I'm trying to get random point inside triangle in Java.

I have three points with x, y coordinates and trying to use this formula.

P = (1 - sqrt(r1)) * A + (sqrt(r1) * (1 - r2)) * B + (sqrt(r1) * r2) * C

Where r1 and r2 are random double from 0 to 1. But, how to define A, B, C? Because now A have x and y coordinates.

  • Anyway make A,B,C points, then write some method like multiplePoint(double x, Point y); which multiplies points y coordinates by double x – Tafari Oct 29 '13 at 9:36
P(x) = (1 - sqrt(r1)) * A(x) + (sqrt(r1) * (1 - r2)) * B(x) + (sqrt(r1) * r2) * C(x)
P(y) = (1 - sqrt(r1)) * A(y) + (sqrt(r1) * (1 - r2)) * B(y) + (sqrt(r1) * r2) * C(y)

More information can be found here math.stackexchange and this papaer


Here's another method to achieve this goal which is also introduced in Graphics Gems (Turk).

if (r1 + r2 > 1) {
    r1 = 1 - r1;
    r2 = 1 - r2;

a = 1 - r1 - r2;
b = r1; 
c = r2;

Q = a*A + b*B + c*C

This method cannot be extended to a higher dimensional space. If that is the case, you need to use your formula which is essentially Barycentric coordinates.


I would rather not use this formula wich involves square roots and thus, floating point errors + computation time. The following approach only uses multiplication and addition, wich makes it efficient, and more float-friendly. It is also quite easy to implement/understand :

Generating randomly uniformly a point in ABC : The idea is to generate a point in a parallelogram ABCD, and project the obtained point inside ABC.

enter image description here

  • pick a point p inside the parallelogram ABCD (D is the translation of A by vector AB + AC)

  • two cases :

    1) p is inside ABC, keep it

    2) p is outside ABC, pick p', its symetrical according to the middle of [BC]

Few additional details

  • Checking if a point is inside a triangle : How to determine if a point is in a 2D triangle? (in fact you only need to check on wich side of bc it is)

  • Random point p in parallelogram ABCD : let V1 (resp. V2) the vector from A to B (resp A to C). Point p is given by the translation of A by (r1 * V1 + r2 * V2) where r1 and r2 are two random double between 0 and 1.

  • Uniformity : The choosen point in the parallelogram is obviously uniformly choosen. Moreover every point in ABC can be "obtained" from two points in ABCD.

  • Simple and effective! Great! – Simone Lai Oct 21 at 15:44

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