I have two equations (Distance and slope of a line formula)

d = sqrt( (x2 - x1)^2 + (y2 - y1)^2 )

m = (y2 - y1) / (x2 - x1)

Known: d, m, x1, y1

Unknown: x2, y2

The problem is the distance equation isn't linear...

Is there a way to code this in java (using Android compatible libraries) to solve? I tried doing simple guessing but it is too slow.

Thanks

**EDIT: Code for triangle**

```
Point p1 = new Point();
Point p2 = new Point();
projection.toPixels(gp1, p1);
projection.toPixels(gp2, p2);
Point p3 = new Point();
double slope = (p2.y - p1.y) / (p2.x - p1.x);
double x = 0;
if (p2.y - p1.y >= 0 && p2.x - p1.x >= 0) {
x = - Math.sqrt(600 / (1 + slope*slope)) + p2.x;
} else if (p2.y - p1.y >= 0 && p2.x - p1.x < 0) {
x = Math.sqrt(600 / (1 + slope*slope)) + p2.x;
} else if (p2.y - p1.y < 0 && p2.x - p1.x >= 0) {
x = - Math.sqrt(600 / (1 + slope*slope)) + p2.x;
} else if (p2.y - p1.y < 0 && p2.x - p1.x < 0) {
x = Math.sqrt(600 / (1 + slope*slope)) + p2.x;
}
double y = -slope*p2.x + slope*x + p2.y;
p3.set((int) x, (int) y);
double inverseSlope = 0;
if (slope == 0) {
inverseSlope = Double.MAX_VALUE;
} else {
inverseSlope = -1 / slope;
}
x = -Math.sqrt(300 / (1 + inverseSlope*inverseSlope)) + p3.x;
y = -Math.sqrt(300 / (1 + inverseSlope*inverseSlope))*inverseSlope + p3.y;
Point p4 = new Point();
p4.set((int) x, (int) y);
x = Math.sqrt(300 / (1 + inverseSlope*inverseSlope)) + p3.x;
y = Math.sqrt(300 / (1 + inverseSlope*inverseSlope))*inverseSlope + p3.y;
Point p5 = new Point();
p5.set((int)x, (int) y);
Path path = new Path();
path.moveTo(p2.x, p2.y);
path.lineTo(p4.x, p4.y);
path.moveTo(p4.x, p4.y);
path.lineTo(p5.x, p5.y);
path.moveTo(p5.x, p5.y);
path.lineTo(p2.x, p2.y);
path.moveTo(p2.x, p2.y);
canvas.drawPath(path, mPaint);
```

It appears it is being caused by slope is always an integer so when it is < 1 it is 0 which is not good...

andthe resulting code. if you look at my code youll see it doesn't use anything besides the pyhthagorean theorem and the fundamental definition of the sinus. a final thought:name your variables! – kritzikratzi Mar 23 '12 at 16:08