Butterfly theorem

The butterfly theorem is a classical result in Euclidean geometry, which can be stated as follows:[1]^{:p. 78}

Butterfly theorem

Let $M$ be the midpoint of a chord $PQ$ of a circle, through which two other chords $AB$ and $CD$ are drawn; $AD$ and $BC$ intersect chord $PQ$ at $X$ and $Y$ correspondingly. Then $M$ is the midpoint of $XY$ .

Proof

Proof of Butterfly theorem

A formal proof of the theorem is as follows: Let the perpendiculars $XX'$ and $XX″$ be dropped from the point $X$ on the straight lines $AM$ and $DM$ respectively. Similarly, let $YY'$ and $YY″$ be dropped from the point $Y$ perpendicular to the straight lines $BM$ and $CM$ respectively.

Since

\triangle MXX'\sim \triangle MYY',

{MX \over MY}={XX' \over YY'},

\triangle MXX''\sim \triangle MYY'',

{MX \over MY}={XX'' \over YY''},

\triangle AXX'\sim \triangle CYY'',

{XX' \over YY''}={AX \over CY},

\triangle DXX''\sim \triangle BYY',

{XX'' \over YY'}={DX \over BY}.

From the preceding equations and the intersecting chords theorem, it can be seen that

\left({MX \over MY}\right)^{2}={XX' \over YY'}{XX'' \over YY''},

{}={AX\cdot DX \over CY\cdot BY},

{}={PX\cdot QX \over PY\cdot QY},

{}={(PM-XM)\cdot (MQ+XM) \over (PM+MY)\cdot (QM-MY)},

{}={(PM)^{2}-(MX)^{2} \over (PM)^{2}-(MY)^{2}},

since $PM = MQ$ .

So

{(MX)^{2} \over (MY)^{2}}={(PM)^{2}-(MX)^{2} \over (PM)^{2}-(MY)^{2}}.

It can be concluded that $MX = MY$ , or $M$ is the midpoint of $XY$ .

Other proofs exist,[2] including one using projective geometry.[3]

History

Proving the butterfly theorem was posed as a problem by William Wallace in The Gentlemen's Mathematical Companion (1803). Three solutions were published in 1804, and in 1805 Sir William Herschel posed the question again in a letter to Wallace. Rev. Thomas Scurr asked the same question again in 1814 in the Gentlemen's Diary or Mathematical Repository.[4]

References

Johnson, Roger A., Advanced Euclidean Geometry, Dover Publ., 2007 (orig. 1929).
Martin Celli, "A Proof of the Butterfly Theorem Using the Similarity Factor of the Two Wings", Forum Geometricorum 16, 2016, 337–338. http://forumgeom.fau.edu/FG2016volume16/FG201641.pdf
, problem 8.
William Wallace's 1803 Statement of the Butterfly Theorem, cut-the-knot, retrieved 2015-05-07.

External links

The Butterfly Theorem at cut-the-knot
A Better Butterfly Theorem at cut-the-knot
Proof of Butterfly Theorem at PlanetMath
The Butterfly Theorem by Jay Warendorff, the Wolfram Demonstrations Project.
Weisstein, Eric W. "Butterfly Theorem". MathWorld.

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[Johnson-1] Johnson, Roger A., Advanced Euclidean Geometry, Dover Publ., 2007 (orig. 1929).

[2] Martin Celli, "A Proof of the Butterfly Theorem Using the Similarity Factor of the Two Wings", Forum Geometricorum 16, 2016, 337–338. http://forumgeom.fau.edu/FG2016volume16/FG201641.pdf

[3] , problem 8.

[4] William Wallace's 1803 Statement of the Butterfly Theorem, cut-the-knot, retrieved 2015-05-07.