Use the Laplace transform to solve the given system of differential equations. frac{(d^2x)}{(dt^2)}+frac{(d^2y)}{(dt^2)}=frac{t}{2} frac{(d^2x)}{(dt^2)}-frac{(d^2y)}{(dt^2)}=4t x(0) = 5, x'(0) = 0, y(0) = 0, y'(0) = 0

allhvasstH

allhvasstH

Answered question

2021-01-25

Use the Laplace transform to solve the given system of differential equations.
(d2x)(dt2)+(d2y)(dt2)=t2
(d2x)(dt2)(d2y)(dt2)=4t
x(0)=5,x(0)=0,
y(0)=0,y(0)=0

Answer & Explanation

Daphne Broadhurst

Daphne Broadhurst

Skilled2021-01-26Added 109 answers

Step 1
Given that
(d2x)(dt2)+(d2y)(dt2)=t2(A)
(d2x)(dt2)(d2y)(dt2)=4t(B)
x(0)=5,x(0)=0,
y(0)=0,y(0)=0
adding equation( A) and (B)
2(d2x)(dt2)=(t2+4t)
(d2x)(dt2)=(t2+4t)2
(d2x)(dt2)=(t2)2+2t
Step 2
taking Laplace transform on both sides,
s2X(s)sx(0)x(0)=12+2s2+2s2
s2X(s)5s=1(s3)+2s2
s2X(s)=(1+2s+5s4)s5
X(s)=1s5+2s4+5s
taking Inverse Laplace transform
x(t)=t44!+(2t3)3!+5u(t)
Step 3
u(t)=1,t0
=0,t<0
x(t)=(t4)24+(t3)3+5 for t0
And Subtracting equation (B) from (A)
2(d2y)(dt2)=t24t
(d2y)(dt2)=(t24t)2=(t2)22t
Taking ILT
s2Y(s)sy(0)y(0)=122s32s2
s2Y(s)=1(s3)2(s2)=(12s)s3
Y(s)=(12s)s5
Step 4
Y(s)=1s52s(s5)
Y(s)=1s52(s4)
Taking Inverse Laplace Transform
y(t)=(t4)4!(2t3)3!
=(t4)24(t3)3

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