If (sin x)y = x + y, prove that 
Here
(sin x)y = x + y
Taking log both sides,
log (sin x)y = log(x + y)
y log(sinx)=log(x+y) [Using log 
=b log a]
Differentiating it with respect to x using the chain rule and product rule,
Hence Proved.
48
If (sin x)y = x + y, prove that
Here
(sin x)y = x + y
Taking log both sides,
log (sin x)y = log(x + y)
y log(sinx)=log(x+y) [Using log =b log a]
Differentiating it with respect to x using the chain rule and product rule,
Hence Proved.