# Find the third point

I have 2 points `P1` and `P2`. I need to find the `P3`, in order that

• all points to be on the same line;
• `P3` should be at the distance `d` from the `P2` (away from `P1`)

I started a complicated system apparently hardly to resolve...

PS.

Vectorial answers is cool, but I use C# and don't know how to add vectors over there.

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math.stackexchange.com - maybe you find better answers ;-) –  Svisstack Nov 25 '10 at 20:58
You have only TWO points in a straight line that are at distance d of P2 !! –  belisarius Nov 25 '10 at 20:59
@Svisstack: perhaps I should transfer this question there, but don 't know how. –  serhio Nov 25 '10 at 21:00
Re vectors: Just break it up into x and y components, and operate on each. –  Ignacio Vazquez-Abrams Nov 25 '10 at 21:05
@serhio, they will (or should) eat you up there. Ignacio gave the right answer. `|P2 - P1| = sqrt((x1 - x2)^2 + (y1 - y2)^2)`. That's plenty to get the job done. –  aaronasterling Nov 25 '10 at 21:11

``````P3 = P2 + d * ±(P2 - P1) / |P2 - P1|
``````

EDIT:

Because shopping is easy:

``````mag = sqrt((P2x - P1x) ** 2 + (P2y - P1y) ** 2)
P3x = P2x + d * (P2x - P1x) / mag
P3y = P2y + d * (P2y - P1y) / mag
``````
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really I forgot the vector division...and why +- ? –  serhio Nov 25 '10 at 21:20
ignacio, dude, could you suggest a non-vectorial answer please... :"( I should recognize do not be a math man. –  serhio Nov 25 '10 at 21:27
Because there's two colinear points `d` away from `P2`: one away from `P1` (positive), and one towards `P1` (negative). –  Ignacio Vazquez-Abrams Nov 25 '10 at 21:28
thank you :) works like a charm... –  serhio Nov 25 '10 at 22:03

I have translated the code to Objective C

``````float distanceFromPx2toP3 = 1300.0;

float mag = sqrt(pow((px2.x - px1.x),2) + pow((px2.y - px1.y),2));
float P3x = px2.x + distanceFromPx2toP3 * (px2.x - px1.x) / mag;
float P3y = px2.y + distanceFromPx2toP3 * (px2.y - px1.y) / mag;

CGPoint  P3 = CGPointMake(P3x, P3y);
``````
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Thanks! That worked for me. (for other searchers, the keywords that I was trying to find this answer with: Bresenham line projection to 3rd point) –  Timothy Lee Russell Nov 15 '11 at 6:56