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In C the atan2 function has the following signature:

double atan2( double y, double x );

Other languages do this as well. This is the only function I know of that takes its arguments in Y,X order rather than X,Y order, and it screws me up regularly because when I think coordinates, I think (X,Y).

Does anyone know why atan2's argument order convention is this way?

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Why is this tagged as language-agnostic? –  mgroves Jun 25 '09 at 19:10
@mgroves It happens in many languages –  victor hugo Jun 25 '09 at 19:11
Because the same format appears in a LOT of languages. From the atan2 wiki entry: " It dates back at least as far as the FORTRAN programming language and is currently found in the C programming language's math.h standard library, the Java Math library, the C# static Math class, and elsewhere. Many scripting languages, such as Perl, include the C-style atan2 function.[1]" –  CookieOfFortune Jun 25 '09 at 19:11
I'm sorry it screws you up, but if it were (x,y) it would screw me up. –  Nosredna Jun 25 '09 at 19:19
I wrote my first Atan2() in BASIC in the 80's and was not aware of any conventions at the time (I thought I had invented sliced bread) and I made the arguments (x,y). Ever since then I get screwed up which way the arguments go. Maybe the OP had a similar experience. It is all a mater of what you are familiar with. –  ja72 Nov 24 '13 at 19:14

4 Answers 4

up vote 18 down vote accepted

Because I believe it is related to arctan(y/x), so y appears on top.

Here's a nice link talking about it a bit: Angles and Directions

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Some programmer in the mists of time decided it made sense that way. (And why is it 'atan2'? Why not 'angle_for'? I used to think it was arctangent-squared...) –  Alex Feinman Jun 25 '09 at 19:11
I think it makes a lot of sense... –  CookieOfFortune Jun 25 '09 at 19:14
Yeah, arctan(y/x) happens so often that if arctan2 took x,y it would screw me up all the time. It's nice to just change the slash to a comma. –  Nosredna Jun 25 '09 at 19:18
@alex - it's atan2 because it takes 2 arguments, to distinguish it from atan(), which expects you to do the y/x division beforehand. –  JustJeff Jun 27 '09 at 13:07
That's not the only reason, atan() does not handle the difference when both x and y are negative, whereas atan2() does. –  CookieOfFortune Jun 27 '09 at 14:07

My assumption has always been that this is because of the trig definition, ie that

tan(theta) = opposite / adjacent

When working with the canonical angle from the origin, opposite is always Y and adjacent is always X, so:

atan2(opposite, adjacent) = theta

Ie, it was done that way so there's no ordering confusion with respect to the mathematical definition.

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rise over run .... –  jlarson Jun 25 '09 at 19:05
Soh Cah Toa is my pnemonic :) –  Not Sure Jun 25 '09 at 19:12
good'ol 7th grade geometry, I still use it sometimes. –  CookieOfFortune Jun 25 '09 at 19:15
7th grade? You must not have gone to public school :) –  Not Sure Jun 25 '09 at 21:16

Suppose a rectangle triangle with its opposite side called y, adjacent side called x:

tan(angle) = y/x

arctan(tan(angle)) = arctan(y/x)

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It's because in school, the mnemonic for calculating the gradient
is rise over run, or in other words dy/dx, or more briefly y/x.

And this order has snuck into the arguments of arctangent functions.

So it's a historical artefact. For me it depends on what I'm thinking
about when I use atan2. If I'm thinking about differentials, I get it right
and if I'm thinking about coordinate pairs, I get it wrong.

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I wonder if it would be more clear if the variables were labeled dx and dy? –  CookieOfFortune Jun 25 '09 at 19:39

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