Here's some more:

Vectors represent displacement. Displacement, translation, movement or whatever you want to call it, is meaningless without a starting point, that's why I referred to the "forward" vector above as "from the centroid," and that's why the "centroid vector," the vector with the x/y components of the centroid point doesn't make sense. Those components give you the displacement of the centroid point from the origin. In other words, pOrigin + vCentroid = pCentroid. If you start from the 0 point, then add a vector representing the centroid point's displacement, you get the centroid point.

Note that:

vector + vector = vector

(addition of two displacements gives you a third, different displacement)

point + vector = point

(moving/displacing a point gives you another point)

point + point = ???

(adding two points doesn't make sense; however:)

point - point = vector

(the difference of two points is the displacement between them)

Now, these displacements can be thought of in (at least) two different ways. The one you're already familiar with is the *rectangular* (x, y) system, where the two components of a vector represent the displacement in the x and y directions, respectively. However, you can also use *polar* coordinates, (r, Θ). Here, Θ represents the direction of the displacement (in angles relative to an arbitary zero angle) and r, the distance.

Take the (1, 1) vector, for example. It represents a movement one unit to the right and one unit upwards in the coordinate system we're all used to seeing. The polar equivalent of this vector would be (1.414, 45°); the same movement, but represented as a "displacement of 1.414 units in the 45°-angle direction. (Again, using a convenient polar coordinate system where the East direction is 0° and angles increase counter-clockwise.)

The relationship between polar and rectangular coordinates are:

**Θ = atan2(y, x)**

**r = sqrt(x²+y²)** (now do you see where the right triangle comes in?)

and conversely,

**x = r * cos(Θ)**

**y = r * sin(Θ)**

Now, since a line segment drawn from your triangle's centroid to the "tip" corner would represent the direction your triangle is "facing," if we were to obtain a vector parallel to that line (e.g. **vForward = pTip - pCentroid**), that vector's Θ-coordinate would correspond to the angle that your triangle is facing.

Take the (1, 1) vector again. If this was vForward, then that would have meant that your "tip" point's x and y coordinates were both 1 more than those of your centroid. Let's say the centroid is on (10, 10). That puts the "tip" corner over at (11, 11). (Remember, **pTip = pCentroid + vForward** by adding "+ pCentroid" to both sides of the previous equation.) Now in which direction is this triangle facing? 45°, right? That's the Θ-coordinate of our (1, 1) vector!