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Question

The solution of the differential equation, dydx=(xy)2, when y(1)=1, is :

A
loge1x+y1+xy=2(x1)
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B
loge2y2x=2(y1)
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C
loge2x2y=xy
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D
loge1+xy1x+y=x+y2
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Solution

The correct option is A loge1x+y1+xy=2(x1)
dydx=(xy)2
Put xy=v
1dydx=dvdx (1)
dydx=v2 (2)

From (1) and (2)
1v2=dvdx
dv1v2=dx
Integrating both sides
dv1v2=dx

12log1+v1v=x+c

12log1+xy1x+y=x+c

At x=1,y=1
12log1=1+cc=1

12log1+xy1x+y=x1

log1x+y1+xy=2(x1)

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