Solve the differential equation. (x and y are variables) (D^2+4D)y=1+2x+3x^2

CoormaBak9

CoormaBak9

Answered question

2021-09-14

Solve the differential equation. (x and y are variables)
(D2+4D)y=1+2x+3x2

Answer & Explanation

toroztatG

toroztatG

Skilled2021-09-15Added 98 answers

Given differential equation is (D2+4D)y=1+2x+3x2 - (1)
y4y=1+2x+3x2
The auxillary equation is
m2+4m=0
Step 2
m2+4m=0
m(m+4)=0
m=0.m=4
yc=c1e0x+c2e4x
yc=c1+c2e4x
Then yp=Ax2+Bx by using method of undetermined coefficient
yp=2Ax+B
yp2A
Then yp4yp=1+2x+3x2
2A+2Ax+B=1+2x+Bx2
(2A+B)+2Ax=3x2+2x+1
Comparing the coefficients
Step 3

2A=2.A=1
2A+B=12(1)+B=1
B=12
B=1
Then yp=x2x
The general general solution is
y=yc+yp
y+c1+c2e4x+x2x Isregmined solution

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