# Angle from vector

Say I have point A (20,20) and point B (60,60).

The resulting vector would be 40, 40. How could I get the angle of this vector?

By this I mean, imagine there is an imaginary circle around the origin.

I guess sort of what atan2 does but without atan2.

Thank

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What's wrong with `Math.atan2`? –  Ted Hopp Jun 3 '11 at 3:37
Without doing any calculations in my head I'm guessing the angle for the resulting vector (40,40) is `45` degrees or `π/4` radians... call it a hunch. –  Spoike Nov 26 '12 at 8:11

I'm not sure what you mean by angle, since you only give one vector in your example. But, given two vectors, you can find the angle between them like so:

Given vectors a and b, normalize both of them. Then, dot(a, b) = cos(θ), where θ is the angle between the two vectors. Use arccos to find θ.

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I think OP is asking about the polar angle of the difference vector `B-A`. At least that's the only way I see of coming up with (40, 40) as the "resulting vector". –  Ted Hopp Jun 3 '11 at 3:38