Let's say we have two rotated objects, there Euler-Angles are:

```
Object | x | y | z
1 | 180 | 360 | 180
2 | -360 | -720 | 360
```

Both use rotate order `XYZ`

. When rotation is zero the local `Y-axis`

is pointing up.

I'm trying to get the difference in Spins around their local `Y-axis`

. As if there would be a string between the bottoms of `Object 1`

and `Object 2`

connected when all orientations were `0,0,0`

. How many times would the string have spun around / twisted?

Some examples:

```
#1 | 0, 360, 0
#2 | 0, 0, 0
```

1 full twist

```
#1 | 0, 180, 0
#2 | 0, 0, 0
```

1/2 twist

```
#1 | 360, 0, 0
#2 | 0, 0, 0
```

1 twist. (think about the string that was attached to it, this would also count as a twist in the string)

--

I've been looking into orientation/rotation and it's different ways of using them, like Quaternions, Euler-Angles and Axis-Angle. I feel like I know how each work in general yet miss the skills for solving this.

Any ideas on how to solve this?