Wikipedia:Reference desk/Archives/Mathematics/2022 December 21

Mathematics desk
< December 20	<< Nov | December | Jan >>	Current desk >

Welcome to the Wikipedia Mathematics Reference Desk Archives
The page you are currently viewing is a transcluded archive page. While you can leave answers for any questions shown below, please ask new questions on one of the current reference desk pages.

December 21

Calculate distance between centers of circles given area of intersections

I need help checking my work. I'm working on a representation of multiple regression effect sizes using a Venn Diagram for educational policy research. I see that the area of a geometric lens has a closed form solution. Given a Venn diagram made from circles ${\displaystyle A}$ , ${\displaystyle B}$ , and ${\displaystyle C}$  with centers ${\displaystyle X}$ , ${\displaystyle Y}$ , and ${\displaystyle Z}$ , that ${\displaystyle r=R={\sqrt {1/\pi }}}$ , and ${\displaystyle A_{A\cap B}=0.23}$ , then ${\displaystyle d_{XY}\approx 0.429}$ . Can someone validate this? The Venn diagram is represented at this link here.Schyler (exquirito veritatem bonumque) 04:07, 21 December 2022 (UTC)[reply]

Circle ${\displaystyle C}$  has no role. I cannot replicate these numbers. When each circle passes through the centre of the other circle, so the circle centres are ${\displaystyle r\approx 0.56419}$  apart, a rhombus of two equilateral triangles fits within the lens. The area of this rhombus is ${\displaystyle {\tfrac {\sqrt {3}}{2\pi }}\approx 0.27566,}$  so when ${\displaystyle d_{XY}=0.429<r}$ , ${\displaystyle A_{A\cap B}>0.27566,}$  contradicting ${\displaystyle A_{A\cap B}\approx 0.23\,.}$  My calculations give me that distance ${\displaystyle d_{XY}=0.429}$  gets you ${\displaystyle A_{A\cap B}\approx 0.52785\,.}$  Conversely, to get lens area ${\displaystyle A_{A\cap B}=0.23\,,}$  I find we need ${\displaystyle d_{XY}\approx 0.73938\,.}$   --Lambiam 07:38, 21 December 2022 (UTC)[reply]

Yes, circle ${\displaystyle C}$  has no role. Let ${\displaystyle \theta }$  be the angle at X (or Y) between the lines to the junctions of ABD and of CEFG. The lens has area ${\displaystyle A=R^{2}\left(\theta -\sin \theta \right)}$ , where ${\displaystyle R={\sqrt {1/\pi }}}$ , and the diagram says ${\displaystyle A_{A\cap B}}$  (D+G) has area 0.03, so ${\displaystyle \theta -\sin \theta =0.03\pi }$ . That gives ${\displaystyle \theta \approx 0.8235}$  (in radians). The length from X (or Y) to the midpoint of XY is ${\displaystyle R\cos(\theta /2)}$ , and twice this gives ${\displaystyle d_{XY}\approx 1.0341}$ . My trig is rusty and I may have made some errors, but I think the principle and the order of magnitude are right. If ${\displaystyle A_{A\cap B}}$  were 0.23, we'd get ${\displaystyle \theta \approx 1.1377}$  and ${\displaystyle d_{XY}\approx 0.9507}$ . Certes (talk) 13:31, 21 December 2022 (UTC)[reply]

For ${\displaystyle \theta =0.8235,}$  we have ${\displaystyle (\theta -\sin \theta )/\pi \approx 0.02864,}$  not quite ${\displaystyle 0.03}$  but at least in the ballpark. But in the second case, you missed a factor ${\displaystyle \pi }$ : for ${\displaystyle \theta =1.1377,}$  we have ${\displaystyle \theta -\sin \theta \approx 0.23}$  while ${\displaystyle (\theta -\sin \theta )/\pi \approx 0.07322.}$   --Lambiam 15:52, 21 December 2022 (UTC)[reply]

Here are the calculations for lens area ${\displaystyle 0.23,}$  step by step:

${\displaystyle {\begin{array}{cccc}\theta &=&1.71254\\\sin \theta &=&\sin 1.71254&\approx &0.98997\\\theta -\sin \theta &\approx &1.71254-0.98997&\approx &0.72257\\(\theta -\sin \theta )/\pi &\approx &0.72257/3.14159&\approx &0.23000\\\cos(\theta /2)&\approx &\cos 0.85627&\approx &0.65526\\2R\cos(\theta /2)&\approx &2\times 0.56419\times 0.65526&\approx &0.73938\\\end{array}}}$ 

--Lambiam 16:03, 21 December 2022 (UTC)[reply]

Oops. Thanks, that looks more credible. Certes (talk) 18:40, 21 December 2022 (UTC)[reply]

Okay, well this is interesting. Yes, in the example, circle C has no role here. Someone said "When each circle passes through the centre of the other circle," but I do not think that is probable. Here were my steps:

Circles ${\displaystyle A}$ , ${\displaystyle B}$ , and ${\displaystyle C}$  have centers ${\displaystyle X}$ , ${\displaystyle Y}$ , and ${\displaystyle Z}$  and radii ${\displaystyle r_{A}=r_{B}=r_{C}={\sqrt {1/\pi }}}$ . The centers form ${\displaystyle \triangle XYZ}$  and intersect such that ${\displaystyle Area_{A\cap B}=0.03}$ , ${\displaystyle Area_{B\cap C}=0.11}$ , ${\displaystyle Area_{A\cap C}=0.23}$ 

${\displaystyle d_{1}={\overline {\rm {XY}}};d_{2}={\overline {\rm {XZ}}};d_{3}={\overline {\rm {YZ}}}}$ 

${\displaystyle Area_{A\cap C}=r_{A}^{2}\cos ^{-1}({\frac {d_{1}^{2}+r_{A}^{2}-r_{C}^{2}}{2d_{1}r_{A}}})+r_{C}^{2}\cos ^{-1}({\frac {d_{1}^{2}+r_{C}^{2}-r_{A}^{2}}{2d_{1}r_{C}}})-2\Delta }$ 

${\displaystyle \Delta ={\frac {1}{4}}{\sqrt {(-d_{1}+r_{A}+r_{B})(d_{1}-r_{A}+r_{B})(d_{1}+r_{A}-r_{B})(d_{1}+r_{A}+r_{B})}}}$ 

Simplifying:

${\displaystyle {\cancel {0.23=2({\frac {1}{\pi }}\cos ^{-1}({\frac {d_{1}^{2}}{2d_{1}{\sqrt {\frac {1}{\pi }}}}}))-{\frac {1}{2}}{\sqrt {(-d_{1}+2{\frac {1}{\pi }})(d_{1}+2{\frac {1}{\pi }})}}}}}$ 

oh I see this was my problem, I think... I distributed the 2 onto ${\displaystyle {\frac {1}{4}}\Delta }$ 

${\displaystyle {\cancel {0.23=2({\frac {1}{\pi }}\cos ^{-1}({\frac {d_{1}^{2}}{2d_{1}{\sqrt {\frac {1}{\pi }}}}}))-{\frac {1}{4}}{\sqrt {(-d_{1}+2{\frac {1}{\pi }})(d_{1}+2{\frac {1}{\pi }})}}}}}$ 

Update: well, here i am checking my own work again. i found another error. i deleted some values of d within ${\displaystyle \Delta }$ . I should know better than to ask for help right away... i can do this... but the doubt is strong in this one

${\displaystyle {\cancel {0.23=2({\frac {1}{\pi }}\cos ^{-1}({\frac {d_{1}^{2}}{2d_{1}{\sqrt {\frac {1}{\pi }}}}}))-{\frac {1}{4}}{\sqrt {(-d_{1}+2{\frac {1}{\pi }})(d_{1}+2{\frac {1}{\pi }})}}}}}$ 

no that's wrong too, ${\displaystyle r={\sqrt {\frac {1}{\pi }}}}$ ... i got it mixed up in ${\displaystyle \Delta }$  again...

You can shift two equal-sized circles such that each passes through the other's centre; I used this special case merely to easily establish bounds that were violated by a purported solution.

The function ${\displaystyle f(\theta )=(\theta -\sin \theta )/\pi }$  is transcendental, and one cannot hope to solve the equation ${\displaystyle f(\theta )=x}$  by a combination of algebraic and trigonometric manipulations for rational values of ${\displaystyle x,}$  except when ${\displaystyle x}$  is an integer, in which case the equation is solved by ${\displaystyle \theta =x\pi .}$   --Lambiam 09:01, 22 December 2022 (UTC)[reply]