" 3.If "x(dy)/(dx)=y" (logy-logx+1),then...

" 3.If "x(dy)/(dx)=y" (logy-logx+1),then the solution of the equation is "

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If x(dy)/(dx)=y(log y -logx+1), then the solution of the equation is

Solve x(dy)/(dx)=y(logy-logx+1)

Solve x(dy)/(dx)=y(logy-logx+1)

Solve: x(dy)/(dx)=y(logy-logx-1)

Solve: x(dy)/(dx)=y(logy-logx-1)

If x dy/dx=y(logy-logx+1) , then the solution of the differential equation is (A) log(x/y)=Cy (B) log(y/x)=Cy (C) log(x/y)=Cx (D) log(y/x)=Cx

x(dy)/(dx)=y(logy-logx), where y=vx

Solve x((dy)/(dx))=y(logy-logx+1)

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