# Finding the angle between two lines [duplicate]

I need to find the angle between three points. I have point a and point c being the two points of my ray and I have point b being my central point that points a and c extend from. If I create a line between points b and a, and I create a line between points b and c, can I find the angle between the two lines.

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## marked as duplicate by BlueRaja - Danny Pflughoeft, jason, Robert Harvey♦Feb 9 '11 at 5:52

What does this have to do with Xcode? – Kevin Ballard Feb 9 '11 at 4:16
– BlueRaja - Danny Pflughoeft Feb 9 '11 at 4:23
What does this have to do with programming? – jason Feb 9 '11 at 4:25
@Jason: This is a fundamental problem in graphics (game) programming. One simple example: in a 2D game, to know if the enemy can see the player, one must calculate the angle between the enemy's position vector and the vector spanning between them (player_pos - enemy_pos). Programming is not just business logic :) – BlueRaja - Danny Pflughoeft Feb 9 '11 at 4:34
BlueRaja why do you even talk when you have nothing important to say – Blane Townsend Feb 9 '11 at 5:22

Take line a with direction vector A(a,a',a") and line b with direction vector B(b,b',b").

``````        A.B = ||A||.||B||.cos(t)

A.B
cos(t) = --------------
||A||.||B||
``````

Take A(1,2,3) ; B(4,5,6) ; C(3,2,0) Calculate the angle between the lines AB and AC. The line AB has a direction numbers (3,3,3) and line AC has direction numbers (2,0,-3). Hence

``````                6 + 0 - 9
cos(t) = -----------------
sqrt(27) .sqrt(13)
``````

UPDATE:

Use arccos(cos(t)) to obtain angle. to convert radians to degrees multiply by 180/π to convert degrees to radians multiply by π/180

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nice ascii art! – Matt Curtis Feb 9 '11 at 4:24
Has been copied from a book :) – Gustavo Costa De Oliveira Feb 9 '11 at 4:26
Missing a step. OP asks for the angle, not the cosine of the angle, unless of course he's working in radian instead of degrees. – kirakun Feb 9 '11 at 4:28
I updated my answer with final of solution – Gustavo Costa De Oliveira Feb 9 '11 at 4:38