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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

2 Answers 2

up vote 2 down vote accepted

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

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