Eyeball theorem

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The eyeball theorem is a statement in elementary geometry about a property of a pair of disjoined circles.

More precisely it states the following:^[1]

For two nonintersecting circles ${\displaystyle c_P}$ and ${\displaystyle c_Q}$centered at ${\displaystyle P}$ and ${\displaystyle Q}$ the tangents from P onto ${\displaystyle c_Q}$ intersect ${\displaystyle c_Q}$ at ${\displaystyle C}$ and ${\displaystyle D}$ and the tangents from Q onto ${\displaystyle c_P}$ intersect ${\displaystyle c_P}$ at ${\displaystyle A}$ and ${\displaystyle B}$. Then ${\displaystyle |AB|=|CD|}$.

The eyeball theorem was discovered in 1960 by the Peruvian mathematician Antonio Gutierrez.^[2] However without the use of its current name it was already posed and solved as a problem in an article by G. W. Evans in 1938.^[3] Furthermore Evans stated that problem was given in an earlier examination paper.^[4]

A variant of this theorem states that if one draws line ${\displaystyle FJ}$ in such a way that it intersects ${\displaystyle c_P}$ for the second time at ${\displaystyle F^{\prime }}$ and ${\displaystyle c_Q}$ at ${\displaystyle J^{\prime }}$, then it turns out that ${\displaystyle |F{F}^{\prime }|=|J{J}^{\prime }|}$.^[3]

There are some proofs for Eyeball theorem, one of them show that this theorem is a consequence of the Japanese theorem for cyclic quadrilaterals.^[5]

• Japanese theorem for cyclic quadrilaterals

• Antonio Gutierrez: Eyeball theorems. In: Chris Pritchard (ed.): The Changing Shape of Geometry. Celebrating a Century of Geometry and Geometry Teaching. Cambridge University Press, 2003, ISBN 9780521531627, pp. 274–280

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• Eyeball Theorem at Geometry from the Land of the Incas

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