The number of regions is 99.

We have to find the number of points.

The maximum number of regions formed by connecting n points of a circle can be described by the function:

$f\left(n\right)=\frac{1}{24}\left(n^4-6n^3+23n^2-18n+24\right)$

So, for 99 regions, $f\left(n\right)=99$.

We solve the equation:

 $\begin{array}{l}\frac{1}{24}\left(n^4-6n^3+23n^2-18n+24\right)=99\\ n^4-6n^3+23n^2-18n+24=24\left(99\right)\\ n^4-6n^3+23n^2-18n+24=2376\\ n^4-6n^3+23n^2-18n+24-2376=0\\ n^4-6n^3+23n^2-18n-2352=0\end{array}$

Using a graphing calculator, we solve this equation.

The two real zeros of the equation are -5.247 and 8.

n cannot be negative. So, n = 8.

The number of points is 8.