From what I've gathered, you want the following to hold:

- Horizontal line:
`P1 -------- P2`

=> 0°
- Horizontal line:
`P2 -------- P1`

=> 180°

## Rotating the horizontal line clockwise

You said, you want the angle to increase in clockwise direction.

Rotating this line `P1 -------- P2`

such that `P1`

is above `P2`

, the angle must thus be 90°.

If, however, we rotated in the opposite direction, `P1`

would be below `P2`

and the angle is -90° or 270°.

## Working with `atan2`

**Basis**: Considering `P1`

to be the origin and measuring the angle of `P2`

relative to the origin, then `P1 -------- P2`

will correctly yield `0`

.

```
float xDiff = x2 - x1;
float yDiff = y2 - y1;
return Math.Atan2(yDiff, xDiff) * 180.0 / Math.PI;
```

However, `atan2`

let's the angle increase in CCW direction.
Rotating in CCW direction around the origin, `y`

goes through the following values:

- y = 0
- y > 0
- y = 0
- y < 0
- y = 0

This means, that we can simply invert the sign of `y`

to flip the direction. But because C#'s coordinates increase from top to bottom, the sign is already reversed when computing `yDiff`

.