

e

e

s

s

e

p

s

e

c

u

t

n

o

a

e

d

e

c

u

x

a

,

c

i

o

y

n

o

d

b

t

i

e

f

n

e

r

e

e

n

m

c

o

i

s

a

l

u

e

n

x

a

f (x, y) = (3x2 y + ey )dx

´

f (x, y) = x3 y + xey + g(y) .

D

e

r

i

v

a

m

o

s

c

o

n

r

e

s

p

e

c

t

o

d

e

y

(

1

)

e

i

g

u

a

l

a

m

o

s

c

.

o

.

(

n

1

N

)

(

x

f y (x, y) = x3 + xey + g  (y) = x3 + xey g (y) =



8

−2y

,

y

)

− 2y

a

f

c

u

t

n

a

.

c

i

o

n

g(y)

d

e

I

n

t

e

g

r

a

m

o

s

r

e

s

p

e

c

t

o

d

e

y

−2 ´ ydy + c g(y) = −y 2 + c

g(y) =

s

u

s

t

i

t

u

i

m

o

s

e

n

(

1

)

x3 y + xey 4

− y2 = c

.

.

.

s

o

l

u

c

i

o

n

i

m

p

l

i

c

i

t

a

.

.

− 2y2)dx + (3x2 − 4xy)dy = 0 M y (x, y) = 6x − 4y N x (x, y) = 6x − 4y (6xy

,

l

a

i

n

e

c

t

u

e

a

g

r

c

a

i

o

n

m

e

o

s

s

e

x

a

c

t

a

.

f x (x, y)

r

e

s

p

e

c

t

o

a

x

.

´

f (x, y) = (6xy f (x, y) = 3x2 y d

e

r

i

v

a

m

o

s

r

e

s

p

c

t

o

d

e

y

− 2xy2 + g(y) .

g

u

a

l

a

m

o

s

c

o

n

N

(

x

,

y

3x2 i

n

t

e

g

r

a

m

o

s

r

e

s

p

e

c

t

)

.

(

1

)

− 4xy + g(y)

− 4xy + g(y) = 3x2 − 4xy o

.

f y (x, y) = 3x2 i

− 2y2)dx

d

e

y



g (y) = 0



g(y) = c s

u

t

i

t

u

i

m

o

s

e

n

l

a

e

c

u

a

c

i

o

n

(

1

)

3x2 y 5

− 2xy2 = c

.

− 2xy3 + 4x + 6)dx + (2x − 3x2y2 − 1)dy = 0 y(−1) = 0 M y = 2 − 6xy 2 = N X

(2y c

o

n

l

U

i

a

c

n

n

o

n

a

t

e

d

v

g

r

i

e

a

z

m

c

i

c

o

o

o

n

m

s

p

r

o

b

a

d

f x (x, y)

a

q

r

e

u

s

p

e

e

s

c

e

t

a

o

e

a

´

x

x

a

f (x, y) = (2y f (x, y) = 2xy

c

t

a

.

− 2xy3 + 4x + 6)dx

− 3x2y3 + 2x2 + 6x + g(y) .

9

.

.

(

1

)

d

e

r

i

v

a

m

o

s

r

e

s

p

e

c

t

o

a

y

:

− 3x2y2 + g(y)

f x (x, y) = 2x i

g

u

a

l

a

m

o

c

o

n

N (x, y)

− 3x2y2 + g(y) = 2x − 3x2y2 − 1 g(y) = −1

2x i

n

t

e

g

r

a

m

o

s

:



g(y) = s

u

s

t

i

t

u

i

m

o

s

e

n

(

1

)

− x2y3 + 2x2 + 6x − y = c y(−1) = 0 2(−1)2 + 6(−1) = c c = −4

2xy

.

p

e

n

t

o

n

c

e

s

l

a

s

o

l

u

c

i

o

n

p

a

r

t

i

c

u

l

a

a

r

a

r

.

.

s

o

l

u

c

i

o

n

i

m

p

l

i

c

i

t

a

.

a

l

c

a

s

o

y

(

-

1

)

=

0

e

s

:

− x2y3 + 2x2 + 6x − y = −4

2xy 6

−y + c

.

( xy sin x + 2y cos x)dx + 2x cos xdy = 0;

−

U

s

e

e

l

f

a

c

t

o

r

i

n

t

e

g

r

a

n

t

e

µ(x, y) = xy

M y (x, y) =

−x sin x + 2 cos x N x (x, y) = −2x sin x + 2 cos x  M y N X = l

l

o

t

a

e

a

n

t

c

u

o

a

c

p

r

i

o

o

n

c

e

e

d

s

e

n

o

m

e

o

s

x

a

a

c

t

m

u

a

l

,

t

e

i

n

p

l

e

i

c

s

a

t

e

r

e

t

j

o

d

e

m

p

a

l

l

o

a

e

s

c

e

u

n

a

o

c

i

s

o

d

n

i

p

o

e

o

l

r

f

e

a

l

c

f

t

a

c

o

r

t

o

i

n

r

i

t

n

e

g

t

r

e

a

g

r

n

t

a

n

e

t

,

e

p

o

.

r

xy( xy sin x + 2y cos x)dx + xy(2x cos x)dy = 0

−

( x2 y2 sin x + 2xy 2 cos x)dx + (2x2 y cos x)dy = 0

−

c

o

m

p

r

o

b

a

m

o

s

q

u

e

e

s

t

a

e

c

u

a

c

i

o

n

s

e

a

e

x

a

c

t

a

.

−2yx2 sin x + 4xy cos x N X (x, y) = 4xy cos x − 2x2 y sin x

M y (x, y) =

M Y = N X

p

o

r

l

o

t

a

n

t

o

e

s

t

a

e

c

u

a

c

i

o

n

1

e

0

s

e

x

a

c

t

a

y

l

a

r

e

s

o

l

v

e

m

o

s

c

o

m

o

t

a

l

.

f x (x, y) = i

n

t

e

g

r

a

m

o

s

r

e

s

p

e

c

t

o

a

x

:

−x2y2 sin x + 2xy2 cos x

f (x, y) = ( x2 y 2 sin x + 2xy 2 cos x)dx

´

−

f (x, y) = x2 y 2 cos x + g(y) .

d

e

r

i

v

a

m

o

s

r

e

s

p

e

c

t

o

a

y

:

.

.

(

1

)

f y (x, y) = 2x2 y cos x + g (y)



i

g

u

a

l

a

m

o

s

c

o

n

N x

2x2 y cos x + g (y) = 2x2 y cos x



g (y) = 0



i

n

t

e

g

r

a

m

o

s

r

e

s

p

e

c

t

o

a

y

:

g(y) = c s

u

s

t

i

t

u

i

m

o

s

e

n

(

1

)

f (x, y) = x2 y 2 cos x + c

2

2

E

.

c

1

u

E

c

a

1

.

a

c

u

i

a

p

r

c

i

o

n

i

o

m

e

n

e

s

e

d

s

r

e

d

o

r

i

d

f

e

o

e

r

r

n

e

.

d

n

e

c

n

i

a

s

l

e

u

s

p

d

e

e

r

o

r

y = 2x2



I

n

t

´

e

g

r

a

m

o

s

´

y =2



a

m

b

o

s

l

a

d

o

s

d

e

l

a

e

c

u

a

c

x2 dx + c

y = 23 x3 + c1



V

o

´

l

v

e

m

o

s

2 3

y =



a

i

n

t

e

g

r

a

r

:

(x3 + c1 )dx + c2

´

y = ( 23 )( 14 )x4 + xc1 + c2 S

o

l

u

c

i

o

n

:

y = 16 x4 + c1 x + c2 1

1

i

o

n

:

i

d

o

r

e

n

s

u

p

e

r

i

o

r

r

e

d

u

c

i

b

l

e

s

2

I

n

t

´

y

.

e

g

r

a

 = sen(kx)

m

o

s

a

m

b

o

s

l

a

d

o

s

d

e

l

a

e

c

u

a

c

i

o

n

:

´

y

 = sen(kx)dx + c1 y = −kcos(kx) + c1 ´ ´ ´ y = −k cos(kx)dx + c1 dx + c2 y = −k 2 sen(kx) + xc1 + c2 ´ ´ ´ ´ y = −k 2 sen(kx)dx + c1 xdx + c2 dx + c3 y = k 3 cos(kx) + 12 c1 x2 + c2 x + c3 3

I

y

.

n

t

´

e

y

 = x1 g

r

a

n

d

o

:

´ 1

 =

x dx

+ c1

y = log x + c1



´

´

y =



log xdx + c1

´

dx + c2

y = x log x

− x + c1x´ + c2 ´ ´ y = x log xdx − xdx + c1 xdx + c2 dx + c3 y = x2 (log x − 12 ) − 12 x2 + c1 12 x2 + c2 x + c3 y  = x + sin x 

´

´

2

4

I

.

n

t

e

g

r

a

n

d

´

y =

y

= 12 x2 y = 12 = 16 x3



´ y 5



e

´

:

´

xdx +

sin xdx + c1

− cos x +´ c1 ´ x2 dx − cos xdx + c1 dx + c2  − sin x + c1x + c2 y  = x sin x, y(0) = 0 y (0) = 0 y (0) = 2

.

R

o

´

s

y

o

l

v

e

´

m

 =

o

´

s

l

a

e

c

u

a

c

i

o

n

d

i

f

e

r

e

n

c

i

a

l

i

n

t

e

g

r

a

n

d

o

t

r

e

s

v

e

c

e

s

:

x sin xdx + c!

y = sin x

− x cos x´ + c1 ´ y = sin xdx − x cos xdx + c1 dx + c2 y = − cos x − (cos x + x sin x) + c1 x + c2 ´ ´ ´ ´ ´ ´ y = − cos xdx − cos xdx − x sin xdx + c1 xdx + c2 dx + c3 y = − sin x − sin x − (−x cos x + sin x) + 12 c1 x2 + c2 x + c3 y = −3sin x + x cos x + 12 c1 x2 + c2 x + c3 

´

´

1

2

2

.

2

R

1

e

d

u

c

i

b

l

e

s

a

p

r

i

m

e

r

o

r

d

e

n

xy + y = 0



.

D

e



n

i



e

n

d

o

dy dx

p(x) =

:

dp dx



d2 y dx2

=

xp + p = 0



n

o

s

q

u

s

e

1 x dx

e

p

d

a

a

r

u

a

b

n

l

a

e

s

e

.

c

u

a

c

i

o

n

l

i

n

e

a

l

h

o

m

o

g

e

n

e

a

d

e

o

r

d

e

n

1

d

e

v

a

r

i

a

b

l

e

s

− p1 d p ´ 1 ´ 1 dx = − x p d p + c1 log x = − log p + log c1 =

log x = log( c p1 ) A

p

l

i

c

a

a

c

d

o

e

x

p

o

n

e

n

c

i

a

l

a

a

m

b

o

s

l

a

d

o

s

d

e

l

a

e

c

u

a

c

i

o

n

.

c1 p

x= h

n

e

m

o

dy dx

p(x) =

s

c! dy/dx

x=

x = c1 dx dy i

n

t

e

g

r

a

n

d

o

´ 1

:

1 c1

x dx =

´

1 c1 y

log x =

dy + c2

+ c2

y = c1 log x + c2 v

2

a

(x

.

D

e



l

o

r

D

i

o

s

i

t

i

v

o

− 1)y − y n

i

m

o

s

:

dy dx

p(x) = (x

p

.

L

.

=

i

d

i

m

o

o

n

s

t

a

n

t

e

d

e

i

n

t

e

g

r

a

c

dp dx



d2 y dx2

=

s

e

n

t

r

e

(x

x 1 x 1 p

 − x−1 1 p = 0

− −

c

0

− 1) p − p = 0 v

a

− 1)

 − x−1 1 p = 0

p n

o

s

q

dp dx

u

e

d

a

u

n

a

e

c

u

a

c

i

o

n

l

i

n

e

a

l

h

o

m

o

− x−1 1 p = 0

dp 1 dx = x 1 p 1 1 p dp = x 1 dx

− −

i

n

t

e

´ 1

g

r

p dp

a

n

d

=

o

´

:

1 x 1 dx

−

+ c1

1

3

g

e

n

e

a

.

i

o

n

c

o

n

v

i

e

n

e

q

u

e

t

o

m

e

log( p) = log(x

− 1) + log(c1) log( p) = log[c1 (x − 1)] p = c1 (x − 1) h

a

c

i

dy dx

e

n

d

o

dy dx

p =

− 1) dy = c1 (x − 1)dx i

n

= c1 (x

t

´

e

g

r

a

n

d

o

:

´

dy = c1 (x

y = c1 12 x2 3

2

.

− 1)dx + c2

− x + c2

.

3

E

1

c

u

a

c

i

y +y



.

R

e

s

o

l

v

e

o

n

e

s

l

i

n

e

a

l

e

s

h

o

m

o

g

e

n

e

a

s

.

 − 2y = 0

m

o

s

l

a

e

c

u

a

c

i

o

n

c

a

r

a

c

t

e

r

i

s

t

i

c

a

a

s

o

c

i

a

d

a

.

m2 + m

−2= 0 (m + 2)(m − 1) = 0 m1 = −2 m2 = 1 S

u

p

o

n

e

m

o

s

u

n

a

s

o

l

u

c

i

o

n

y = emx

y1 = e−2x y2 = ex y(x) = c1 e−2x + c2 ex 2

.

y E

c

u

a

(m

c

i

o

n

c

2

− 1)

a

r

a

c

t

e

r

i

s

t

i

c

=0

a

a

s

o

i

a

 − 2y + y = 0 m2 − 2m + 1 = 0 d

a

m1,2 = 1 s

o

l

u

c

i

o

n

y = emx

y1 = ex y2 = y1

´ e´ p(y)dy

y2 = ex

´ e2x

y12

dx

e2x dx

y2 = ex x s

o

l

u

c

i

o

n

.

y(x) = c1 ex + c2 xex 3

.

4y

 − 8y + 5y = 0 1

4

E

c

u

a

c

4m2

i

o

n

c

a

r

m1,2 = 1 o

l

u

c

t

e

r

i

s

t

i

c

a

.

− 8m√ + 5 = 0

m1,2 = 8±

s

a

c

i

o

n

.

64 80 8 1 2i

−

±

1

1

y = c1 ex ei 2 x + c2 ex e−i 2 x 1

1

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1 3

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y + 3y + 2y = 6

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m2 + 3m + 2 = 0 (m

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0 + 3(0) + 2A = 6 A=3 E

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y(x) = yh + y p

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y +y = 0

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m2 + 1 = 0

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α=0

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A sin x + B cos x

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y p = Ax sin x + Bx cos x y p = A sin x + Ax cos x + B cos x

 − Bx sin x y p = A cos x + A cos x − Ax sin x − B sin x − Bx cos x − B sin x = 2A cos x − 2B sin x − Ax sin x − Bx cos x S

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2A cos x

− 2B sin x − Ax sin x − Bx cos x + Ax sin x + Bx cos x = sin x 2A cos x − 2B sin x = sin x 2A = 0

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−2B = 1 S

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A=0 s

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− 12 x cos x 1

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− 12 x cos x

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 − 10y + 25y = 30x + 3

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− 10m + 25 = 0

m1,2 = 5

yh = c1 e5x + c2 xe5x L

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30x + 3

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1 4y

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3 5

 + y + y = x2 − 2x

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1 4y + y + y = 0 1 2 4m + m + 1 = 0

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− 2x

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1 2 4 (2A) + 2Ax + B + Ax + Bx + C = 1 2 2 2 A + B + Ax + 2Ax + Bx + C = x

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f (x) =

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y(x) = yh + y p

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y(x) = c1 e−2x + c2 xe−2x + x2 5

−48x2e3x

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m2 + 3 = 0

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y p = e3x (Ax2 + Bx + C )

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−48x2e3x

y p = 3e3x (Ax2 + Bx + C ) + e3x (2Ax + B)

 y p = 9e3x (Ax2 + Bx + C ) + 3e3x (2Ax + B) + 3e3x (2Ax + B) + 3x 3x 2 3x 3x e (2A) = 9e (Ax + Bx + C ) + 3e (4Ax + 2B) + e (2A)

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9e (Ax + Bx + C ) + 3e (4Ax + 2B) + e3x (2A) + 9e3x (Ax2 + Bx + C ) + 3e3x (2Ax + B) = 48x2 e3x

−

9e3x Ax2 + 9e3x Bx + 9e3x C + 12e3x Ax + 6e3x B + 2e3x A + 9e3x Ax2 + 9e3x Bx + 9e3x C + 6e3x Ax + 3e3x B = 48x2 e3x 9A + 9A = 18A = A=

−48

−

−48

− 83

B =0

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A=3

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yh = y

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Bsenx

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y + 2y + y = senx + 3cos2x

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y p = Acosx + Bsenx + Ccos2x + Dsen2x y p =

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y = −Acosx − Bsenx − 4Ccos2x − 4Dsen2x p

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−Acosx−Bsenx−4Ccos2x−4Dsen2x−2Asenx+2Bcosx−4Csen2x+ 4Dcos2x + Acosx + Bsenx + Ccos2x + Dsen2x = senx + 3cos2x

−3Ccos2x − 3Dsen2x − 2Asenx + 2Bcosx − 4Csen2x + 4Dcos2x = senx + 3Cos2x

−3C + 4D = 3 −3D − 4C = 0 .

.

.

(

1

)

.

.

.

(

2

)

9 25 12 25

C =

D=

−2A = 1

A=

;

2B = 0 B = 0

− 12

;

− 12 cosx + 259 cos2x + 1225 sen2x

y(x) = c1 ex + c2 xex

2

1

.

.

5

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.

y + y = sec x



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m2 + 1 = 0 m2 = m1,2 = m1,2 = α

√−1

± βi

;

d

o

2

−1 m1,2 =

;

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±i

α=0β=1

c

u

yh = y + y = 0



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a

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yh = c1 cosx + c2 senx A

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n

t

i



c

a

m

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s

y1 = cosx

y2 = senx

y

y

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v

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s

.

y1 = cosx y2 = senx y1 = A

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c

y1 y1

W =

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c

y2 = y2

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l

−senx y2 = cosx W

r

o

n

s

n

o

:

−

− [(senx)(−senx)] = −

y1 y1

W 1 W

a

cosx senx = [(cosx)(cosx)] senx cosx cos2 x + sen2 x = 1

−

u1 =

i

0 y2 0 senx = = [(0)(cosx)] [(senx)(secx)] =  f (x) y2 secx cosx senxsecx = senx cosx = tanx

W 1 =

W 2 =

k

0 = f (x)

= −tanx = 1

−

−

cosx 0 = [(cosx)(secx) senx secx cosxsecx = cosx cosx = 1

−

−tanx u2 =

u1 =

;

W 2 W

=

1 1

− (0)(−senx)] =

− ´ tanxdx = −[−ln(cosx)] = ln(cosx) = 1 u2 = ;

´

dx = x

y p = u1 y1 + u2 y2 y p = ln(cosx)cosx + xsenx y(x) = yh + y p y(x) = c1 cosx + c2 senxi + cosxln(cosx) + xsenx 2

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y + y = senx



.

yh = y + y = 0



m2 + 1 = 0 m2 = m1,2 = D

o

n

d

e

:

±√−1

−1 ;

m1,2 =

±i

α=0

β =1

y

yh = eαx (c1 cosβx + c2 senβx) yh = e0x (c1 cosβx + c2 senβx)

2

2

yh = c1 cosx + c2 senx D

e



n

i

m

o

s

y1 y2

,

y1 = cosx y1 = ;

−senx

y2 = senx y2 = cosx ;

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.

cosx senx = cos2 x + sen2 x = 1 senx cosx

W =

−

0 senx = senx cosx

W 1 =

cosx 0 = senxcosx senx senx

W 2 = A

h

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s

−

u1 u2

,

−sen2x

.

2

− sen1 x = −sen2x ´ u1 = − sen2 xdx = x2 − 14 sen2x u1 =

senxcosx 1

u2 =

senxcosxdx = 12 sen2 x

´

u2 =

= senxcosx

− 14 sen2x)cosx + 12 sen2x(senx) y p = 12 xcosx − 14 cosxsen2x + 12 sen3 x

y p = u1 y1 + u2 y2 = ( x2

y(x) = y p + yh y(x) = c1 cosx + c2 senx + 12 xcosx 3

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y  + y = cos2 x

.

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d

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n

− 14 cosxsen2x + 12 sen3x

d

e

yh = y  + y = 0 l

a

f

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m

a

:

yh = c1 cosx + c2 senx D

e



n

i

m

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s

y1 y2

,

y1 = cosx y1 = ;

−senx

y2 = senx y2 = cosx ;

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W

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k

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s

:

2

3

cosx senx = cos2 x + sen2 x = 1 senx cosx

W =

−

0 senx = 2 cos x cosx

W 1 =

cosx senx

W 2 = D

e



n

i

m

o

s

−senxcos2x

0 = cos3 x cos2 x

−

u1 u2

,

−senxcos2x = −senxcos2x

u1 = u1 =

−

1

senxcos2 xdx =

´

u2 =

´

u2 =



− −



cos3 x cos3 x = 3 3

cos3 x = cos3 x 1

cos3 xdx = senx

 

3

− sen3 x

cos3 x (cosx) + senx 3

y p = u1 y1 + u2 y2 =



cos4 x + sen2 x 3

y p =

−

4

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 − y = cosh x y  − y = 0 m2 − 1 = 0 √ m2 = 1 m1,2 = ± 1 = ±1

a

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o

c

i

y

.

a

d

a

;

yh = c1 ex + c2 e−x D

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i

m

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s

y1 y2

,

y1 = ex y1 = ex ;

y2 = e−x y2 = ;

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W

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:

2

4



− sen3 x

cos4 x y(x) = c1 cosx + c2 senx + + sen2 x 3 4

sen3 x 3

−e−x

−

sen4 x 3

(senx)

ex ex

W =

e−x = e−x

−

e−x = e−x

0 coshx

W 1 =

a

l

c

u

l

a

m

o

s

u1

−e−x(coshx) = −e−xcoshx

−

ex ex

W 2 = C

−e−x(ex) − ex(e−x) = −1 − 1 = −2

0 = ex coshx coshx

u2

y

x u1 = −e −coshx = 12 e−x coshx 2 −

1 2

u1 =

´ −x e coshxdx = 18 e−2x (2e2x x − 1) u2 =

ex coshx = 2

−

− 12 excoshx 2x

u2 = y p =

− 12 ´ excoshxdx = − 12 [ x2 + e4

ex [ 18 e 2x (2e2x x

−

2x

− 1)] + (−e−x)(− x − e ) 4

y p = 18 e−x (2e2x x

−x

− 1) + xe4

y(x) = c1 ex + c2 e−x + 18 e−x (2e2x x

4

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y + 3y  + 2y =

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a

−2 m2 = −1

yh = c1 e−2x + c2 e−x 

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s

y1 y2

,

.

y1 = e−2x y1 =

−2e−2x y2 = −e−x

;

y2 = e−x C

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W

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:

ex 8

1 1 + ex

(m + 2)(m + 1) = 0

e

;

2

5

8

−x

− 1) + xe4

m2 + 3m + 2 = 0

D

+

yh = y  + 3y  + 2y = 0

m1 =

]

+

ex 8

e−2x 2e−2x

W =

e−x = (e−2x )( e−x ) (e−x )( 2e−2x ) = e−x e−3x

−

−

−

W 1 = W 2 = C

a

l

c

u

l

a

m

o

u1 =

s

−

−

e−x = e−x

0 1 1+ex

−

−

e−2x 2e−2x

0 1 1+ex

−

−

−e−3x + 2e−3x =

e−x 1 + ex

e−2x = 1 + ex

u1 ,u2

e−x 1 + ex = e 3x −

u1 =

1 e−x = −2x = − x x 3 (e )(1 + e ) e (1 + ex )

− e−2x 1+ e−x

− ´ e−2x 1+ e−xdx = −ex + ln(ex + 1) − 1

e−2x 1 e−2x ex = u2 = 1 + = e−3x (e−3x )(1 + ex ) e−x + 1

´

u2 =

1 dx = x + ln(e−x + 1) − x e +1

y p = (e−2x )[ ex + ln(ex + 1)

− 1] + [x + ln(e−x + 1)](e−x)

−

−e−x + e−2xln(ex + 1) − e−2x + xe−x + e−xln(e−x + 1) y(x) = c1 e−2x + c2 e−x − e−x + e−2x ln(ex + 1) − e−2x + xe−x + e−x ln(e−x + 1) 3y − 6y  + 6y = ex secx yh = 3y − 6y  + 6y = 0 3m2 − 6m + 6 = 0 a = 3 b = −6 c = 6 y p =

5

.

,

D

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

n

i

m

o

s

,

y1 y2 ,

√36 − 72 √−36 (−6) ± (−6)2 − 4(3)(6) − 6 m1,2 = = ± =1± = 1±i



2(3)

6

6

α=1 β=1 ,

yh = ex (c1 cosx + c2 senx) D

e



n

i

e

n

d

o

y1 y2 ,

2

6

6

y1 = ex cosx y1 = ex cosx ;

− exsenx

y2 = ex senx y2 = ex senx + ex cosx ;

C

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ex cosx ex senx = (ex cosx)(ex senx + ex cosx) ex cosx ex senx ex senx + ex cosx (ex senx)(ex cosx ex senx) = ex (cosxsenx + cos2 x cosxsenx + sen2 x)

W =

−

−

−

−

W = ex (cos2 x + sen2 x) = ex ex senx = (ex senx)(ex secx) = ex senx + ex cosx ex tanx

0 x e secx

W 1 =

−

−

ex cosx ex cosx ex senx

W 2 = C

a

l

c

u

l

cosx 0 = (ex cosx)(ex secx) = ex ( ) = ex e secx cosx x

−

a

m

o

s

−ex( senx )= cosx

u1 u2

,

x

= −tanx − e tanx ex ´ u1 = − tanxdx = −(−lncosx) = lncosx u1 =

ex  u2 = x = 1 e

u2 =

´

dx = x

y p = lncosx(ex cosx) + x(ex senx) y(x) = ex (c1 cosx + c2 senx) + ex cosxlncosx + xex senx 2

.

6

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C

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-

x2 y S

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r

 − 2y = 0 r

m

a

y = xm

.

y = xm y  = mxm−1

− 1)mxm−2

y  = (m S

u

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i

t

u

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x2 [(m

o

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i

g

i

n

a

l

.

− 1)mxm−2] − 2(xm) = 0 2

7

x2 [(m

− 1)mxm x−2] − 2(xm) = 0 (m − 1)mxm − 2xm = 0 xm [(m − 1)m − 2] = 0 xm (m2 − m − 2) = 0

a

s

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a

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x

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r

m2

−m−2 = 0 (m + 1)(m − 2) = 0 m1 = −1 m2 = 2 ;

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:

y = c1 x−1 + c2 x2 2

.

x2 y  + y = 0 S

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y = xm y = xm y  = mxm−1 y  = (m

S

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x2 [(m (m

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x

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l

i

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r

− 1)mxm−2

− 1)mxm−2] + xm = 0

− 1)mx2xm x−2 + xm = 0 (m2 − m)xm + xm = 0 xm (m2 − m + 1) = 0

m2

d

o

n

d

e

:

α=

1 2

β=

1 2

√3

−m+1=0 √ m1,2 = 12 ± 12 3i 1

1

y = c1 x 2 + 2

√ 3i

2

8

1

1

+ c2 x 2 − 2

√ 3i

U

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a

n

d

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i

d

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n

t

i

d

a

d

,

xiβ = (elnx )iβ = eiβlnx c

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m

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E

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xiβ = cos(βlnx) + isen(βlnx) x−iβ = cos(βlnx) e

n

t

o

n

c

e

s

− isen(βlnx)

xiβ + x−iβ = cos(βlnx) + isen(βlnx) + cos(βlnx) xiβ

− isen(βlnx) = 2cos(βlnx)

− x−iβ = cos(βlnx) + isen(βlnx) − cos(βlnx) + isen(βlnx) = 2isen(βlnx) s

y = C 1 xα+iβ + C 2 xα−iβ

i

y1 = xα (xiβ + x−iβ ) = 2xα cos(βlnx) y2 = xα (xiβ s

e

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u

y

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− x−iβ ) = 2xαisen(βlnx)

y1 = xα cos(βlnx) A

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a

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e

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r

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s

y

= xα sen(βlnx)

y = xα [c1 cos(βlnx) + c2 sen(βlnx)]

√

1

√

y = x 2 [c1 cos( 12 3lnx) + c2 sen( 12 3lnx)] 3

.

x2 y  + xy  + 4y = 0 S

u

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a

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l

u

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:

y = xm y  = mxm−1 y  = (m S

u

s

t

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u

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n

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c

x2 [(m

u

a

c

i

ó

n

.

− 1)mxm−2

− 1)mxm−2] + x(mxm−1) + 4(xm) = 0 xm (m2 − m + m + 4) = 0 xm (m2 + 4) = 0 m2 =

2

9

−4

±√−4 m1,2 = ±2i

m1,2 =

α=0β=2 y = x0 (c1 cos2lnx + c2 sen2lnx) y = c1 cos2lnx + c2 sen2lnx 4

.

x2 y S

o

l

u

c

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n

p

r

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p

u

e

s

t

a

.

 − 3xy − 2y = 0

y = xm y  = mxm−1

− 1)mxm−2

y  = (m S

u

s

t

i

t

u

i

m

o

s

.

x2 [(m

− 1)mxm−2] − 3x(mxm−1) − 2(xm) = 0 xm [(m2 − m) − 3m − 2] = 0 xm (m2 − 4m − 2) = 0 √ m1,2 = 2 ± 6 √ 6

y = c2 x2+ 5

√ 6

+ c1 x2−

.

25x2 y  + 25xy  + y = 0 S

o

l

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p

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a

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y = xm y  = mxm−1 y  = (m S

u

s

t

i

t

u

i

m

o

s

.

− 1)mxm−2

25x2 [(m

− 1)mxm−2] + 25x(mxm−1) + xm = 0

xm [25m2

− 25m + 25m + 1] = 0 3

0

25m2 + 1 = 0

m1,2 =



± − 251 = ± 15 i 1 5

α = 0, β =

1 1 y = x0 (c1 cos lnx + c2 sen lnx) 5 5 1 1 y = c1 cos lnx + c2 sen lnx 5 5 6

.

x2 y  + 5xy  + y = 0 S

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y = xm y  = mxm−1 y  = (m S

u

s

t

i

t

u

i

2 [(m

m

o

s

.

− 1)mxm−2

1)mxm−2 ] + 5x(mxm−1 ) + xm = 0 x xm (m2 m + 5m + 1) = 0 m2 + 4m + 1 = 0 m1,2 = 2 √ 3 √ y = c1 x2+ 3 + c2 x2− 3 7

− − ±√

.

− 4y = x4

xy  S

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y = xm y  = mxm−1 y  = (m H

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c

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d

− 1)mxm−2

e

C

a

2

− 4xy = x5 yh = x2 y  − 4xy  = 0 x2 [(m − 1)mxm−2 ] − 4x(mxm−1 ) = 0 x y  R

S

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3

1

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m1 = 2 m2 = 1 yh = c1 x2 + c2 x ,

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∞ c xn n=0 n

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y =

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∞ (n−1)nc xn−2 n n=2

∞ (n 1)nc xn−2 x ( ∞ c xn ) = 0 n n=2 n=0 n ∞ (n 1)nc xn−2 ∞ c xn+1 = 0 n n=2 n=0 n

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∞ c xn+1 = 0 n=0 n ∞ c xk = 0 k 2c2 ∞ k=1 (k + 2)(k + 1)ck+2 x − k=1 k−1 k 2c2 ∞ k=1 [(k + 2)(k + 1)ck+2 − ck −1 ]x = 0

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2c2 = 0 c2 = 0 ;

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y= c0 +c1 x+c2 x2 +c3 x3 +c4 x4 +c5 x5 +c6 x6 +c7 x7 +c8 x8 +c9 x9 +c10 x10 +c11 x11 +..., y= 1 1 1 1 1 c0 +c1 x+0+ 16 c0 x3 + 12 c1 x4 +0+ 180 c0 x6 + 504 c1 x7 +0+ 12960 c0 x9 + 90(504) c1 x10 +0 y = c0 (1 + 16 x3 +

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k+2−2 2c2 x0 + 6c3 x ∞ + ∞ 1)xk−1+1 + k =2 (k + 2 1)(k + 2)ck+2 x k =2 ck−1 (k k−1+1 c0 x 1 ∞ =0 k=2 ck−1 x ∞ 2c2 + 6c3 x + c0 x k=2 (k + 1)(k + 2)ck+2 xk + ck−1 (k 1)xk + ck−1 xk = 0 2c2 + 6c3 x + c0 x ∞ 1) + ck−1 ]xk = 0 k =2 [(k + 1)(k + 2)ck +2 + ck−1 (k (k + 1)(k + 2)ck+2 + ck−1 (k 1) + ck−1

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2c2 = 0 c2 = 0 6c3 + c0 = 0 c3 = 16 c0 ;

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y = c0 + c1 x + c2 x2 + c3 x3 + c4 x4 + c5 x5 + c6 x6 + c7 x7 + c8 x8 + c9 x9 + ... 5 5 1 6 7 7 y = c1 [ 16 x4 + 136 x7 + 9(34) x10 ] c0 [ 45 x + 72(45) x9 + 66(72)(9) x12 ] 3

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∞ (n 1)nc xn−2 − 2x ∞ c nxn−1 + ∞ c xn = 0 n n n=2 ∞ (n 1)ncn xn−2 − 2 ∞ n=1 ∞ c nx=0 n n c nx + = 0 n n=2 n=1 n n=0 n ∞ ∞ ∞ n−2 n 2c2 n=3 (n 1)ncn x − 2 n=1 cnnx + c0 n=1 cnxn = 0

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2c2 + c0 = 0 c2 = 12 c0 (k + 1)(k + 2)ck+2 xk 2ck kxk + ck xk = 0 [(k + 1)(k + 2)ck+2 2ck k + ck ]xk = 0 (k + 1)(k + 2)ck+2 2ck k + ck (2k + 1)ck ck+2 = (k + 1)(k + 2) k = 1, 2, 3, 4,...

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n=1 n

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= 12 c1

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∞ (n − 1)nc xn + ∞ 2(n − 1)nc xn−2 + ∞ 3c nxn − ∞ c xn = 0 n n n n=2 n=2 n=1 n=0 n ∞ (n − 1)nc xn + ∞ 2(n − 1)nc xn−2 + 3c x ∞ 3c nxn − c + n n n 1 0 n=2 n=2 n=2 ∞ n c x c x =0



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n=2 n

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2

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a

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a

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u

e

s

t

a

i

g

u

a

l

d

a

d

s

a

s

e

r

i

e

y

k=n

p

a

r

a

l

a

s

d

− 1)ncnxn−2 + e

m

a

s

∞ [(k 1)kc + 2(k +1)(k + 2)c + 3c k − c ]xk = 0 k k+2 k k k=2

4c1 x + c0 + 4c2 + 12c3 x e

d

1)ncn xn + ∞ 2(n ∞ c xn = 0n=4 n=2 n

∞ (k 1)kc xk + ∞ 2(k + 2 − 1)(k + k k=2 ∞ ∞ c kx=2 k k 3c kx =0 k k=2 k=2 k

3c1 x + c0 + c1 x + 4c2 + 12c3 x 2)ck+2 xk+2−2 +

D

n

−

e

o

b

t

i

e

n

e

4c1 + 12c3 = 0 c3 = c31 c0 + 4c2 = 0 c2 = c40 (k 1)kck + 2(k + 1)(k + 2)ck+2 + 3ck k ck 3kck + ck (k 1)kck [ 3k + 1 k 2 k]ck [ 4k + 1 k2 ]ck ck+2 = = = 2(k + 1)(k + 2) 2(k + 1)(k + 2) 2(k + 1)(k + 2) k = 2, 3, 4, 5,... c2 = c40 c3 = c31 −4−2)c2 = 11 ( 1 c ) = 11 c c4 = (−6+1 2(3)(4) 24 4 0 96 0

− −

−

S

u

s

t

i

−

t

u

y

e

− −

n

d

o

v

a

l

o

r

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− −

s

d

e

−

−

− −

− − − − − − −

− − − −

−

−

4

1

T

r

a

n

−

s

f

o

−

9)c3 1 1 1 c5 = ( 12+1 = 20 2(4)(5) 40 c3 = 2 ( 3 c1 ) = 6 c1 16)c4 31(11) 31 11 c6 = ( 16+1 = 31 2(5)(6) 60 c4 = 60 ( 96 c0 ) = (60)(96) c0 25)c5 1 11 c7 = ( 20+1 = 8444 c5 = 11 2(6)(7) 21 ( 6 c1 ) = 126 c1 36)c6 11(31) 59 11(31) c8 = ( 24+1 = 112 ( 60(96) c0 ) = 112(60)(96) c0 2(7)(8) 31(11) 6 11(31) 1 3 4 8 y = c0 [ 14 x2 + 11 90 x + 60(96) x + 112(60)(96) x ] + c1 [ 3 x

− − − −

−

r

m

a

d

a

d

e

L

a

p

l

a

c

e

+ 16 x5 +

.

−

≤t<1 ≥1 L{f (t)} = ´ 0∞ e−stf (t)dt = − ´ 01 e−st(1) + ´ 1∞ e−st(1) = − e−s |10 + e−s |∞ 1 f (t)

1, 0 1, t

st

st

−

−

3

8

11 7 126 x ]

s(1)

s(0)

s(1)

s(∞)

− e −s − [− e −s ] + e −s − e −s = e s − 1s + e s + 0s = 2es − 1s −

=

−

−

s

−

s

−

−

s

−

2

.



f (t) =

t, 1,

0

≤t<1 t≥1

L[f (t)] = ´ 0∞ e−stf (t) = ´ 01 e−sttdt + ´ 1∞ e−st(1)dt = − e s (t − 1s )|10 + − e s |∞ 1 e e 1 = − s (1 − s ) − [− s (0 − 1s )] + [− e s − e s = − e s + es + s1 − 1s st

st

−

−

s(1)

s(0)

−

s(∞)

−

s

s(0)

−

−

]

s

−

−

2

2

f (t) = te4t

L{te4t } = ´ 0∞ e−stte4tdt = ´ 0∞ te−(s−4)t dt −(s−4)t

− e(s − 4)2 [−s + 3]|∞0

=

e−(s−4)∞ (s 4)2

=

− −

−− −

0

=

(s

−

1

+

4)2

(s

− 4)2

1

= 3

e−(s−4)0 [ ] (s 4)2

(s

− 4)2

.

y + 3y + 2y = 0





y(0) = 1 y (0) = 1



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L[y2 ] + 3L[y] + 2L[y] = 0 [s Y (s) − sy(0) − y (0)] + 3[sY (s) − y(0)] + 2[Y (s)] = 0 s2 Y (s) − sy(0) − y  (0) + 3sY (s) − 3y(0) + 2Y (s) = 0 s2 Y (s) − s(1) − 1 + 3sY (s) − 3(1) + 2Y (s) = 0 s2 Y (s) − s − 1 + 3sY (s) − 3 + 2Y (s) = 0 Y (s)(s2 + 3s + 2) − s − 4 S

F

u

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s

3

9

4+s s2 + 3s + 2

Y (s) = S

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c

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i

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p

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s

4+s A B = + (s + 2)(s + 1) s+1 s+2 P

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t

o

d

o

d

e

H

e

(4 + s)(s + 1) A= (s + 2)(s + 1) (4 + s)(s + 2) B= (s + 1)(s + 2) 3 Y (s) = s+1 S

u

s

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l

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s

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| | c

s

u

f

−

− − −

2 s+2 e

n

s

4 + ( 1) =3 s=−1 = 1+2 4 2 = 2 s=−2 = 2+1 a

o

c

r

i

m

o

n

a

3 y(t) = −1 [ ] s+1 1 y(t) = 3 −1 [ ] s+1 y(t) = 3e−t 2e−2t

L L

i

t

d

r

a

i

a

n

n

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s

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r

.

xy = 0

 −   − −   − −  − −  − − ∞ c xn n=0 n

y=

a

−L − L

−

d

d

−[ 2 ] s+2 1 2 −[ ] s+2

y

S

a

y

l

a

s

e

g

u

n

d

a

d

e

r

i

v

a

d

a

y  =



∞ (n−1)nc xn−2 n n=2

∞ (n 1)nc xn−2 x ( ∞ c xn ) = 0 n n=2 n=0 n ∞ (n 1)nc xn−2 ∞ c xn+1 = 0 n n=2 n=0 n

A

h

o

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u

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a

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t

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i

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q

u

u

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e

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i

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−

p

s

s

∞ n(n n=3

i

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a

r

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a

l

a

u

a

l

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n

d

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l

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i

p

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d

1)cn xn−2

i

m

e

−1

r

a

r

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s

p

e

r

e

i

c

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e

a

m

b

a

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t

y

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∞ n(n − 1)c xn−2 − n n=3

v

k = n+1

a

m

e

n

t

e

.

p

a

r

a

l

a

∞ c xn+1 = 0 n=0 n ∞ c xk = 0 k 2c2 ∞ k=1 (k + 2)(k + 1)ck+2 x − k=1 k−1 k 2c2 ∞ k=1 [(k + 2)(k + 1)ck+2 − ck −1 ]x = 0

  

(k + 2)(k + 1)ck+2 ck+2 =





− ck−1 = 0

ck−1 (k + 2)(k + 1) 4

0

u

m

a

s

.

∞ c xn+1 = 0 n=0 n

2c2

s

∞ c xn+1 = 0 n=0 n

1)cn xn−2

k=n 2 n = k+2 n = k :

o

s

∞ n(n n=3

2(1)c2 x0 2c2

s

s

e

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u

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d

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

p

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p

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t

a

,

c

o

n

2c2 = 0 c2 = 0 ;

c0 3(2)

k = 1 c3 = ,

k =2

c2 = 5(4)

k = 3 c5 = ,

=

1 180 c0

k = 5 c7 =

c4 = 7(6)

1 1 42 ( 12 )c1

=

1 504 c1

c5 =0 8(7)

c8 =

,

c6 = 9(8)

k = 7 c9 = ,

t

u

y

e

n

d

o

c

o

e



1 1 72 ( 180 )c0

c7 = 10(9)

k = 9 c11 =

c8 =0 11(10)

,

i

← c5 = 0

k = 8 c10 = ,

t

← c2 = 0

1 1 30 ( 6 )c0

k =6

s

=0

c3 = 6(5)

,

u

1 20 c2

1 12 c1

k = 4 c6 = ,

S

c1 = 4(3)

c4 =

,

= 16 c0

c

i

e

n

t

e

s

e

n

l

a

s

u

p

o

s

i

c

i

o

1 12960 c0

=

1 10(9)(504) c1

n

o

← c8 = 0 r

i

g

i

n

a

l

y= c0 +c1 x+c2 x2 +c3 x3 +c4 x4 +c5 x5 +c6 x6 +c7 x7 +c8 x8 +c9 x9 +c10 x10 +c11 x11 +..., y=

1 1 1 1 1 c0 +c1 x+0+ 16 c0 x3 + 12 c1 x4 +0+ 180 c0 x6 + 504 c1 x7 +0+ 12960 c0 x9 + 90(504) c1 x10 +0

y = c0 (1 + 16 x3 + 2

1 6 180 x

1 9 12960 x ) + c1 (x

+

u

1 4 12 x

+

1 7 504 x

+

1 10 90(504) x )

.

y  S

+

t

i

t



u

y

e

n

d

o

y=



∞ c xn n=0 n d

e

r

i

v

a

d

a

l

a

− (x + 1)y − y = 0 p

r

i

m

y =

e

∞ c nxn−1 n ∞ (n − 1)nc nx=1 n−2 n

r

a



d

e

r

i

v

n=2

a

d

a



y

l

a

s

e

g

u

n

d

∞ (n − 1)nc xn−2 − (x + 1) ∞ c nxn−1 − ∞ c xn = 0 n n=2 n=1 n n=0 n ∞ (n − 1)nc xn−2 − ∞ c nxn − ∞ c nxn−1 − ∞ c xn = 0



n=2

n



n=1 n

4

 1



n=1 n





n=0 n

a

2c2 x0

h

p

a

r

a

c

a

l

e

m

a

o

s

e



s

g

n

c2 c1 c0 +

− −

c2

d

a

y

l

−2 a

c

p

u

a

a

r

r

t

a

a

l

s

a

e

p

r

i

r

e

i

.

∞ c nxn − c x0 n 1 ∞n=1 c xn = 0

 

c0 x 0

k=n

u

∞ (n − 1)nc xn−2 − n n=3

n=1 n

m

e

r

a

s

e

r

i

e

,

k=n

−1

∞ c nxn−1 − n=2 n

 p

a

r

a

l

a

t

e

r

c

e

r

a

,

k=n

∞ (n−1)nc xn−2 − ∞ c nxn − ∞ c nxn−1 − ∞ c xn = n n=3 n=1 n n=2 n n=1 n





 −

0

 −

∞ (k + 2 − 1)(k + 2)c xk ∞ c kxk ∞ c (k + k +2 k =1 k=1 k k=1 k+1 ∞ 1)xk − k=1 ck xk = 0 k c2 − c1 − c0 + ∞ k=1 [(k + 1)(k + 2)ck+2 − kc k − (k + 1)ck+1 − ck ]x = 0

− c1 − c0 +

D

e

a

k

i

s

e

c



o

n

c

l

 u

y



e

q

u

e

c2 = 0 c1 = 0 c0 = 0 (k + 1)(k + 2)ck+2 ck+2 =

− (k + 1)ck+1 − kck − ck = 0

(k + 1)ck+1 + (k + 1)ck (k + 1)(k + 2)

k = 1, 2, 3, ..., k = 1 c3 = =0 3 k = 2 c4 = = 12 c3 = 0 k = 3 c5 = =0 S

u

s

t

i

t

u

y

e

n

d

o

2c2 +2c1 2(3) 3c3 +3c2 3(4) 4c4 +4c3 4(5)

,

,

,

S

1

e

r

i

e

d

e

T

a

y

l

o

r

.

y  = x + 2y2 y(0) = 0 y (o) = 1 D

e

r

i

v

a

n

d

o

y  = 1 + 4yy  y  = 4y  y  + 4yy  yiv = 4y  y  + 4y  y  + 4y  y  + 4yy  = 12y  y  + 4yy  y v = 12y  y  + 12y  y  + 4y  y  + 4yy iv

4

2

y vi = 12y  y + 12y  y + 12y  y + 12y y iv + 4y  y + 4y y iv + 4y  yiv + 4yy v = 36y  y + 12y  y iv + 4y  y + 4y  yiv + 4y y iv + 4yy v y  (0) = 1 y (0) = 4 y iv (0) = 12 y v (0) = 76 yvi (0) = 408 ,

,

x 1!

y(x) =

1

,

x2 2!

+

4x3 3!

+

,

12x4 4!

+

+

.

f (t) = 4t

− 10

L[f (t)] = 4L´ [t]∞ − −10stL[1] ´ ∞ −st L[f (t)] = 4 0 te dt − 10 0 e dt I

n

t

e

g

r

a

m

o

s

p

o

r

p

a

r

t

e

s

l

a

p

r

i

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e

r

a

i

n

t

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g

r

a

l

´ ∞

4 0 te−st dt = u = t du = 1 st dv = e−st v = e s ´ st 1 ∞ −st )]dt = 4[(1)( e s ) ∞ + 0 s 0 (1)(e st = 4s e−s(∞) ( 4s e−s(0) ) + 1s e s ∞ 0 ,

,

−

−

−

|

−

−

−

−− 4 1 e = s+s ( s −e s 4 1 = 4s + 1s (− 1s ) = − 2 s s H

a

c



e

m

o

s

s(∞)

s(0)

−

l

a

s

e

g

u

−

n

d

a

´ ∞ −st 10 e dt = − e 0 e

=

s(∞)

−

−

s

1 = s e

n

t

o

n

c

e

s

− (−

e

i

st

−

s

s(0)

−

s

n

t

e

g



)

r

a

l

|

|∞ 0

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L[f (t)] = 4s − s12 − 1s = 3s − s12 2

.

f (t) = et/5

L[f (t)] = L[et/5] = ´ 0∞ et/5e−stdt ´ ∞ = 0 e (1−5s) dt = e (1−5s) |∞ 0 5 5 = e (1−5s) − e (1−5s) = − = 1 − 5s 5s − 1 t 5

∞

5 1 5

3

(1−5s)

t (1 5s) 5 − 1 5 0 (1−5s) 5 1 5

.

f (t) = et−2

L[f (t)] = L[et−2] 4

3

76x5 5!

+

408x6 6!

´ ∞ t−2 −st −2 ´ et(1−s) dt e e dt = e 0 t(1 s) −2 )( e( )(1 s) ) − (e−2 )( e(0)(1 s) ) = e−2 [ e 1−s ]|∞ 0 = (e 1−s 1−s e−2 e−2 =

−

=

4

∞

−

−

−1 − s = s − 1

.

f (t) = et cos t

L[f (t)] = L[et cos t] L[f (t)] = F (s) at L[e f (t)] = F (s − a) P

o

r

e

l

t

e

o

r

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m

a

d

e

t

r

a

s

l

a

c

i

o

n

d

e

l

e

j

e

s

a=1

L[cos t] = s s+1 =⇒ L[et cos t] = (s − 1)s 2 + 1 2

5

.

f (t) = e−t cos t

L[f (t)] = L[e−t cos t] L[f (t)] = F (s) at L[e f (t)] = F (s − a) a = −1 ´ L[cos t] = 0∞ e−st(cos t)dt u = cos t du = − sin t ´ P

I

o

r

n

e

t

e

l

g

t

r

e

a

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r

m

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m

a

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p

d

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r

t

p

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r

r

a

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l

s

a

c

i

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d

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s

,

st dv = e−st v = e−st dt = − e s ´ ∞ −st e−st ∞ −

,

e

0

= E

t

é

r

m

−

v

a

i

−

e−st ∞ (cos t) s 0 u

o

a

m

o

s

e

l

p

r

i

st

| − ´ 0∞ −es (− sin t)dt −

)0

s

− 1 ´ ∞ e−st(sin t)dt

|

l

n

(cos t)dt = cos t( 0

s

m

e

r

t

é

r

m

i

n

o

y

v

o

l

v

e

m

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a

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p

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p

a

r

t

e

s

e

l

s

e

g

u

n

u = sin t du = cos t st dv = e−st v = e s e−∞ e−0 = [(cos ) (cos 0) ] s s ,

−

∞

1 s2

´ ∞ −st e cos tdt

0

A

p

l

i

c

a

n

d

o

e

l



0

´ ∞ −st e cos tdt = ∴ t

e

o

r

e

m

1 s

1+ a

d

e

=

1 s2 t

r

a



st

st

− e s )|∞0 − ´ 0∞(− e s 1 1 ∞=1 = 2 st sin t|∞ cos t | 0 − 0 s e sest s

−

 

= 1+

−

−

,

s

− 1s

s +1

s2 l

a

c

−

sin t(

i

o

n

d

e

L[f (t)] = F (s) L[eat f (t)] = F (s − a) 4

4

l

e

j

e

s

−



)cos tdt

d

o

a=

−1

L[e−t cos t] = (s +s 1)+21+ 1 6

.

 − 

1 0 1

f (t) =

0
≤

≥

L[f (t)] = ´ 0∞ e−stf (t)dt = ´ 02 e−st(−1)dt + ´ 24 e−st(0)dt + ´ 4∞ e−st(1)dt ´ 2 −st 1 −st 2 1 −2s 1 0 1 −2s − − − − se = s e − 1 e ( 1)dt = [ e ]0 = e 0 s s





´ 4 −st e (0)dt = 0 2 ´ ∞ −st 1 −st ∞ 1 −∞t 1 4s 1 4s − | − e (1)dt = e = e + e = e 4 4 s

L[f (t)] = 1s 7



e−2s

s

−1



s

s

1 1 −2s + e4s = e + e4s s s



−1



.

f (t) =



3t 0

0
≥

L´ [f (t)] = ´ 01 e−st´ 3tdt + ´ 1∞ e−st(0)dt 1 e st 3tdt 0

1 0

−

=3 u = t du = 1

te−st dt

,

e−st − st dv = e v=− s e−st 1 ´ 1 e−st ,

 − 

= 3 t(

s

e−st 1 )dt = t( ) s s 0

)0

| − 0 (−

3 = t( e−st ) 10 s

−

1 −st 1 [e ]0 s

|−

3 3 [ e−s 1s e−s ] = e−s ( s ´ s ∞ 0dt = 0 1 3 1 [f (t)] = e−s ( 1 + s s

−

8

n

− −

c

o

n

t

r

a

r

|−

  − =

1 [( e−s ) s



− 0] − 1s [(e−s) − 1]

−1 − 1s) + s12

−

L E

−

1 e−st [ ] s s

f (t)

d

a

d

a

s

u

t

r

a



1 ) s

n

s

f

o

r

m

a

d

a

d

e

L

.

F (s) =

4

5

1 s2

a

p

l

a

c

e

F (s) ,

d

o

n

d

e

f (t) = −1 F (s)

L {

}

L−1[ s1 ] L−−11[ s1n! ] = f (t) = tn L [s ] = t 2

n+1 2

U

e

n

c

s

o

a

n

9

r

t

r

e

a

r

l

t

e

o

F (s)

r

e

d

m

a

a

d

d

a

e

l

a

t

r

a

n

s

f

o

r

m

a

d

a

d

e

l

a

d

e

r

i

v

a

d

f (t)

.

f (t) = t sin3t f (t) = t sin3t f (0) = 0 f (t) = sin 3t + 3t cos3t f (0) = 0 f (t) = 3cos 3t + 3cos 3t 9t sin3t f (0) = 6 [f (t)] = s2 F (s) f (0) f (0) [3cos3t + 3cos 3t 9t sin3t] = s2 [t sin3t] 0 6 [cos 3t] 9 [t sin3t] = s2 [t sin3t] 6 [cos 3t] = s2 [t sin3t] + 9 [t sin3t] 6 [cos 3t] = (s2 + 9) [t sin3t] s 6[ 2 ] = (s2 + 9) [t sin3t] s +9 6s [t sin3t] = 2 (s + 9)2 s

e

a

n

,

  L  L L L L

,

− L L

− −

L L

 − −  L L



,

L

L 1

0

.

f (t) = t cosh t s

e

a

n

:

f (t) = t cosh t f (0) = 0 f (t) = cosh t + t sinh t f (0) = 1 f (t) = sinh t + sinh t + t cosh t [f (t)] = s2 F (s) f (0) f (0) [2 sinh t + t cosh t] = s2 [t cosh t] 0 1 2 [sinh t] + [t cosh t] = s2 [t cosh t] 1 2 [sinh t] = s2 [t cosh t] [t cosh t] 1 1 2 2 = (s2 1) [t cosh t] 1 s 1 2 + 1 = (s2 1) [t cosh t] 2 (s 1) 2 + s2 1 = (s2 1) [t cosh t] (s2 1) s2 + 1 [t cosh t] = 2 (s 1)2 ,

   L  − −  L L L L L L L −L − L − − − L − − − L − L − ,

− − − −

4

6

− −0

a

d

e

u

n

a

f

u

n

c

i

o

n

p

a

r

a

1

1

.

f (t) = t2 cos3t S

e

a

n

:

f (t) = t2 cos3t f (0) = 0 ,

− 3t2 sin3t f (0) = 0 f (t) = 2cos 3t − 6t sin3t − (6t sin3t+9t2 cos3t) = 2cos 3t − 12t sin3t − 9t2 cos3t f (t) = 2t cos3t



A

p

l

i

c

a

n

d

o

e

l

t

e

o

r

e

m

a

,

L[f (t)] = s2F (s) − f (0) − f (0) L[2cos3t − 12t sin3t − 9t2 cos3t] = s2L[t2 cos3t] − 0 − 0 2L[cos3t] − 12L[t sin3t] − 9L[t2 cos3t] = s2 L[t2 cos3t] 2L[cos3t] − 12L[t sin3t] = s2 L[t2 cos3t] + 9 L[t2 cos3t] s s2 + 9

2

t

r

a

n

= (s2 + 9)L[t2 cos3t] ⇐ − 12 (s2 6s 2 + 9)

s

f

o

r

m

a

d

a

d

e

t sin3t

e

6s + 9)2

(s2

s

a

n

t

e

r

i

o

r

m

p

e

n

u

t

e

e

s

.

y

p

o

a

d

l

a

e

m

h

o

a

s

b

i

o

a

b

m

s

e

o

s

r

r

v

a

e

s

r

q

u

e

u

l

t

e

o

l

a

2s(s2 + 9) 36s = (s2 + 9) [t2 cos3t] (s2 + 9)2 2s3 + 18s 36s = (s2 + 9) [t2 cos3t] (s2 + 9)2 2s3 18s = [t2 cos3t] (s2 + 9)2 (s2 + 9) 2s3 18s [t2 cos3t] = 2 (s + 9)3

− −

L L

−

L

−

L .

H

a

l

l

a

r

f (t)

m

e

d

i

a

n

t

e

e

l

t

e

o

r

e

m

a

d

e

l

a

t

r

a

F (s) 1

2

.

1

F (s) =

L−1 S

a

b

e

 m



1 s(s o

s

− 4) L−1 s −1 a q

u

e

 

= eat

,

e

n

s(s

t

4

o

7

n

− 4) c

e

s

:

n

s

f

o

r

m

a

d

a

d

e

l

a

i

n

t

e

g

r

a

l

d

a

d

a



L−1



1

=

´ t 0

s(s 4) 4t e 1 1 = = (e4t 4 4 4

−

3

at

|t0 = ea − a1

o

n

d

e

:

a =4

1 + 3)

.

F (s) =

   L   L    L

s2 (s



1 = s2 (s + 3) 1 −1 = eat (s + a) ´ t 1 −1 = 0 e3τ dτ = s(s + 3) ´ t 1 3t 1 −1 = e 0 s2 (s + 3) 3 1 f (t) = (e3t 3t 1) 9

L−1 S

d

− 1)

−

1

eaτ a

eaτ dτ =

i

,

d

o

n

d

e

a=3 ,

e

n

t

o

n

c

e

s

:

1 3τ t 1 1 e 0 = e3t 3 3 3 1 1 3τ 1 dτ = e τ 3 9 3

|

−

 

−



−

t

1 3t e 9

= 0

− 13 t − 19

− −

1

4

3

.

F (s) =



L−1 C

o

n

o

L−1 L−1

1 t 3

 −   L   −  −   c

3

s2 (s2 i

e

L

a

p

e

l

1

a

s

c

5

o

a

−1

s2

3

=

9)

3

s2 (s2

o

e

d

l

v

e

r

l

a

s

s

i

g

u

a2

´ t

= sinh at

,

d

o

n

d

e

a=3

,

e

n

t

o

n

c

e

s

:

1 1 1 cosh 3τ t0 = cosh3t 3 3 3 1 1 1 1 cosh 3τ dτ = sinh 3τ τ 3 3 9 3

sinh3τ dτ =

0

´ t

=

− 9)

1 (sinh3t 9

− 9)

=

9)

s(s2

f (t) =

R

n

s2 (s2

0

|

−

 

−

t



−

1 sinh 3t 9

=

0

− 3t) i

e

n

t

e

s

e

c

u

a

c

i

o

n

e

s

d

i

f

e

r

e

n

c

i

a

l

e

s

,

.

y + y = 0 , y(0) = 1

 L{y + y} = L{0} 4

8

u

s

a

n

d

o

l

a

t

r

a

n

s

f

o

r

m

a

d

a

d

e

−

P

o

r

e

l

t

e

o

r

e

m

a

d

e

t

r

a

n

s

f

o

r

m

a

d

a

s

d

e

d

e

r

i

v

a

d

a

s

s2 Y (s)

− sy(0) − y(0) + Y (s) = 0 s2 Y (s) − s(1) − 0 + Y (s) = 0 Y (s)(s2 + 1) − 1 = 0 S

u

s

t

i

t

u

y

e

Y (s) = A

p

l

i

c

a

o

r

d

o

e

l

v

a

l

o

r

i

n

i

c

i

a

l

1 +1

s2

m

o

s

l

a

t

r

a

n

s

f

o

r

m

a

d

a

i

n

v

e

r

s

a

a

Y (s)

 

1 = e−t 2 s +1

L−1 p

n

l

i

n

e

a

l

i

d

a

d

y = e−x

1

6

.

y + 4y = 2 , y(0) = 0 , y (0) = 0





L [y + 4y] = L [2] 2 s2 Y (s) − sy(0) − y (0) + 4Y (s) = s S

u

s

t

i

t

u

y

e

n

d

o

e

l

v

a

l

o

r

i

n

i

c

i

a

l

2 s2 Y (s) 0 0 + 4Y (s) = s 2 Y (s)(s2 + 4) = s 2 Y (s) = s(s2 + 4)

− −

s

e

a

p

l

i

c

a



l

a

t

r

a

n

s

f



o

r

m

a

d

a

i

n

v

e

r

s

a

2 −1 = 2 s(s + 4) ω −1 = sin ωt ω =2 2 s + ω2 ´ t 2 1 −1 = sin2τ dτ = cos2τ t0 = 0 2 s(s + 4) 2 1 1 f (t) = cos2t 2 2

L S



L

i



L





d

o

n

d

e

,

e

n

t

−

o

n

c

e

s

− 12 cos2t + 12

|

−

p

o

r

l

i

n

1 y= 2

1

7

e

a

l

i

d

a

d

1 cos2x 2

−

.

y + 16y = 4 ,

y(0) = 1 , y (0) = 0



A

p

l

i

c

a

m

o

s

t

r

a

n

s

f

o

r

m

a

d

a

d

e

L

a

p



l

a

c

e

a

L[y + 16y] = L[4] 4

9

l

a

e

c

u

a

c

i

ó

n

4 s

s2 Y (s) + sy(0) + y (0) + 16Y (s) =



S

u

s

t

i

t

u

i

m

o

s

l

o

s

v

a

l

o

r

e

s

i

n

i

c

i

a

l

e

s

,

y

d

e

s

p

e

j

a

m

o

s

Y (s)

4 Y (s)(s2 + 16) + s + 0 = s 4 4−s2 s 4 s2 s Y (s) = 2 = 2 s = (s + 16) (s + 16) s(s2 + 16)

−

A

p

l

i

c

a

m

o

s

t

r

−

a

n

s

f

o

r

m

a

d

a

i

n

v

e

r

s

a

2 4 s −1 4 s −1 −1 = = s(s2 + 16) s(s2 + 16) (s2 + 16) s −1 = cos ωt ω=4 s2 + ω 2 s −1 = cos 4t 2 (s + 16) 4 −1 2 s(s + 16) ω −1 = sin ωt ω =4 2 s + ω2 t ´ t 4 1 1 −1 = 0 sin4τ dτ = cos4τ = cos4t 2 s(s + 16) 4 4 0 1 1 cos4t + 4 4 4 s2 1 1 3 1 −1 = cos4t + cos4t = cos4t + 2 s(s + 16) 4 4 4 4

  

L L L E

s

−

n

t

o



n

c

e

L



L



p

o

r

l

i

s

p

a

r

a



e

a

l

i

d

d

d

o

n

d

e





,

d

o

n

d

e

−



a

−L 



 

−

n

L

L



,



L

i



−

−



−

−



1 4

=

−

3 1 y = cos4x + 4 4 1

8

.

y A

p

l

i

c

a

m

o

s

l

a

t

r

a

 − 2y + 5y = 0 , n

s

f

o

r

m

a

d

a

d

e

L

a

y(0) = 2 , y (0) = 4;



p

l

a

c

e

a

l

a

e

c

u

a

c

i

ó

n

L [y − 2y + 5y] = L [0] L[y](s) = Y (s) L[y](s) = sY (s) − y(0) = sY (s) − 2 2 2 L[y](s) = s Y (s) − sy(0) − y(0) = s Y (s) − 2s − 4 s2 Y (s) − 2s − 4 − 2 [sY (s) − 2] + 5Y (s) = 0 s2 Y (s) − 2s − 4 − 2sY (s) − 4 + 5Y (s) = 0 Y (s) 2− − − Y (s)(s 2s + 5) 2s 8 = 0 Y (s)(s2 − 2s + 5) = 2s + 8 2s + 8 Y (s) = 2 (s − 2s + 5) U

s

A

l

F

a

s

t

o

m

s

s

t

h

u

o

u

c

A

e

a

o

s

a

r

i

i

c

e

t

m

o

r

u

z

a

r

f

t

o

r

s

i

a

m

r

e

m

a

o

l

o

u

c

s

l

s

t

s

u

s

a

a

n

d

s

y

l

u

a

e

d

m

e

o

d

e

e

s

x

s

s

a

r

e

o

i

f

o

a

l

r

s

e

m

e

o

n

o

o

n

m

r

l

s

s

a

t

r

n

e

j

a

r

r

p

p

l

a

t

s

f

s

d

e

a

n

s

l

d

a

e

e

c

L

u

a

a

p

c

i

l

ó

a

c

e

n

d

n

o

e

s

d

d

a

e

r

i

v

a

d

a

s

o

n

a

r

m

f

r

a

a

d

c

c

a

i

i

o

n

n

v

e

5

e

s

0

r

p

s

a

a

d

r

c

e

i

a

l

l

e

a

f

s

u

n

c

i

ó

n

r

a

c

i

o

n

a

l

Y (s) ,

p

a

r

a

s2 2s+5 (s 1)2 + 22 2s + 8 A(s Y (s) = = 2 2 (s 1) + 2 (s 2s + 8 = A(s 1) + 2B s = 1, 1 C

o

m

o

−

−

e

s

i

r

r

e

d

u

c

i

b

l

e

,

e

s

c

r

i

b

i

m

o

s

e

s

t

e

f

a

c

t

o

r

e

n

l

− − 2(−1) + 8 = A(−2) + 2B 6 = −2A + 2B 2(1) + 8 = A(0) + 2B B = 5 6 = −2A + 10 A = 2 2(s − 1) + 2(5) 2s − 2 + 10 2s + 8 Y (s) = = = (s − 1)2 + 4 (s − 1)2 + 4 (s − 1)2 + 4 a

e

c

e

n

e

m

o

l

p

s

r

i

f

o

r

m

a

(s α)2 +β 2

−

− 1) + 2B − 1)2 + 4

−

H

a

m

e

r

c

a

s

o

o

b

t

e

n

e

m

o

s

,

,

,

S

u

s

a

p

t

l

i

i

t

c

u

a

i

m

m

o

o

s

s

e

t



r

s

a

t

o

n

s

s

f

v

o

a

r

l

m

o

a

r

d

e

s

e

a

i



n

n

e

v

e

l

r

d

s

e

a

d



s 2 −1 + 4 −1 (s 1)2 + 4 (s t t f (t) = 2e cos2t + 4e sin2t

L

1

9

−

L

s

a

r

e

r

L

o

a

l

p

o

d

l

a

e

c

e

2 1)2 + 4

−

f

r

a

c

c

i

o

n

e

s

p

a

A

p

l

i

c

a

m

o

s

l

A

p

s

f

l

o

i

r

L−1

c

a

m



m

a

o

d

s

a

a

t



f (t) = L−1 n

a

l

e

s

.

.

s2 + 1

a

i

−1

  s2 W (s) − sw(0) − w(0) + W (s) = L[t2 ] + L[2] 2 2 W (s)(s2 + 1) − s + 1 = 3 + s s 2 2 + 2s W (s)(s2 + 1) = +s−1 s3 2(1 + s2 ) + s4 − s3 3 2 + 2s2 + s4 − s3 s W (s) = =

r

c



w + w = t2 + 2 , w(0) = 1 , w (0) =

t

r

e

s

n

s

f

o

r

m

a

v

e

o

e

r

r

e

s



m

a

a

s

.

a

i

n

v

e

r

+ −1

e

l

a

t

r

a

n

s

s

a

L 

−L 

2 s −1 + (s2 + 1) s(s2 + 1) f

o

r

m

a

d

a

d

e

l

a

i

n

t

e

g

r

a

l

p

a

r

1 (s2 + 1)

−1

a

l

a

s

d

o

s

p

´ t

2sin τ dτ = 2 cos τ t0 =

−2cos t + 2 =− − −2(sin τ − τ )|t0 = −2(sin t − t) = 2t − 2sin t ´ t 1 = 2 0 (τ − sin τ )dτ = 2( τ 2 + cos τ )|t0 = t2 + 2 cos t − 1 2 ´ t 2 1 1 = 0 (τ + 2 cos τ − 1)dτ = ( τ 3 + 2 sin τ − τ )|t0 = t3 + 2 sin t − t 3 3 ´ 2 t L−1 s(s2 + 1) = 0 2sin τ dτ = −2cos τ |t0 = −2cos t + 2 L−1 (s2 s+ 1) = cos t s3 (s2

=

d

d

L 

s3 (s2 + 1) t

n

a

2

l

i

2

r

s3 (s2 + 1)

0

|

+ 1) 2 0 [cos τ 1] dτ =

 

´ t

 

5

1

r

i

m

e

r

a

s



ejercicios-resueltos-ecuaciones-diferenciales

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