# Computing which side of a line a point is [closed]

I looked at this question : stackoverflow question

I tried proving the accepted answer equation with trigonometry :

AB is the line, C is the point.

In the accepted answer of the above question, if the difference in equation is 0, then points are collinear, so in the above image, it proves it correct as theta is same, so far so good.

Then in the image below, c lies on right of line :

the fi angle is less than theta so the difference is positive. So in my program if I take > 0 as condition for the point on right, then the difference should always be greater than 0 if point is on right.

But my next figure shows that the even if the point is on right of the line, the difference can be negative :

In figure 3, even though the point is on right of the line, fi is greater than theta, so the diffrence is negative.

In accepted answer, if I take positive difference for point on right side, then the above case will give wrong results.

Where am I going wrong ?

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## closed as off topic by DarenW, Juhana, Tuxdude, martin clayton, Danubian SailorApr 3 '13 at 7:28

Questions on Stack Overflow are expected to relate to programming within the scope defined by the community. Consider editing the question or leaving comments for improvement if you believe the question can be reworded to fit within the scope. Read more about reopening questions here. If this question can be reworded to fit the rules in the help center, please edit the question.

Putting it as a ratio like that is an interesting twist, but most everyone else will be thinking directly in terms of cross products and the parallelogram formed by B-A and C-A. But never mind; this is math and therefore not ideal for SO. Try math.stackexchange.com –  DarenW Apr 3 '13 at 5:41