Question

What is `int_(0)^(1) 1/x^2dx`?

Answer 1

`int_0^1 1/x^2dx -> oo` and therefore is divergent.

Explanation:

In general, `intx^ndx = x^(n+1)/(n+1) + C`

Thus `int1/x^2dx = intx^(-2)dx = x^(-1)/(-1)+C = -1/x+C`

Now, as `1/x^2` is not continuous at `x=0`, we will need to set up an improper integral to continue.

`int_0^1 1/x^2dx = lim_(A->0^+)int_A^1 1/x^2dx`

`=lim_(A->0^+)[-1/x]_A^1`

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

`->oo`

meaning the integral is divergent.