Solve the follow equation: y''+y={(t^2,0<=t<=1),(0, text( else)):} with the initial conditions y(0)=y′(0)=0

tragikovas

tragikovas

Answered question

2022-09-07

Try to solve the follow equation:
y + y = { t 2 0 t 1 , 0 else
with the initial conditions y ( 0 ) = y ( 0 ) = 0. I get an expresion for the laplace transfor of y:
L ( y ) = 1 e s s ( s 2 + 1 ) + 1 e s s 2 ( s 2 + 1 ) + 1 e s s 3 ( s 2 + 1 ) .

Answer & Explanation

Caiden Li

Caiden Li

Beginner2022-09-08Added 17 answers

As you know, L 1 ( e s F ( s ) ) = f ( t 1 ) H ( t 1 ) where H is the Heaviside function. So your question is really just about how to deal with 1 s n ( s 2 + 1 ) . If you don't want to actually do the partial fractions then you have to deal with convolutions instead, i.e. you have 0 t f ( s ) g ( t s ) d s where f is the inverse Laplace transform of 1 s n (which is proportional to t n 1 ) and g is the inverse Laplace transform of 1 s 2 + 1 which is of course sin ( t ). This is probably harder than just doing the partial fractions

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