Eyeball theorem

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

eyeball theorem, red chords are of equal length
theorem variation, blue chords are of equal length

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 ${\displaystyle F'}$ and ${\displaystyle c_{Q}}$ at ${\displaystyle J'}$. Then, it turns out that ${\displaystyle |FF'|=|JJ'|}$.^[3]

References

1. Claudi Alsina, Roger B. Nelsen: Icons of Mathematics: An Exploration of Twenty Key Images. MAA, 2011, ISBN 978-0-88385-352-8, pp. 132–133
2. David Acheson: The Wonder Book of Geometry. Oxford University Press, 2020, ISBN 9780198846383, pp. 141–142
3. José García, Emmanuel Antonio (2022), "A Variant of the Eyeball Theorem", The College Mathematics Journal, 53 (2): 147-148.
4. Evans, G. W. (1938). Ratio as multiplier. Math. Teach. 31, 114–116. DOI: https://doi.org/10.5951/MT.31.3.0114.

Further reading

• 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

External links

• The Eyeball Theorem at cut-the-knot.org (contains a variety of proofs)
• Weisstein, Eric W. "Eyeball Theorem". MathWorld.
• Eyeball Theorem at Geometry from the Land of the Incas