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Question

The solution of the differential equation dxdyxlogx1+logx=ey1+logx if y(1)=0, is :

A
xx=eyey
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B
ey=xey
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C
xx=yey
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D
none of these
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Solution

The correct option is A xx=eyey
dxdy=x log x1+log x=ey1+log x
(1+log x)dxdyx log x=ey
Put x log x=t
(1+log x)dxdt=dtdy
dtdtt=eyP=1, Q=ey
I.F. =edy=ey
t.ey=dy
t.ey=y+c
x log xey=y+c
y(1)=0c=0
x log xey=y
log xx=yey
xx=eyey

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