Find the solution of the integral equation f(t) using Laplace transforms. f(t)=36t+5\int_0^t f(t-u)\sin(5u)du

Kye

Kye

Answered question

2021-09-17

Find the solution of the integral equation f(t) using Laplace transforms
f(t)=36t+50tf(tu)sin(5u)du

Answer & Explanation

lamanocornudaW

lamanocornudaW

Skilled2021-09-18Added 85 answers

Step 1
f(t)=36t+50tf(tu)sin(5u)du
f(t)=36t+5f(t)sin(5t)
L{f(t)}=36L{t}+5L{f(t)sin(5t)}
F(s)=36s2+5L{f(t)}L{sin(5t)}
=36s2+5F(s)5s2+25
F(s)5F(s)5s2+25=36s2
F(s)[15ss2+25]=36s2
F(s)[s25s+25s2+25]=36s2
F(s)=36s2×s2+25s25s+25
now, 36(s2+25)s2(s25s+25)=As+Bs2+Cs+Ds25s+25
36(s2+25)=As(s25s+25)+B(s25s+25)+(Cs+D)s2
s=0,36(25)=B(25) B=36
coefficient of s2,36=A5A+B+D
coefficient of s3,0=A+C
coefficient of s , 0=25A+(5)B

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