How can I tell if a point belongs to a certain line?
Examples are appreciated, if possible.

In the simplest form, just plug the coordinates into the line equation and check for equality. Given:
Plug in X and Y:
So yes, the point is on the line. If your lines are represented in (X1,Y1),(X2,Y2) form, then you can calculate slope with:
And then get the YIntersect with this:
Edit: I fixed the YIntersect (which has been X1 / Y1 ...) You'll have to check that 


I just wrote an function which handles a few extra requirements since I use this check in a drawing application:



The best way to determine if a point R = (rx, ry) lies on the line connecting points P = (px, py) and Q = (qx, qy) is to check whether the determinant of the matrix
namely (qx  px) * (ry  py)  (qy  py) * (rx  px) is close to 0. This solution has several related advantages over the others posted: first, it requires no special case for vertical lines, second, it doesn't divide (usually a slow operation), third, it doesn't trigger bad floatingpoint behavior when the line is almost, but not quite vertical. 


I think Mr.Patrick McDonald put the nearly correct answer and this is the correction of his answer:
and of course there are many other correct answers especially Mr.Josh but i found this is the best one. Thankx for evryone. 


Given two points on the line
The norm of the vector The symbol Example



This is the equation of a line. x & y are the coordinates. Each line is characterized by its slope (m ) and where it intersects the yaxis (c). So given m & c for a line, you can determine if the point (x1, y1) is on the line by checking if the equation holds for x = x1 and y = y1 


If you have a line defined by its endpoints
and you have a point that you want to check
then you could define a function as follows:
and call it as follows:
You will need to check for division by zero though. 


A 2D line is generally represented using an equation in two variables x and y here is a well known equation Now imagine your GDI+ line is drawn from (0,0) to (100, 100) then the value of m=(0100)/(0100) = 1 thus the equation for your line is y0=1*(x0) => y=x Now that we have an equation for the line in question its easy to test if a point belongs to this line. A given point (x3, y3) belongs to this line if it satisfies the line equation when you substitute x=x3 and y=y3. For example the point (10, 10) belongs to this line since 10=10 but (10,12) does not belong to this line since 12 != 10. NOTE: For a vertical line the value of the slope (m) is infinite but for this special case you may use the equation for a vertical line directly x=c where c = x1 = x2. Though I have to say I am not sure if this is the most efficient way of doing this. I will try and find a more efficient way when I have some more time on hand. Hope this helps. 


Equation of the line is:
So a point(a,b) is on this line if it satisfies this equation i.e. 


Could you be more specific? What programming language are you talking about? What environment are you talking about? What "lines" are you talking about? Text? What point? XY on the screen? 


As an alternative to the
The first check If those values are equal, we check from the perspective of the endpoint. Simple and handles horizontal, vertical and all else in between. 

