Convert X,Y to polar coordinates using this:

Angle = arctan(y/x); Radius = sqrt(x * x + y * y);

Then Angle must be between StartingAngle and EndingAngle, and Radius between 0 and your Radius.

I know this question is old but none of the answers consider the placement of the arc on the circle.

This algorithm considers that all angles are between 0 and 360, and the arcs are drawn in positive mathematical direction (counter-clockwise)

First you can transform to polar coordinates: radius (R) and angle (A). Note: use Atan2 function if available. wiki

R = sqrt ((X - CenterX)^2 + (Y - CenterY)^2)

A = atan2 (Y - CenterY, X - CenterX)

Now if R < Radius the point is inside the circle.

To check if the angle is between StartingAngle (S) and EndingAngle (E) you need to consider two possibilities:

1) if S < E then if S < A < E the point lies inside the slice

2) if S > E then there are 2 possible scenarios

• if A > S and A > E

then the point lies inside the slice

• if A < S and A < E

then the point lies inside the slice

In all other cases the point lies outside the slice.

Check:

1. The angle from the centerX,centerY through X,Y should be between start&endangle.
2. The distance from centerX,centerY to X,Y should be less then the Radius

And you'll have your answer.