# When drawing an arc using CGContextAddArcToPoint(), what does (x1,y1) and (x2,y2) mean?

You can use the following code to draw an arc using Quartz:

``````CGContextMoveToPoint(context2, x, y);
CGContextAddArcToPoint(context2, x1, y1, x2, y2, r);
``````

In these functions, `(x,y)` is the starting point and `r` is the arc radius but what are `(x1,y1)` and `(x2,y2)`?

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Does developer.apple.com/library/IOs/#documentation/GraphicsImaging/… not explain it? Genuine question, it is a bit maths heavy if you're not into that. –  jrturton Jan 3 '12 at 8:58

`x1`: The x-value, in user space coordinates, for the end point of the first tangent line. The first tangent line is drawn from the current point to (x1,y1).

`y1`: The y-value, in user space coordinates, for the end point of the first tangent line. The first tangent line is drawn from the current point to (x1,y1).

`x2`: The x-value, in user space coordinates, for the end point of the second tangent line. The second tangent line is drawn from (x1,y1) to (x2,y2).

`y2`: The y-value, in user space coordinates, for the end point of the second tangent line. The second tangent line is drawn from (x1,y1) to (x2,y2).

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where `P1` is the point the path is currently at, `r` is the `radius` given to the function, and the red line is the line that addArcToPoint will draw. It won't draw to the second point at `x2, y2` it will stop at the end of the arc.

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Apparently I can't add the image here myself as I don't have a high enough rep. Sorry. –  James Snook Sep 25 '13 at 19:20
Nice image. I embedded this one but you should be able to do your next one (unless I remember the permissions correctly). +1 –  David Rönnqvist Sep 25 '13 at 20:01

Here's code I just built to solve this, approaching it from the center-of-circle perspective, with declarations and sample values:

``````CGPoint arcCenter = CGPointMake(30,20);
float arcLengthRad = M_PI_4; // Whatever, the full span of the arc in radians
float arcCenterRad = M_PI_2; // the angle of the center of the arc, in radians

float arcP1x = arcCenter.x + cosf(arcCenterRad)*arcP1hyp;
float arcP1y = arcCenter.y + sinf(arcCenterRad)*arcP1hyp;
float arcP2x = (arcP1x - arcP2tx)*-1 + arcP2tx;
float arcP2y = (arcP1y - arcP2ty)*-1 + arcP2ty;
arcP1x,
arcP1y,
arcP2x,
arcP2y,
``````

So the above code should produce a small, 45-degree angle arc at the top of a circle.

Edited: In response to a comment received, the super-concise code listed above is shown below, with comments and wrapped in a method (plus a minor adjustment to the arcP2 calculation)

``````/*

Use this method for building a circle with breaks at certain points,
for example to use other CGContext methods to draw notches in the
circle, or protruding points like gear teeth.

This method builds up the values to use in CGContextAddArcToPoint(),
which are the x and y coordinates of two points.  First  added to
the current point in context, form two lines that are the tangents of
the entry and exit angles of the arc.

This method's arguments define the length of the arc in radians, and
the position of start and end using the angle centerpoint of the arc.
This is useful when drawing a certain defined amount of gear teeth,
rotating around the circle.

It is beyond this method's scope to maintain or calculate the
centerpoint relative to an arbitrary current point in the context, because this
is primarily used for drawing a gear/notch circle.
*/
-(void)EOTContext:(CGContext*)context

/*
Calculate the hypotenuse of the larger, outer circle where the
points of the tangent lines would rest upon (imagine wrapping
the drawn circle in a bounding regular convex polygon of tangent
lines, then wrap that polygon in an outer circle)
*/

// Build first tangent point
CGPoint arcP1 = (CGPoint){
};

// Build the final endpoint of the arc
CGPoint arcP2final = (CGPoint){
};

// Build second tangent point using the first tangent point and the final point of the arc.
// This point is resting on the bounding outer circle like arcP1 is.
// This would also work using the final point itself, using the simple assignment of arcP2 = arcP2final;
//   or of course simply omitting arcP2 altogether.
CGPoint arcP2 = (CGPoint){
(arcP2final.x - arcP1.x) + arcP2final.x,
(arcP2final.y - arcP1.y) + arcP2final.y
};

// The following adds an arc of a circle to the current path, using a radius and tangent points.
arcP1.x,
arcP1.y,
arcP2.x,
arcP2.y,
}
``````
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Could you please explain how you did the calculations? –  Moxy Feb 14 '13 at 18:28
I had the specifics of the math written on a note pad when I calculated this, but threw the paper out after I had it all working! But it's not too challenging. Just knowing the context for using my specific code is important. It's useful for drawing a circle with notches in, by drawing it as a series of arcs, or drawing a gear, with teeth protruding, but the notch or teeth drawing is beyond the scope of the above code. –  Tom Pace Feb 15 '13 at 0:07
Thank you for the explanation! I'm gonna try to adapt it to my case! –  Moxy Feb 18 '13 at 8:37

I the apple documentation it described briefly.