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Question

The general solution of the differential equation (y2+e2x)dyy3dx=0 (C being the constant of integration), is

A
y2e2x+2lny=c
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B
y2e2x2lny=c
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C
y2e2x12y lny=c
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D
y2e2x12lny=c
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Solution

The correct option is A y2e2x+2lny=c
dxdy=y2+e2xy3dxdy=1y+e2xye2xdxdye2x1y=1y3Lete2x2=u
sothat e2xdxdy=dudydudy+2yu=1y3
I.F.=e2ydy=e2lny=y2
Solution is u.y2=1ydy+k
uy2=lny+ke2x2y2=lny+ke2xy2=2lny+2k e2xy2+2lny=constant

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