Question

How do you differentiate `sin(xy)=1/2`?

Answer 1

Here are two ways to do it.

Explanation:

The easy (trick) way

From `sin(xy)=1/2` we conclude that `xy = pi/6 + 2pik` for integer `k`.

So `d/dx(xy) = d/dx(pi/6 + 2pik)`. That is,

`y+x dy/dx = 0`, and

`dy/dx = -y/x`

The non-easy way

`d/dx(sin(xy)) = d/dx(1/2)`

`cos(xy)(d/dx(xy)) = 0`

`cos(xy)(y + x dy/dx) = 0`

Divide by `cos(xy)` (OK, since we know it is not `0`.)

to get

`y+x dy/dx = 0`, and

`dy/dx = -y/x`