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>
```