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Say I have 2 tiles in a grid.

Tile1[x,y] //stationary thing

Tile2[x,y] //movable thing

Im treating them as circles each with a radius of 1 and trying to perform collision interaction.

I can determine distance and therefore IF theyre touching, but am stumped on determining something else (I dont know the word of the thing Im looking for). I want to be able to say "find a new point [x,y] that lies on the line Tile1->Tile2 but is 2.01 units away from Tile1".

I think I need to find the angle, then the hypotenuse length, and figure that hypotenuses length percent of 2, then multiply THAT number by x and y difference. Is there a better (or correct) way to do it?

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Should be on math.stackexchange.com –  winSharp93 Feb 22 '12 at 14:44
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2 Answers

up vote 2 down vote accepted
lNewPoint.x = Tile1.x + (Tile2.x - Tile1.x) * 2.01 / d;
lNewPoint.y = Tile1.y + (Tile2.y - Tile1.y) * 2.01 / d;

Where d is the distance from Tile1 to Tile2

A second collinear (the term you were looking for) point can be found at:

lNewPoint.x = Tile1.x - (Tile2.x - Tile1.x) * 2.01 / d;
lNewPoint.y = Tile1.y - (Tile2.y - Tile1.y) * 2.01 / d;

The solution assumes Tile1 and Tile2 are not identical. In that case d == 0 and the solution is a circle with Tile1 at its center and radius 2.01.

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I knew there was a word for it! Thank you! –  jason Feb 22 '12 at 15:05
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You don't need the hypotenuse length; once you have the angle (via atan2(), you can plug that into sin() and cos() to get the offset for unit distance, then multiply each by 2.01.

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