# Solve system of two equations in Android / java

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...

-
Your parenthesis don't match, do you mean: sqrt((x2 - x1)^2 + (y2 - y1)^2) * m = (y2-y1)/(x2 -x1) –  Monkeyless Mar 22 '12 at 17:51
please don't change your question after having the answer accepted, just start a new question next time ... –  kritzikratzi Mar 23 '12 at 15:41
alright, so here's some code that does what you actually want to: studio.sketchpad.cc/WjZ7UqIq4F when you deal with orientation in space it's generally a bad idea to use slopes because you will have to deal with all the corner cases (infinite and zero) explicitly most of the times. think in terms of vectors - ie points, angles and distances - instead. it will simplify your equations on paper and the 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
Thank you very much - good to know. –  user1154920 Mar 23 '12 at 17:23

Define

x = x2-x1

and

y = y2-y1

Then

m * x = y

and

d^2 = x^2 + m^2 * x^2 = (1 + m^2) * x^2

Therefore

x = sqrt(d^2 / (1 + m^2))

then

x2 - x1 = sqrt(d^2 / (1 + m^2))

so

x2 = sqrt(d^2 / (1 + m^2) + x1

Similarly

y = sqrt(d^2 / (1 + m^2)) * m

y2 = sqrt(d^2 / (1 + m^2)) * m + y1

x2 = sqrt(d^2 / (1 + m^2)) + x1

y2 = sqrt(d^2 / (1 + m^2)) * m + y1

-
Looks good.. Thanks very much! –  user1154920 Mar 22 '12 at 18:22