There is **no need** to calculate angles or use trigonometric functions here, assuming you have a direction vector.

```
var pos_x, pos_y, dir_x, dir_y, target_x, target_y;
if ((pos_x - target_x) * dir_y > (pos_y - target_y) * dir_x) {
// Target lies clockwise
} else {
// Target lies anticlockwise
}
```

This simply draws an imaginary line through the object in the direction it's facing, and figures out which side of that line the target is on. This is basic linear algebra, so you should not need to use `sin()`

or `cos()`

etc. anywhere in this function, unless you need to calculate the direction vector from the angle.

This also uses a right-handed coordinate system, it will be backwards if you are using a left-handed coordinate system -- the formulas will be the same, but "clockwise" and "anticlockwise" will be swapped.

**Deeper explanation:** The function computes the outer product of the forward vector `(dir_x, dir_y)`

and the vector to the target, `(target_x - pos_x, target_y - pos_y)`

. The resulting outer product is a pseudoscalar which is positive or negative, depending on whether the target is clockwise or anticlockwise.

### Crash course on vectors

A vector is a **magnitude** and **direction**, e.g., 3 km north, or 6 centimeters down. You can represent a vector using **cartesian coordinates** (x, y), or you can represent it using **polar coordinates** (r,θ). Both representations give you the *same* vectors, but they use different numbers and different formulas. In general, you should stick with cartesian coordinates instead of polar coordinates. If you're writing a game, polar coordinates suck royally — they litter your code with `sin()`

and `cos()`

everywhere.

The code has three vectors in it:

The vector `(pos_x, pos_y)`

is the position of the object, relative to the origin.

The vector `(target_x, target_y)`

is the position of the target, relative to the origin.

The vector `(dir_x, dir_y)`

is the direction that the object is facing.