Difference between revisions of "Double perspective triangles"

(Created page with "Double perspective triangles")
 
(Two triangles in double perspective are in triple perspective)
 
(5 intermediate revisions by the same user not shown)
Line 1: Line 1:
 
Double perspective triangles
 
Double perspective triangles
 +
 +
==Two triangles in double perspective are in triple perspective==
 +
[[File:Exeter B.png|500px|right]]
 +
[[File:Exeter C.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).
 +
 +
<i><b>Proof</b></i>
 +
 +
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 <i><b>Claim for square</b></i> and get the result: lines <math>AE, BF,</math> and <math>CD</math> are concurrent.
 +
 +
<i><b>Claim for square</b></i>
 +
 +
Let <math>ADBG</math> be the square, let <math>CEGF</math> be the rectangle, <math>A \in FG, G \in BE.</math>
 +
 +
Prove that lines <math>BF, CD,</math> and <math>AE</math> are concurrent.
 +
 +
<i><b>Proof</b></i>
 +
 +
Let <math>BG = a, GE = b, AF = c, A = (0,0).</math> Then
 +
<cmath>B = (-a, -a), F = (0,c), BF: y = x (1 + \frac {c}{a})+c.</cmath>
 +
<cmath>E=(b, -a),  AE: y = -\frac {a}{b}x.</cmath>
 +
<cmath>D = (-a,0), C= (b,c), CD: y = c \frac {x+a}{a+b}.</cmath>
 +
<cmath>X = CD \cap AE \cap BF = (-bk, ak),</cmath>
 +
where <math>k=  \frac {c} {a+b +{\frac {bc}{a}}}</math> as desired.
 +
 +
'''vladimir.shelomovskii@gmail.com, vvsss'''

Latest revision as of 13:51, 5 December 2022

Double perspective triangles

Two triangles in double perspective are in triple perspective

Exeter B.png
Exeter C.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 for square and get the result: lines $AE, BF,$ and $CD$ are concurrent.

Claim for square

Let $ADBG$ be the square, let $CEGF$ be the rectangle, $A \in FG, G \in BE.$

Prove that lines $BF, CD,$ and $AE$ are concurrent.

Proof

Let $BG = a, GE = b, AF = c, A = (0,0).$ Then \[B = (-a, -a), F = (0,c), BF: y = x (1 + \frac {c}{a})+c.\] \[E=(b, -a),  AE: y = -\frac {a}{b}x.\] \[D = (-a,0), C= (b,c), CD: y = c \frac {x+a}{a+b}.\] \[X = CD \cap AE \cap BF = (-bk, ak),\] where $k=  \frac {c} {a+b +{\frac {bc}{a}}}$ as desired.

vladimir.shelomovskii@gmail.com, vvsss