Question

How do you differentiate `e^y sin(x) = x + xy`?

Answer 1

Using implicit differentiation.

Explanation:

`e^ysinx = x+xy`

Differentiating with respect to x, differentiate terms in y with respect to y, and multiply by `dy/dx`, and differentiate terms in x as per normal.

LHS: `e^y(dy/dx)sinx` + `e^ycosx` (using product rule)
RHS: `1+y+x(dy/dx)` (using product rule as well)

`e^y(dy/dx)sinx` + `e^ycosx` = `1+y+x(dy/dx)`

Make `dy/dx` the subject.

`e^y(dy/dx)sinx - x(dy/dx)` = `1+y-e^ycosx`
`dy/dx(e^ysinx - x)` = `1+y-e^ycosx`
`dy/dx` = `(1+y-e^ycosx)/(e^ysinx - x)`

I hope that helped!