# 2D space: how to know whether we are going in the right direction?

Probably an easy/stupid problem.

Let's say we have a given orientation vector that constitutes the general direction in which we want to go. In 2D space.

Now let's say we have a point, P1, and a second point, P2. How can I determine whether a movement from P1 to P2 is going forward or backward, relatively to the orientation vector?

thank you

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do you have a context where we can apply this? –  cctan Feb 3 '12 at 7:17
direction.dot(P2-P1) if it's positive than you are going forward, otherwise backward. It's the dot product that I mean en.wikipedia.org/wiki/Dot_product –  PeterT Feb 3 '12 at 7:18
dragging the mouse cursor in a specific direction. Going towards that direction makes a value increase, going backwards makes the value decrease. @PeterT Thanks –  user1070447 Feb 3 '12 at 7:18

Compute the distance from P1 and P2 to your current position

d1 = sqrt((p1.x-c.x)^2 + (p1.y-c.y)^2)
d2 = sqrt((p2.x-c.x)^2 + (p2.y-c.y)^2)

where c(x,y) is your current position; then compute

r = d1 / (d1+d2)

r will range from 1 to 0. When it reaches 1 it means that it's on top of P1 and when it reaches 0 it means it's on top of P2 (or viceversa)

To know whether you're getting closer or not just compare your old r with the new one

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