I am currently working on a navigation system using way-points, We can define the following perimeters, assume point B is where we want to go and point A is your current location :

  • We know the locations (X,Y) of both points A & B.
  • Point A (you) and Point B (our destination) are both positive in their respective X and Y values.
  • We know the angle Point A (you) are facing. (360 - 0 degrees)

My question is how would I get the smallest angle to turn in order to face point B (our destination)?

My current method is using ArcTan2(X,Y)

B := ArcTan2(Y1 - Y2,X1 - X2)

B := B * 180 / pi ---- To convert radians into degrees.

This does return a suitable angle, but only sometimes... Other times it returns an angle that will make me face the opposite direction of point B (our destination).

Another issue I am having is figuring out if I should turn left or right - Assume we have a returned angle of 80 degrees, Should that then mean that I rotate to the left or the right ?

I hope my explanation is somewhat clear, Trigonometry was never really my strong point.

I'd be very grateful for any input or sources you guys may be able to provide me.

Thanks MrClear

  • 4
    This is not a question about Delphi -- or programming. It is a question about mathematics. – Andreas Rejbrand Jan 20 at 12:23
  • Perhaps I did use the incorrect tags, This is my first post here. However ArcTan2 was originally developed specifically for programming langues meaning most use cases would revolve around a sort of program It seemed fitting. Apologizes – MrClear Jan 20 at 12:46
  • 1
    Please - it's "angle", not "angel". How can you write a system that depends entirely on trigonometry when you admit you know little about it? It seems futile to recommend vectors and cross products. – duffymo Jan 20 at 12:55
  • @duffymo This seems rather dramatic, The only value you've added to this thread is correcting my typos x_x, Forgive me for thinking this was a forum for learning ? – MrClear Jan 20 at 13:07
  • I can do a lot more than that, but I think it's reasonable to expect a base level of knowledge when one claims to be writing a system that uses trig heavily. It's not the mission of this site or the volunteers that frequent it to give you the basics. – duffymo Jan 20 at 13:12

You are using wrong X/Y argument order

B := ArcTan2(Y2 - Y1, X2 - X1)

is correct formula to get direction from 1st point to 2nd one.

If you really need angle to turn, you also have to provide current direction (or previous point)

Let you are moving from point A to point B and after B you need to turn onto point C. In this case you need calculate relative angle to change direction (this approach uses cross product of vectors):

 CBX := C.X - B.X; 
 CBY := C.Y - B.Y; 
 BAX := B.X - A.X; 
 BAY := B.Y - A.Y;

RotationAngle := 
  RadToDeg(ArcTan2(CBX * BAY - CBY * BAX, CBX * BAX + CBY * BAY));

Note that function returns signed angle and you can easily check whether you need to turn left or right. Also RadToDeg function helps to get degrees.

  • I am aware that in Arctan2 you place the y value first - However that isn't the case for all calculators or libraries... I believe in Delphi specifically (the program langue I am using) you pass X first. Never the less thanks for the reply. – MrClear Jan 20 at 12:27
  • You can read Delphi help about Arctan2 to be ensure in Y/X order here. – MBo Jan 20 at 12:28
  • Could you please elaborate on the previous point ? how would I go about adding that to equation. – MrClear Jan 20 at 12:43
  • @MrClear: Every time you use a new class or function in a library or API, you should read the class's or function's documentation. In this case, the documentation for Delphi's ArcTan2 function explains that the Y precedes the X. In the Delphi IDE, if you place your cursor in the ArcTan2 identifier and press F1, you are automatically taken to this documentation. – Andreas Rejbrand Jan 20 at 12:53
  • @AndreasRejbrand thank you for clearly structured response, I've been using : planetcalc.com/7954 as a proof of concept before writing it all in delphi so while that would have been any issue it's not current - Thanks for pointing it out – MrClear Jan 20 at 13:04

If you have two points (xA, yA) and (xB, yB), with point A as the start and point B as the destination, you have a vector from the start to the destination:

v = (xB-xA)i + (yB-yA)j

In a 2D coordinate system, with x-axis to the right and y-axis pointing up, this vector makes an angle with the horizontal axis that is easy to calculate:

angle = atan2((yB-yA), (xB-xA))


i = unit vector in x-direction

j = unit vector in y-direction

This angle is expressed in radians. It rotates from the horizontal axis counterclockwise about point A.

Watch for zero length vectors.

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