Find the inverse Laplace of Y=ce^((s^2)/2)(1/(s^2))(1+5e^(-(s^2)/2))

pin1ta4r3k7b

pin1ta4r3k7b

Answered question

2022-11-07

Solve the ODE y + t y y = 0 when y(0)=0 and y′(0)=5 by Laplace transform
My try:
Y := L { y }
s ( s Y y ( 0 ) ) 5 + L { t y } Y = 0 s 2 Y 5 ( L { y } ) Y = 0
Y ( s 2 1 ) 5 ( Y + s Y ) = 0 Y ( s 2 2 ) 5 s Y = 0
Y + 2 s 2 s Y = 5 s Y = c e s 2 2 ( 1 s 2 ) ( 1 + 5 e s 2 2 )
Now, the problem is that I don't know how to find the inverse Laplace of Y = c e s 2 2 ( 1 s 2 ) ( 1 + 5 e s 2 2 )
Help with it

Answer & Explanation

Laura Fletcher

Laura Fletcher

Beginner2022-11-08Added 22 answers

You have made a mistake continue where you have stayed:
Y + 2 s 2 s Y = 5 s .
The integrating factor for this equation is s 2 e s 2 / 2 . Multiplying both sides we get
( s 2 e s 2 / 2 Y ( s ) ) = 5 s e s 2 / 2 .
Integrating we get
s 2 e s 2 / 2 Y ( s ) = 5 e s 2 / 2 Y ( s ) = 5 s 2 y ( t ) = 5 t .

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