Observe that AB can just be expressed as

```
ab = A + (B - A) * s
```

So, the direction of AB is `B - A`

, or `(B.x - A.x, B.y - A.y)`

. A line whose direction is `(A.y - B.y, B.x - A.x)`

will be perpendicular. (We just swap the x and y and negate one of them.)

We specifically want a line which is perpendicular to AB and also passes through P, so we do

```
perp = P + (A.y - B.y, B.x - A.x) * t;
perp = (P.x + A.y - B.y, P.y + B.x - A.x) * t;
```

Now just find the intersection between this perpendicular line and AB. You have two equations (for the x and y components of the intersection point) and two unknowns (s and t). Once you find s and t, plug them in to either of the lines' equations to get the intersection point.

Here is some working code:

```
static Vect2 getIntersection(Vect2 A, Vect2 B, Vect2 P) {
Vect2 abDir = B.minus(A);
Vect2 perpDir = new Vect2(-abDir.y, abDir.x);
Vect2 apDir = P.minus(A);
double s = (perpDir.y * apDir.x - perpDir.x * apDir.y)
/ (abDir.x * perpDir.y - abDir.y * perpDir.x);
return A.plus(abDir.scale(s));
}
class Vect2 {
final double x, y;
Vect2(double x, double y) {
this.x = x;
this.y = y;
}
Vect2 scale(double k) {
return new Vect2(x * k, y * k);
}
Vect2 plus(Vect2 that) {
return new Vect2(x + that.x, y + that.y);
}
Vect2 minus(Vect2 that) {
return this.plus(that.scale(-1));
}
}
```

dozensof times before. – BlueRaja - Danny Pflughoeft Mar 5 '12 at 16:43