The general solution of the differential equation dydx+yg′(x)=g(x).g′(x), where g(x) is a given function of x, is
A
g(x)+log[1+y+g(x)]=c
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B
g(x)+log[1+y−g(x)]=c
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C
g(x)+log[1+y−g(x)]=c
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D
None of the above
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Solution
The correct option is Bg(x)+log[1+y−g(x)]=c We have, dydx=[g(x)−y].g′(x)Putg(x)−y=V⇒g′(x)−dydx=dVdx Hence, g′(x)−dVdx=V.g′(x)⇒dVdx=(1−V)g′(x)⇒dV1−V=g′(x)dx∫dV1−V=∫g′(x)dx⇒−log(1−V)=g(x)−c⇒g(x)+log(1−V)=c∴g(x)+log[1+y−g(x)]=c