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I know the coordinates of A, B and C.. I also know of a vector V originating from C..

I know that the vector intersects A and B, I just don't know how to find i.

Can anyone explain the steps involved in solving this problem?

Thanks alot.

share|improve this question
up vote 1 down vote accepted
i = C+kV
Lets call N the normal to the line A,B so N = [-(B-A).y, (B-A).x]
Also, for any point on the line:
(P-A)*N = 0       -- substitute from line 1 above:
(C+kV-A)*N = 0
(kV+C-A)*N = 0
kV*N + (C-A)*N = 0
kV*N = (A-C)*N
k = [(A-C)*N]/V*N
Now that we have k, plug it into line 1 above to get i.

Here I'm using * to represent dot product so expanding to regular multiplication:

k = ((A.x-C.x)*-(B.y-A.y) + (A.y-C.y)*(B.x-A.x)) / (V.x*-(B.y-A.y) + V.x*(B.x-A.x))
I.x = C.x + k*V.x
I.y = C.y + k*V.y

Unless I screwed something up....

share|improve this answer
Ah.. Dot products. They've been my savior before. – Kyle Feb 5 '10 at 21:30
I appreciate everyones help (alot!!), but I think this is what I needed, although I'm not 100% sure since I have not tested it. Thanks again. – Kyle Feb 5 '10 at 21:36
You did what I usually did and doubled up the same dimension at the last line (x). The likely culprit was probably copy & paste.. Ah, those can hurt! Obviously the last line should be C.y as you likely know. – Kyle Feb 5 '10 at 21:46
Worked like a charm. – Kyle Feb 5 '10 at 22:06
Good catch on the last line - Edited. Made it that far without error :-) – phkahler Feb 6 '10 at 15:11

If you know A and B, you know equation for the line AB, and you said you know V, so you can form the equation for Line V.... Well i is only point that satisfies both those equations.

Equation for Line AB:

  (bx-ax)(Y-ay) = (by-ay)(X-ax)

If you knpow the direction (or slope = m) of the vector, and any point that lies on the vector, then the equation of the line for vector V is

Y = mX = b

where m is the slope or direction of the line, and b is the y coordinate where it crosses thevertical y=axis (where X = 0)

if you know a point on the line (i.e., C = (s, t) then you solve for b by:

t = ms + b ==> b = t - ms,

so equation becomes

Y = mX + t-ms
share|improve this answer
In this case V is just a directional vector. I'm basically asking what equation(s) I would actually use to find intersect "i" given that direction from C. – Kyle Feb 5 '10 at 21:07
Obviously I realize you may have answered it already, but I'm not sure of what 'equations' you're referring to in your answer. – Kyle Feb 5 '10 at 21:08
if V is just a directional vector you can't solve this. You need to know not just the direction of the vector, but the point on C that it originates from (or any point that it goes through) The direction is the slope of the line m, and knowing any point on the line you can determine the equation of the line – Charles Bretana Feb 5 '10 at 21:19
It originates from C, that's it's origin. I appreciate your help on all this but I'm just not getting it. I can perceive better in step by step methodologies such as pseudo-code, C, or whatever. – Kyle Feb 5 '10 at 21:26
I had originally thought that I should somehow split this triangle into two right-triangles. From there I can see some trig solutions but I'm not exactly sure how to split it either.. – Kyle Feb 5 '10 at 21:27

Simple algebra. The hard part is often just writing down the basic equations, but once written down, the rest is easy.

Can you define a line that emanates from the point C = [c_x,c_y], and points along the vector V = [v_x,v_y]? A nice way to represent such a line is to use a parametric representation. Thus,

V(t) = C + t*V

In terms of the vector elements, we have it as

V(t) = [c_x + t*v_x, c_y + t*v_y]

Look at how this works. When t = 0, we get the point C back, but for any other value of t, we get some other point on the line.

How about the line segment that passes through A and B? One way to solve this problem would be to define a second line parametrically in the same fashion. Then solve for a system of two equations in two unknowns to find the intersection.

An easier approach is to look at the normal vector to the line segment AB. That vector is given as

N = [b_y - a_y , a_x - b_x]/sqrt((b_x - a_x)^2 + (b_y - a_y)^2)

Note that N is defined here to have a unit norm.

So now, when do we know if a point happens to lie along the line that connects A and B? This is easy now. That will happen when the dot product defined below is exactly zero.

dot(N,V(t) - A) = 0

Expand this, and solve for the parameter t. We can write it down using dot products.

t = dot(N,A-C)/dot(N,V)

Or, if you prefer,

t = (N_x*(a_x - c_x) + N_y*(a_y - c_y)) / (N_x*v_x + N_y*v_y))

And once we have t, substitute into the expression above for V(t). Lets see all of this work in practice. I'll pick some points A,B,C and a vector V.

A = [7, 3]
B = [2, 5]
C = [1, 0]

V = [1, 1]

Our normal vector N, after normalization, will look something like

N = [0.371390676354104, 0.928476690885259]

The line parameter, t, is then

t = 3.85714285714286

And we find the point of intersection as

C + t*V = [4.85714285714286, 3.85714285714286]

If you plot the points on a piece of paper it should all fit together, and all in only a few simple expressions.

share|improve this answer
Thanks a ton! Great work. – Kyle Feb 5 '10 at 22:25

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