Difference between revisions of "Double perspective triangles"

(Two triangles in double perspective are in triple perspective)
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==Two triangles in double perspective are in triple perspective==
 
==Two triangles in double perspective are in triple perspective==
 
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[[File:Exeter B.png|500px|right]]
 
Let <math>\triangle ABC</math> and <math>\triangle DEF</math> be in double perspective, which means that triples of lines <math>AF, BD, CE</math> and <math>AD, BE, CF</math> are concurrent. Prove that lines <math>AE, BF,</math> and <math>CD</math> are concurrent (the triangles are in triple perspective).
 
Let <math>\triangle ABC</math> and <math>\triangle DEF</math> be in double perspective, which means that triples of lines <math>AF, BD, CE</math> and <math>AD, BE, CF</math> are concurrent. Prove that lines <math>AE, BF,</math> and <math>CD</math> are concurrent (the triangles are in triple perspective).
  
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Denote <math>G = AF \cap BE.</math>
 
Denote <math>G = AF \cap BE.</math>
  
It is known that there is projective transformation that maps any quadrungle into square. We use this transformation for <math>BDFG</math>. We use the claim and get the result: lines <math>AE, BF,</math> and <math>CD</math> are concurrent.
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It is known that there is projective transformation that maps any quadrungle into square.
 +
 
 +
We use this transformation for <math>BDFG</math>. We use the claim and get the result: lines <math>AE, BF,</math> and <math>CD</math> are concurrent.

Revision as of 13:35, 5 December 2022

Double perspective triangles

Two triangles in double perspective are in triple perspective

Exeter B.png

Let $\triangle ABC$ and $\triangle DEF$ be in double perspective, which means that triples of lines $AF, BD, CE$ and $AD, BE, CF$ are concurrent. Prove that lines $AE, BF,$ and $CD$ are concurrent (the triangles are in triple perspective).

Proof

Denote $G = AF \cap BE.$

It is known that there is projective transformation that maps any quadrungle into square.

We use this transformation for $BDFG$. We use the claim and get the result: lines $AE, BF,$ and $CD$ are concurrent.