Let `(xP, yP)`

be the intersection of the tangents, `(xC,yY)`

be the center of the circle, where you are looking for the coordinates `(xT,yT)`

of the tangent points. Further more let `T`

be the vector of the tangent and `R`

be the vector of the radius. Since they are perpendicular, you have `R . T = 0`

.

This gives us

```
(xT-xC,yT-yC) . (xT-xP, yT-yP) = 0
```

Let `r`

be the radius of the circle and let `x:=xT-xC, y:=yT-yC, xp:=xP-xC, yp:=yP-yC`

(basically, we move the circle into `(0,0)`

).
The tangent point is on the circle, so you have `x²+y²=r²`

and thus also `y=sqrt(r²-x²)`

.

The variable substitution applied to the above equation gives us:

```
(x,y) . (x-xp, y-yp) = 0
x²-xp*x + y²-yp*y = 0
```

Using the circle information we have:

```
r² -xp*x - yp*sqrt(r²-x²) = 0
r² -xp*x = yp*sqrt(r²-x²)
r^4 - 2*r²*xp*x + xp²*x² = yp²*(r²-x²)
(yp²+xp²)*x² - 2*r²*xp*x + r^4-yp²*r² = 0
now let a:=yp²+xp², b:=2*r²*xp, c:= (r²-yp²)*r²
=> ax² + bx + c = 0
```

This is a quadratic equation with 0, 1 or 2 solutions. 0, if P is *in* the circle, 1, if P is *on* the circle and 2, if P is *outside* the circle.

I won't put the explicit solution here, since it's a hell of a formula and it's a lot easier to write, if you map the variables introduced here to variables in your code as:

```
var sq:Function = function (f:Number) { return f*f; }, sqrt:Function = Math.sqrt;
var xp:Number = xP-xC, yp:Number = yP-yC,
a:Number = sq(xp)+sq(yp), b:Number = 2*sq(r)*xp, c:Number = sq(r)*(sq(r)-sq(yp));
var x1:Number = (-b+sqrt(sq(b)-4*a*c)) / (2 * a),
x2:Number = (-b+sqrt(sq(b)-4*a*c)) / (2 * a);
if (isNan(x1)) return [];
var p1:Point = new Point(x1+cX, sqrt(sq(r)-sq(x1))+cY),//calculate y and undo shift
p2:Point = new Point(x2+cX, sqrt(sq(r)-sq(x2))+cY);
return p1.equals(p2) ? [p1] : [p1, p2];
```

Best of luck with this, because I am very bad with calculus, plus it's 04:00 here, so you can bet, there's a mistake somewhere, but it should get you in the right direction ;)