Question

How do you use the definition of a derivative to find f' given `f(x)=1/x^2` at x=1?

Answer 1

`-2`

Explanation:

`f(x) = 1/x^2`

The derivative is defined as:

`lim_(h->0)(f(x+h)-f(x))/h`

Which in our case would be:

`=lim_(h->0)(1/(x+h)^2-1/x^2)/h=lim_(h->0)(((x^2-(x+h)^2)/(x^2(x+h)^2)))/h`

`=lim_(h->0)(x^2-(x+h)^2)/(x^2(x+h)^2h)`

Substitute `x=1`:

`=lim_(h->0)(1^2-(1+h)^2)/(1^2(1+h)^2h)`

`=lim_(h->0)(1-(1+h)^2)/((1+h)^2h)=lim_(h->0)(1-1-2h-h^2)/((1+h)^2h)`

`lim_(h->0)(-2h-h^2)/((1+h)^2h)=lim_(h->0)(-(2+h)h)/((1+h)^2h)`

`lim_(h->0)(-(2+h))/((1+h)^2)`

Evaluate the limit:

`=-2/1=-2`