# How to find points on the circumference of a arc knowing a start point, an end point and the radius?

Please see the image below for a visual clue to my problem:

I have the coordinates for points 1 and 2. They were derived by a formula that uses the other information available (see question: How to calculate a point on a circle knowing the radius and center point).

What I need to do now (separately from the track construction) is plot the points in green between point 1 and 2.

What is the best way of doing so? My Maths skills are not the best I have to admit and I'm sure there's a really simple formula I just can't work out (from my research) which to use or how to implement.

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Given point 1, the radius and `a`, could you plot point 2? –  Beta Jan 17 '13 at 17:10
what are the coordinates of 1, 2 and the centre? –  Rachel Gallen Jan 17 '13 at 17:13
0,112 ... etc just saw other question –  Rachel Gallen Jan 17 '13 at 17:15
Two questions: Is the `r` line always horizontal? Does the dotted line connected to point 2 also have length `r`? –  Kevin Jan 17 '13 at 17:21
@Kevin: I can answer the second question: yes, that's what "radius" means. –  Beta Jan 17 '13 at 17:23

In the notation of my answer to your linked question (i.e. x,y is the current location, fx,fy is the current 'forward vector', and lx,ly is the current 'left vector')

``````for (i=0; i<=10; i++)
{
xi=x+285.206*(sin(sub_angle)*fx + (1-cos(sub_angle))*(-lx))
yi=y+285.206*(sin(sub_angle)*fy + (1-cos(sub_angle))*(-ly))
// now plot green point at (xi, yi)
}
``````

would generate eleven green points equally spaced along the arc.

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As with your previous post you've been a massive help Chris. That's just what I was looking for. Thank you. –  jayfield1979 Jan 17 '13 at 17:43
it works well but how would I work out the new rotation to go with the new X and Y coordinates? –  jayfield1979 Jan 17 '13 at 20:48
ahhh got it: ai = a + sub_angle –  jayfield1979 Jan 17 '13 at 22:01

The equation of a circle with center (h,k) and radius r is

(x - h)² + (y - k)² = r² if that helps

check out this link for points http://www.analyzemath.com/Calculators/CircleInterCalc.html

The parametric equation for a circle is

x = cx + r * cos(a) y = cy + r * sin(a) Where r is the radius, cx,cy the origin, and a the angle from 0..2PI radians or 0..360 degrees.

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Due to the formula used to the generate the points (1 and 2 in this example) I do not know the centre point of these curves. Each curves position is relative to the previous piece of track which could be a curve or a straight. I suppose the centre point would be worked out but was hoping for a solution without resorting to too many calculations. –  jayfield1979 Jan 17 '13 at 17:42