Question

How do you find `(dy)/(dx)` given `x^2sinx+y^2cosy=1`?

Answer 1

`(dy)/(dx)=-(x(2sinx+xcosx))/(y(2cosy-ysiny))`

Explanation:

differentiate both sides with respect to `""x""`. For the terms on the `" "LHS` the product rule will have to be employed twice.

`d/(dx)(x^2sinx+y^2cosy)=d/(dx)(1)`

`d/(dx)(x^2sinx)+d/(dx)(y^2cosy)=d/(dx)(1)`

`2xsinx+x^2cosx+2y(dy)/(dx)cosy+y^2(-siny)(dy)/(dx)=0`

now rearrange for `""(dy)/(dx)`

`(dy)/(dx)(2ycosy-y^2siny)=-(2xsinx+x^2cosx)`

`(dy)/(dx)=-(x(2sinx+xcosx))/(y(2cosy-ysiny))`