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9. Superposition Principle: Let L[yl=y + y + xy, yı(x)=sinx ^yz(x)=x.If L[y] x = xsinx and L(y2 x)=x²+1 then use the superpo
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Answer #1

Solution:-

Given that

Superposition principle:

Let

L = [y] =y+y + ry

y_1=\sin x

Y2 = 2

L[y_1](x)=L[\sin x]

L[y_1](x)=(\sin x)'''+(\sin x)'+x(\sin x)

L[y_1](x)=-\cos x+\cos x+x\sin x

L[y_1](x)=x\sin x

L[y_2](x)=L[x]

L[y_2](x)=(x)'''+(x)'+x(x)

L[y_2](x)=1+x^2

L[y](x)=4x^2+4-6x\sin x

L[y](x)=4(1+x^2)-6(x\sin x)

L[y](x)=4L[y_2]-6L[y_1]

L[y]=L[4y_2-6y_1]

y=4y_2-6y_1

So,

y=4x-6\sin x

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