# Finding points on a line [closed]

(This question could be better off on math, but im not sure)

http://i.imgur.com/TVINP.png

This is probably very simple but the way I'm thinking of doing it doesn't seem very easy and there must be a simpler method.I've got an image and I want to find some points that fall on a line so in this example image below the starting point of my line is (39,75) and the ending point is (75,142) from there I want to find 5 points (or any number really 5 is just an example) that are all on that line.

Is there some equation I can use that will get me a certain amount of points given any start and end coordinates?

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This is (really) a pure math question, but I'm glad you were able to get an answer. –  Tim Post Oct 26 '11 at 9:56

## closed as off topic by Tim Post♦Oct 26 '11 at 9:56

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Yes. Your line segment can be described by this equation:

``````x = 39 + t * (75 - 39)
y = 75 + t * (142 - 75)
``````

where, t can take on any value between 0 and 1.

So, to get random points on the line, just choose a random value for t (between 0 and 1), and calculate what x, y are.

The idea is, x is traveling from 39 to 75, while y is traveling from 75 to 142, and t represents the fraction of travel that has been completed.

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yes.

suppose (x0,y0) and (x1,y1) are the starting and ending points on the line.

t*(x0,y0) + (t-1)*(x1,y1) are also going to be points on that line where t ranges from 0 to 1.

note:

if t = 0, you get (x0,y0)

if t = 1, you get (x1,y1)

if t is any value inside (0,1) you get that "percentage" of the way from (x0,y0) to (x1,y1)

(if t = 0.5, you are halfway between the points)

this is what is often called "tweening" in computer graphics

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A line can be defined by the function `y = mx + b` where x and y are coordinates on the cartesian plane, m is the slope of the line defined by `(y2 - y1)/(x2 - x1)`, and b is the point where the line intersects the y-axis.