Question

What are the removable and non-removable discontinuities, if any, of `f(x)=(2x^2+4x-70)/(x-5)`?

Answer 1

`f` has a removable discontinuity at `5`.

Explanation:

`f(x)=(2x^2+4x-70)/(x-5)` is a rational function, so it is continuous on its domain which is all real numbers except `5`.

`f` has a discontinuity at `5`.

`lim_(xrarr5)f(x)= lim_(xrarr5)(2x^2+4x-70)/(x-5)`

`= lim_(xrarr5)(2(x-5)(x+7))/(x-5)`

`= lim_(xrarr5)2(x+7) = 2(5+7)`

So the limit at `5` exists, therefore the discontinuity at `5` is removable.