# How can I get the angle from a matrix

I got a rotation matrix like this:

``````1.0       0.0        0.0        2.07814
0.0      -0.809017   0.587785   0.0
0.0      -0.587785  -0.809017   0.0
0.0       0.0        0.0        1.0
``````

How can i get the angle from this? If I apply the inverse, i get this

``````cos exp -1 (-0.809017) = 144.0
sin exp -1 (-0.587785) = -36.0
sin exp -1 ( 0.587785) =  36.0
cos exp -1 (-0.809017) = 144.0
``````

But my problem is I know that the angle was 216.0 degrees, How do I get back that angle?

-
But -216° is the same as 144°? –  aib Mar 7 '13 at 5:33

I think you're computing inverse functions incorrectly in a manner that struck me as bizarre. You should use `asin` for the inverse sin and `acos` for the inverse cos. You're computing the multiplicative inverse, not the functional inverse. Although here, it appears to be the same thing.

Use the `atan2()` function. It will yield the angle from the y and x values. It implicitly computes the inverse sin and inverse cos, and it checks the signs of both y and x to discover the correct quadrant.

``` ATAN2(3)

NAME
1.8 `atan2', `atan2f'--arc tangent of y/x

SYNOPSIS
#include
double atan2(double Y,double X);
float atan2f(float Y,float X);

DESCRIPTION
`atan2'  computes  the  inverse tangent (arc tangent) of Y/X.  `atan2'
produces the correct result even for angles near pi/2 or -pi/2 (that
is, when X is near 0).

`atan2f' is identical to `atan2', save that it takes and returns `float'.

RETURNS
`atan2' and `atan2f' return a value in radians, in the range of -pi to pi.
```

I assume we're ignoring that 2.07814 that's clearly not part of the rotation. `atan2(0.587785, -0.809017)` gives me 144.0 degrees. `atan(-0.587785, -0.809017)` gives 216.0.

Aha! Your matrix is "sideways" from what I'm used to. The 2.07814 part is just a translation, I think. Using this 3d rotation matrix as a guide,

``````1  0   0
0  cos sin
0 -sin cos
``````

... leaves me just as confused as before. I keep getting 144.0.

A confession.

I glossed over the radians/degrees issue above, because I used Postscript instead of C.

``````\$ gsnd -q
GS>0.587785 -0.809017 atan =
144.0
GS>-0.587785 -0.809017 atan =
216.0
GS>
``````
-
Could you please tell me how to use it with that Matrix? Sorry but I Do not know the function atan2(). Thank you very much. –  Javier Ramírez Mar 7 '13 at 5:06
Well, this matrix got a collada model. Using 3D Studio Max and turning -216 degrees. (sorry was -216 degrees) –  Javier Ramírez Mar 7 '13 at 5:26
atan(-0.587785, -0.809017) * 180.0 / PI = -144.0 degrees, atan( 0.587785, -0.809017) * 180.0 / PI = 144.0 degrees –  Javier Ramírez Mar 7 '13 at 5:41
Thank you very much, friend ;-) –  Javier Ramírez Mar 7 '13 at 6:07
You're welcome. I'm embarrassed not to have seen that `mod 360` so generously illuminated by @Antoine. –  luser droog Mar 7 '13 at 6:13

To obtain the angle of rotation (theta) from a 3x3 rotation matrix (R) you can use the following formula:

tr(R) = 1 + 2 * cos(theta),

where tr is the trace.

In your example the rotation is given by:

``````1.00000   0.00000   0.00000
0.00000  -0.80902   0.58779
0.00000  -0.58779  -0.80902
``````

Hence the trace is

``````1 - 0.80902 - 0.80902 = -0.61804`
``````

and the angle is acos((-0.61804 - 1) / 2) * (180/pi) = 144°

Thus the matrix represents a counterclockwise rotation by 144°. Alternatively, as 144 = -216 mod 360, it represents a clockwise rotation by 216°.

-
+1 for solving the mystery of the 216! –  luser droog Mar 7 '13 at 6:10
Many thank you very much to you too friend. :-) –  Javier Ramírez Mar 7 '13 at 6:19