# How to make trigonometry code more efficient

I need help to make my code below more efficient, and to clean it up a little.

As shown in this image, x and y can be any point around the whole screen, and I am trying to find the angle t. Is there a way I can reduce the number of lines here?

Note: The origin is in the top left corner, and moving right/down is moving in the positive direction

``````o := MiddleOfScreenX - x;
a := MiddleOfScreenY - y;

t := Abs(Degrees(ArcTan(o / a)));

if(x > MiddleOfScreenX)then
begin
if(y > MiddleOfScreenY)then
t := 180 + t
else
t := 360 - t;
end
else
if(y > MiddleOfScreenY)then
t := 180 - t;
``````

The code is in pascal, but answers in other languages with similar syntax or c++ or java are fine as well.

``````:= sets the variable to that value
Abs() result is the absolute of that value (removes negatives)
Degrees() converts from radians to degrees
ArcTan() returns the inverse tan
``````
-

see this http://www.cplusplus.com/reference/clibrary/cmath/atan2/ for a C function.

atan2 takes 2 separate arguments, so can determine the quadrant.

pascal may have arctan2 see http://www.freepascal.org/docs-html/rtl/math/arctan2.html or http://www.gnu-pascal.de/gpc/Run-Time-System.html

``````o := MiddleOfScreenX - x;
a := MiddleOfScreenY - y;

t := Degrees(ArcTan2(o, a));
``````
-
Thank you very much for your help, yes that exact function exists and it works perfectly (once I take out the `Abs()`). –  putonajonny Jun 20 '12 at 21:40
I took out the abs, sorry about the bug. –  richard Jun 20 '12 at 21:48

The number of lines of code isn't necessarily the only optimization you need to consider. Trigonometric functions are costly in terms of the time it takes for a single one to finish its computation (ie: a single cos() call may require hundreds of additions and multiplications depending on the implementation).

In the case of a commonly used function in signal processing, the discrete Fourier transform, the results of thousands of cos() and sin() calculations are pre-calculated and stored in a massive lookup table. The tradeoff is that you use more memory when running your application, but it runs MUCH faster.

Please see the following article, or search for the importance of "precomputed twiddle factors", which essentially means calculating a ton of complex exponentials in advance.

In the future, you should also mention what you are trying to optimize for (ie: CPU cycles used, number of bytes of memory used, cost, among other things). I can only assume that you mean to optimize in terms of instructions executed, and by extension, the number of CPU cycles used (ie: you want to reduce CPU overhead).

-
Thank you very much, you have given me a lot to think about and look into. –  putonajonny Jun 20 '12 at 21:41
You should only need one test to determine what to do with the arctan.. your existing tests recover the information destroyed by `Abs()`.
`atan()` normally returns in the range -pi/4 to pi/4. Your coordinate system is a bit strange--rotate 90 deg clockwise to get a "standard" one, though you take `atan` of `x/y` as opposed to `y/x`. I'm already having a hard time resolving this in my head.
Anyways, I believe your test just needs to be that if you're in negative `a`, add 180 deg. If you want to avoid negative angles; add 360 deg if it's then negative.
Thanks for your help, the reason it look like it is x / y is because I want the angle to the vertical axis not the angle to the horizontal axis, yeah I was destroying the info using `Abs()` which is why I knew it was inefficient. –  putonajonny Jun 20 '12 at 21:43