Well, if your variables are:

```
C = (cx, cy) - Circle center
A = (x1, y1) - Tangent point 1
B = (x2, y2) - Tangent point 2
```

The lines from the circle center to the two points `A`

and `B`

are `CA = A - C`

and `CB = B - C`

respectively.

You know that a tangent is perpendicular to the line from the center. In 2D, to get a line perpendicular to a vector `(x, y)`

you just take `(y, -x)`

(or `(-y, x)`

)

So your two (parametric) tangent lines are:

```
L1(u) = A + u * (CA.y, -CA.x)
= (A.x + u * CA.y, A.y - u * CA.x)
L2(v) = B + v * (CB.y, -CB.x)
= (B.x + v * CB.y, B.x - v * CB.x)
```

Then to calculate the intersection of two lines you just need to use standard intersection tests.