Tangent to two circles
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Hello everyone!
Have spent the enitre few days trying to figure this problem out, but Im going nowhere.
Problem is I have the coordinates for two circles C1(-1,1) and C2(2,2.5) with radius r1 = 1 and r2 = 1.5. Now I have to write a program that calculates the coordinates for the points of the outer common tangent (p1 and p2) to these two circles. I know there are many ways of doing so, one of them being that you write a system of equations with the help of these relations:
(p1-c1)*(p1-p2)=0 (the radius for the circles are perpendicular to the line between the circle centers)
(p2-c2)*(p1-p2)=0
and
Abs(p1-c1)^2=r1^2 (these conditions are so that the points are on the circles)
Abs(p2-c2)^2=r2^2
I'm thinking that you have to solve p1 and p2 from these equations but I just don't know how to do it. Please if anyone could help me I would be so very grateful!
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Accepted Answer
Roger Stafford
on 17 Nov 2014
Here is a direct matlab solution to your problem, Ramin, that does not involve iterative solution of equations. It just uses simple geometry. Let C1 = [a1,b1] and C2 = [a2,b2] be the two circles' centers and r1 and r2 their respective radii.
a21 = a2-a1; b21 = b2-b1;
d2 = a21^2+b21^2;
r21 = (r2-r1)/d2;
s21 = sqrt(d2-(r2-r1)^2)/d2; % <-- If d2<(r2-r1)^2, no solution is possible
u1 = [-a21*r21-b21*s21,-b21*r21+a21*s21]; % Left unit vector
u2 = [-a21*r21+b21*s21,-b21*r21-a21*s21]; % Right unit vector
L1 = [a1,b1]+r1*u1; L2 = [a2,b2]+r2*u1; % Left line tangency points
R1 = [a1,b1]+r1*u2; R2 = [a2,b2]+r2*u2; % Right line tangency points
As you move from C1 toward C2, L1 and L2 will be the two points of outer tangency of the line to the left and R1 and R2 the two tangency points of the line to the right.
More Answers (1)
pietro
on 16 Nov 2014
Edited: pietro
on 16 Nov 2014
Hi,
the 3rd and 4th equations shouldn't be as the folliwing, right?
p1^2-c1^2=r1^2
p2^2-c2^2=r2^2
you can use fsolve or solve if you need a symbolic solution. Anyway I think it might be easily solved by hand.
2 Comments
Matt J
on 16 Nov 2014
The equations should have reduced to linear ones, easily solvable using mldivide.
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