Difference between revisions of "Miquel's point"

Latest revision as of 23:10, 28 October 2023

Miquel and Steiner's quadrilateral theorem

Let four lines made four triangles of a complete quadrilateral. In the diagram these are $\triangle ABC, \triangle ADE, \triangle CEF, \triangle BDF.$

Prove that the circumcircles of all four triangles meet at a single point.

Proof

Let circumcircle of $\triangle ABC$ circle $\Omega$ cross the circumcircle of $\triangle CEF$ circle $\omega$ at point $M.$

Let $AM$ cross $\omega$ second time in the point $G.$

$CMGF$ is cyclic $\implies \angle BCM = \angle MGF.$

$AMCB$ is cyclic $\implies \angle BCM + \angle BAM = 180^\circ \implies$

$\angle BAG + \angle AGF = 180^\circ \implies AB||GF.$

$CMGF$ is cyclic $\implies \angle AME = \angle EFG.$

$AD||GF \implies \angle ADE + \angle DFG = 180^\circ \implies \angle ADE + \angle AME = 180^\circ \implies$

$ADEM$ is cyclic and circumcircle of $\triangle ADE$ contain the point $M.$

Similarly circumcircle of $\triangle BDF$ contain the point $M$ as desired.

vladimir.shelomovskii@gmail.com, vvsss

Circle of circumcenters

Let four lines made four triangles of a complete quadrilateral. In the diagram these are $\triangle ABC, \triangle ADE, \triangle CEF, \triangle BDF.$

Prove that the circumcenters of all four triangles and point $M$ are concyclic.

Proof

Let $\Omega, \omega, \Omega',$ and $\omega'$ be the circumcircles of $\triangle ABC, \triangle CEF, \triangle BDF,$ and $\triangle ADE,$ respectively.

In $\Omega' \angle MDF = \angle MBF.$

In $\omega' \angle MDE = \frac {\overset{\Large\frown} {ME}} {2}.$

$ME$ is the common chord of $\omega$ and $\omega' \implies \angle MOE = \overset{\Large\frown} {ME} \implies$

$\angle MO'o' = \frac {\overset{\Large\frown} {ME}} {2} = \angle MDE.$

Similarly, $MF$ is the common chord of $\omega$ and $\Omega' \implies \angle MDF = \angle Moo' = \angle MO'o'.$

Similarly, $MC$ is the common chord of $\Omega$ and $\omega' \implies \angle MBC = \angle MOo' \implies$

$\angle MOo' = \angle MO'o' \implies$ points $M, O, O', o,$ and $o'$ are concyclic as desired.

vladimir.shelomovskii@gmail.com, vvsss

Triangle of circumcenters

Let four lines made four triangles of a complete quadrilateral.

In the diagram these are $\triangle ABC, \triangle ADE, \triangle CEF, \triangle BDF.$

Let points $O,O_A, O_B,$ and $O_C$ be the circumcenters of $\triangle ABC, \triangle ADE, \triangle BDF,$ and $\triangle CEF,$ respectively.

Prove that $\triangle O_AO_BO_C \sim \triangle ABC,$ and perspector of these triangles point $X$ is the second (different from $M$ ) point of intersection $\Omega \cap \Theta,$ where $\Omega$ is circumcircle of $\triangle ABC$ and $\Theta$ is circumcircle of $\triangle O_AO_BO_C.$

Proof

Quadrungle $MECF$ is cyclic $\implies \angle AEM = \angle BFM \implies$ $\angle AO_AM = 2\angle AEM = 2 \angle BFM = \angle BO_BM.$ $\angle CO_CM = 2\angle CFM = 2 \angle BFM = \angle BO_BM.$ $AO_A = MO_A, BO_B = MO_B, CO_C = MO_C \implies \triangle AO_AM \sim \triangle BO_BM \sim \triangle CO_CM.$

Spiral similarity sentered at point $M$ with rotation angle $\angle AMO_A = \angle BMO_B = CMO_C$ and the coefficient of homothety $\frac {AM}{MO_A} = \frac {BM}{MO_B} =\frac {CM}{MO_C}$ mapping $A$ to $O_A$ , $B$ to $O_B$ , $C$ to $O_C \implies \triangle O_AO_BO_C \sim \triangle ABC.$

$\triangle AO_AM, \triangle BO_BM, \triangle CO_CM$ are triangles in double perspective at point $M \implies$

These triangles are in triple perspective $\implies AO_A, BO_B, CO_C$ are concurrent at the point $X.$

The rotation angle $\triangle AO_AM$ to $\triangle BO_BM$ is $\angle O_AMO_B$ for sides $O_AM$ and $O_BM$ or angle between $AO_A$ and $BO_B$ which is $\angle AXB \implies M O_AO_BX$ is cyclic $\implies M O_AO_BXO_C$ is cyclic.

Therefore $\angle O_AXO_B = \angle O_AO_CO_B = \angle ACB \implies ABCX$ is cyclic as desired.

Similarly, one can prove that $\triangle ADE \sim \triangle OO_BO_C, \triangle BDF \sim \triangle OO_AO_C, \triangle CEF \sim \triangle OO_AO_B.$

Double perspective triangles

vladimir.shelomovskii@gmail.com, vvsss

Analogue of Miquel's point

Let inscribed quadrilateral $ABB'A'$ and

points $C \in AB', C' \in A'B', D \in A'B$ be given.

$\theta = \odot CC'B', \Theta = \odot BDD', M = \theta \cap \Theta,$ $E = C'D \cap \odot B'CC', D' = AB \cap CE, F = CC' \cap DD'.$ Prove that points $A, B, B',$ and $M$ are concyclic.

Proof

$\angle BMB' = \angle EMB' - \angle EMB = \angle ECB' - \angle ED'B = \angle BAB' \blacksquare$

Corollary

The points $F, C, D',$ and $M$ are concyclic.

The points $F, C', D,$ and $M$ are concyclic.

vladimir.shelomovskii@gmail.com, vvsss

@@ Line 1: / Line 1: @@
 ==Miquel and Steiner's quadrilateral theorem==
-[[Miquel circles|500px|right]]
+[[File:4 Miquel circles.png|500px|right]]
 Let four lines made four triangles of a complete quadrilateral. In the diagram these are <math>\triangle ABC, \triangle ADE, \triangle CEF, \triangle BDF.</math>
@@ Line 7: / Line 7: @@
 <i><b>Proof</b></i>
-Let circumcircle of <math>\triangle ABC</math> circle <math>\Omega</math> cross the circumcircle of <math>\triangle CEF \omega</math> at point <math>M.</math>
+Let circumcircle of <math>\triangle ABC</math> circle <math>\Omega</math> cross the circumcircle of <math>\triangle CEF</math> circle <math>\omega</math> at point <math>M.</math>
 Let <math>AM</math> cross <math>\omega</math> second time in the point <math>G.</math>
@@ Line 13: / Line 13: @@
 <math>CMGF</math> is cyclic <math>\implies \angle BCM = \angle MGF.</math>
-<math>AMCB</math> is cyclic <math>\implies \angle BCM + \angle BAM = 180^\circ \implies \angle BAG + \angle AGF = 180^\circ \implies AB||GF.</math>
+<math>AMCB</math> is cyclic <math>\implies \angle BCM + \angle BAM = 180^\circ \implies</math>
+<math>\angle BAG + \angle AGF = 180^\circ \implies AB||GF.</math>
 <math>CMGF</math> is cyclic <math>\implies \angle AME = \angle EFG.</math>
-<math>AD||GF \implies \angle ADE + \angle DFG = 180^\circ \implies \angle ADE + \angle AME = 180^\circ \implies ADEM</math> is cyclic and circumcircle of <math>\triangle ADE</math> contain the point <math>M.</math>
+<math>AD||GF \implies \angle ADE + \angle DFG = 180^\circ \implies \angle ADE + \angle AME = 180^\circ \implies</math>
+<math>ADEM</math> is cyclic and circumcircle of <math>\triangle ADE</math> contain the point <math>M.</math>
 Similarly circumcircle of <math>\triangle BDF</math> contain the point <math>M</math> as desired.
+'''vladimir.shelomovskii@gmail.com, vvsss'''
+==Circle of circumcenters==
+[[File:Miquel point.png|450px|right]]
+Let four lines made four triangles of a complete quadrilateral. In the diagram these are <math>\triangle ABC, \triangle ADE, \triangle CEF, \triangle BDF.</math>
+Prove that the circumcenters of all four triangles and point <math>M</math> are concyclic.
+<i><b>Proof</b></i>
+Let <math>\Omega, \omega, \Omega',</math> and <math>\omega'</math> be the circumcircles of <math>\triangle ABC, \triangle CEF, \triangle BDF,</math> and <math>\triangle ADE,</math> respectively.
+In <math>\Omega' \angle MDF = \angle MBF.</math>
+In <math>\omega' \angle MDE = \frac {\overset{\Large\frown} {ME}} {2}.</math>
+<math>ME</math> is the common chord of <math>\omega</math> and <math>\omega' \implies \angle MOE = \overset{\Large\frown} {ME} \implies</math>
+<cmath>\angle MO'o' = \frac {\overset{\Large\frown} {ME}} {2} =  \angle MDE.</cmath>
+Similarly, <math>MF</math> is the common chord of <math>\omega</math> and <math>\Omega' \implies  \angle MDF = \angle Moo' = \angle MO'o'.</math>
+Similarly, <math>MC</math> is the common chord of <math>\Omega</math> and <math>\omega' \implies  \angle MBC = \angle MOo' \implies</math>
+<math>\angle MOo' = \angle MO'o' \implies</math> points <math>M, O, O', o,</math> and <math>o'</math> are concyclic as desired.
+'''vladimir.shelomovskii@gmail.com, vvsss'''
+==Triangle of circumcenters==
+[[File:Miquel perspector.png|500px|right]]
+Let four lines made four triangles of a complete quadrilateral.
+In the diagram these are <math>\triangle ABC, \triangle ADE, \triangle CEF, \triangle BDF.</math>
+Let points <math>O,O_A, O_B,</math> and <math>O_C</math> be the circumcenters of <math>\triangle ABC, \triangle ADE, \triangle BDF,</math> and <math>\triangle CEF,</math> respectively.
+Prove that  <math>\triangle O_AO_BO_C \sim \triangle ABC,</math> and perspector of these triangles point <math>X</math> is the second (different from <math>M</math>) point of intersection <math>\Omega \cap \Theta,</math> where <math>\Omega</math> is circumcircle of <math>\triangle ABC</math> and <math>\Theta</math> is circumcircle of <math>\triangle O_AO_BO_C.</math>
+<i><b>Proof</b></i>
+Quadrungle <math>MECF</math> is cyclic <math>\implies \angle AEM = \angle BFM \implies</math>
+<cmath>\angle AO_AM = 2\angle AEM = 2 \angle BFM = \angle BO_BM.</cmath>
+<cmath>\angle CO_CM = 2\angle CFM = 2 \angle BFM = \angle BO_BM.</cmath>
+<math>AO_A = MO_A, BO_B = MO_B, CO_C = MO_C \implies \triangle AO_AM \sim \triangle BO_BM \sim \triangle CO_CM.</math>
+Spiral similarity sentered at point <math>M</math> with rotation angle <math>\angle AMO_A = \angle BMO_B = CMO_C</math> and the coefficient of homothety <math>\frac {AM}{MO_A} = \frac {BM}{MO_B} =\frac {CM}{MO_C}</math> mapping <math>A</math> to <math>O_A</math>, <math>B</math> to <math>O_B</math>, <math>C</math> to <math>O_C \implies \triangle O_AO_BO_C \sim \triangle ABC.</math>
+<math>\triangle AO_AM, \triangle BO_BM, \triangle CO_CM</math> are triangles in double perspective at point <math>M \implies</math>
+These triangles are in triple perspective <math>\implies AO_A, BO_B, CO_C</math> are concurrent at the point <math>X.</math>
+The rotation angle <math>\triangle AO_AM</math> to <math>\triangle BO_BM</math> is <math>\angle O_AMO_B</math> for sides <math>O_AM</math> and <math>O_BM</math> or angle between <math>AO_A</math> and <math>BO_B</math> which is <math>\angle AXB \implies M O_AO_BX</math> is cyclic <math>\implies M O_AO_BXO_C</math> is cyclic.
+Therefore  <math>\angle O_AXO_B = \angle  O_AO_CO_B = \angle ACB \implies ABCX</math> is cyclic as desired.
+Similarly, one can prove that <math>\triangle ADE \sim \triangle OO_BO_C, \triangle BDF \sim \triangle OO_AO_C, \triangle CEF \sim \triangle OO_AO_B.</math>
+*[[Double perspective triangles]]
+'''vladimir.shelomovskii@gmail.com, vvsss'''
+==Analogue of Miquel's point==
+[[File:5 circles.png|400px|right]]
+Let inscribed quadrilateral <math>ABB'A'</math> and
+points <math>C \in AB', C' \in A'B', D \in A'B</math> be given.
+<cmath>\theta = \odot CC'B', \Theta = \odot BDD', M = \theta \cap \Theta,</cmath>
+<cmath>E = C'D \cap \odot B'CC', D' = AB \cap CE, F = CC' \cap DD'.</cmath>
+Prove that points <math>A, B, B',</math> and <math>M</math> are concyclic.
+<i><b>Proof</b></i>
+<cmath>\angle BMB' =  \angle EMB' - \angle EMB =
+\angle ECB' - \angle ED'B  = \angle BAB' \blacksquare</cmath>
+<i><b>Corollary</b></i>
+The points <math>F, C, D',</math> and <math>M</math> are concyclic.
+The points <math>F, C', D,</math> and <math>M</math> are concyclic.
 '''vladimir.shelomovskii@gmail.com, vvsss'''

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Difference between revisions of "Miquel's point"

Latest revision as of 23:10, 28 October 2023

Contents

Miquel and Steiner's quadrilateral theorem

Circle of circumcenters

Triangle of circumcenters

Analogue of Miquel's point