How do I convert a 2x2 rotation matrix into a Euler angle? The rotation matrix is:

```
{{.46, .89}, {.89, -.46}}
```

Wikipedia instructs me that a 2D rotation matrix takes the form:

```
{{cos(a), -sin(a)}, {sin(a), cos(a)}}
```

Knowing that

```
{{cos(a), -sin(a)}, {sin(a), cos(a)}} = {{.46, .89}, {.89, -.46}}
```

I computed

```
{{inverseCos(a), -invereSin(a)}, {invereSin(a), inverseCos(a)}}
```

to get (these values were converted to degrees)

```
{{62.3, -62.3}, {62.3, 117.8}}
```

What am I supposed to do with these numbers? Aren't they supposed to be equal? The universe no longer makes sense to me.

can'tbe a 2D rotation matrix, since the top left and bottom right entries aren't equal, but they're always equal for a 2D rotation matrix. – Louis Wasserman Mar 22 '12 at 22:08