Question

How do you differentiate `g(z)=(z^2+1)/(x^3-5)` using the quotient rule?

Answer 1

`(-z^4 - 3z^2 -10z)/(z^6 - 10z^3 +25)`

Explanation:

The quotient rule can be stated as;

`d/dz f(z)/g(z) = (f'(z)g(z) - f(z)g'(z))/g^2(z)`

We can choose our `f(z)` and `g(z)` and take each derivative separately. We only need the power rule here.

`f(z) = z^2+1`
`f'(z) = 2z`

`g(z) = z^3-5`
`g'(z) = 3z^2`

Now we have all of the pieces we need, we can plug them into our power rule function.

`(2z(z^3-5) - 3z^2(z^2+1))/(z^3-5)^2`

Now we can simplify our terms.

`(2z^4 - 10z - 3z^4 - 3z^2)/(z^6-10z^3 +25)`

`(-z^4 - 3z^2 -10z)/(z^6 - 10z^3 +25)`