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How to get coordinates of a point in a coordinate system based on angle and distance

How to get coordinates of a point in a coordinate system when all I have is the origin coordinates (x, y) and the angle from the origin to the point and the distance from the origin to the point?

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Sounds like more of a math (algebra specifically) question, than a computing question. Do you know the formulae needed to calculate the new point? – Andrew Thompson Mar 26 '12 at 12:04
Depends on the type of the coordinate system, but most of the time using the simple trigonometric functions called sin(), cos(). – hovanessyan Mar 26 '12 at 12:05

You use `Math.cos`, `Math.sin` like this:

``````pointX = x + distance * Math.cos(angle)
pointY = y + distance * Math.sin(angle)
``````

Note that `Math.cos` and `Math.sin` assumes the argument is given in radians. If you have the angle in degrees, you would use `Math.cos(``Math.toRadians(angle)``)` for instance.

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+1: Since it actually uses Java-functions, which my answer did not :) – Hannes Ovrén Mar 26 '12 at 12:21
+1 for a complete answer... That is what experience is!!! – aProgrammer Mar 26 '12 at 12:42
How could this be modified for a 3D system? – helion3 Nov 27 '13 at 22:09

If `r` is the distance from origin and `a` is the angle (in radians) between x-axis and the point you can easily calculate the coordinates with a conversion from polar coordinates:

``````x = r*cos(a)
y = r*sin(a)
``````

(this assumes that origin is placed at `(0,0)`, otherwise you should add the displacement to the final result).

The inverse result is made by computing the modulo of the vector (since a distance + angle make a vector) and the arctangent, which can be calculated by using the `atan2` funcion.

``````r = sqrt(x*2+y*2)
a = atan2(y,x)
``````
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``````px = x + r * cos(phi)
py = y + r * sin(phi)
``````

where `[px py]` is the point you are searching for, `[x y]` is the "origin", `r` is the distance and `phi` is the angle to the target from the origin.

EDIT: http://en.wikipedia.org/wiki/Polar_coordinate_system This link which was helpfully posted by Bart Kiers could yield some background information.

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If d is the distance and A is the angle, than the coordnates of the point will be

(x+d*Cos(A), y+ d*Sin(A))

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This is wrong since it does not take into account that the point is offset some other arbitrary point (x,y). – Hannes Ovrén Mar 26 '12 at 12:20
@kigurai; Thanks for pointing it. Edited the code. It was in my mind while typing I dont know how I missed it... Anyways thanks once again... – aProgrammer Mar 26 '12 at 12:44