Question

How do you find the derivative of `[e^x / (1 - e^x)]`?

Answer 1

`y'=e^x/(1-e^x)^2`.

Explanation:

Let `y=e^x/(1-e^x)`.

To find `y'`, we will use the Quotient Rule , which states, :

`(u/v)'=(vu'-uv')/v^2`.

`y=e^x/(1-e^x)`

`rArr y'={(1-e^x)(e^x)'-e^x(1-e^x)'}/(1-e^x)^2`.

`={(1-e^x)(e^x)-e^x(1'-(e^x)')}/(1-e^x)^2`.

`={(1-e^x)e^x-e^x(0-e^x)}/(1-e^x)^2`.

`=(e^x-e^(2x)+e^(2x))/(1-e^x)^2`

`:. y'=e^x/(1-e^x)^2`.

Enjoy Maths.!