Difference between revisions of "Bisector"

(Created page with "==Division of bisector== Let a triangle <math>\triangle ABC, BC = a, AC = b, AB = c</math> be given. Let <math>AA', BB',</math> and <math>CC'</math> be the bisectors of <math>...")
 
(Division of bisector)
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==Division of bisector==
 
==Division of bisector==
Let a triangle <math>\triangle ABC, BC = a, AC = b, AB = c</math> be given. Let <math>AA', BB',</math> and <math>CC'</math> be the bisectors of <math>\triangle ABC.</math> The segments <math>BB'</math> and <math>A'C'</math> meet at point <math>D.</math>
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[[File:Bisector division.png|350px|right]]
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Let a triangle <math>\triangle ABC, BC = a, AC = b, AB = c</math> be given.
  
Find <math>\frac {BI}{BB'}, \frac {BD}{BB'}, \frac {DA'}{DC'}.</math>
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Let <math>AA', BB',</math> and <math>CC'</math> be the bisectors of <math>\triangle ABC.</math>
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he segments <math>BB'</math> and <math>A'C'</math> meet at point <math>D.</math> Find <cmath>\frac {BI}{BB'}, \frac {BD}{BB'}, \frac {DA'}{DC'}.</cmath>
  
 
<i><b>Solution</b></i>
 
<i><b>Solution</b></i>
  
<math>\frac {BA'}{CA'} = \frac {BA}{CA} = \frac {c}{b}, BA' + CA' = BC = a \implies BA' = \frac {a \cdot c}{b+c}.</math>
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<cmath>\frac {BA'}{CA'} = \frac {BA}{CA} = \frac {c}{b}, BA' + CA' = BC = a \implies BA' = \frac {a \cdot c}{b+c}.</cmath>
  
 
Similarly <math>BC' = \frac {a \cdot c}{a+b},  B'C = \frac {a \cdot b}{a+b}. </math>
 
Similarly <math>BC' = \frac {a \cdot c}{a+b},  B'C = \frac {a \cdot b}{a+b}. </math>
 
<cmath>\frac {BI}{IB'} = \frac {a}{B'C} = \frac{a+c}{b} \implies \frac {BI}{BB'} = \frac {a+c}{a + b +c}.</cmath>
 
<cmath>\frac {BI}{IB'} = \frac {a}{B'C} = \frac{a+c}{b} \implies \frac {BI}{BB'} = \frac {a+c}{a + b +c}.</cmath>
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<cmath> \frac {DA'}{DC'} = \frac {BA'}{BC'} =  \frac {a+ b}{b +c}.</cmath>
  
 
Denote <math>\angle ABC = 2 \beta.</math>
 
Denote <math>\angle ABC = 2 \beta.</math>
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Bisector <math>BD = 2 \frac {BC' \cdot BA'}{BC' + BA'} \cos \beta \implies</math>
 
Bisector <math>BD = 2 \frac {BC' \cdot BA'}{BC' + BA'} \cos \beta \implies</math>
 
<cmath>\frac {BD}{BB'} = \frac{a+c}{a+2b+c}.</cmath>
 
<cmath>\frac {BD}{BB'} = \frac{a+c}{a+2b+c}.</cmath>
 
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'''vladimir.shelomovskii@gmail.com, vvsss'''
<cmath> \frac {DA'}{DC'} = \frac {BA'}{BC'} =  \frac {a+ b}{b +c}.</cmath>
 

Revision as of 16:09, 7 December 2023

Division of bisector

Bisector division.png

Let a triangle $\triangle ABC, BC = a, AC = b, AB = c$ be given.

Let $AA', BB',$ and $CC'$ be the bisectors of $\triangle ABC.$

he segments $BB'$ and $A'C'$ meet at point $D.$ Find \[\frac {BI}{BB'}, \frac {BD}{BB'}, \frac {DA'}{DC'}.\]

Solution

\[\frac {BA'}{CA'} = \frac {BA}{CA} = \frac {c}{b}, BA' + CA' = BC = a \implies BA' = \frac {a \cdot c}{b+c}.\]

Similarly $BC' = \frac {a \cdot c}{a+b},  B'C = \frac {a \cdot b}{a+b}.$ \[\frac {BI}{IB'} = \frac {a}{B'C} = \frac{a+c}{b} \implies \frac {BI}{BB'} = \frac {a+c}{a + b +c}.\]

\[\frac {DA'}{DC'} = \frac {BA'}{BC'} =  \frac {a+ b}{b +c}.\]

Denote $\angle ABC = 2 \beta.$ Bisector $BB' = 2 \frac {a \cdot c}{a + c} \cos \beta.$

Bisector $BD = 2 \frac {BC' \cdot BA'}{BC' + BA'} \cos \beta \implies$ \[\frac {BD}{BB'} = \frac{a+c}{a+2b+c}.\] vladimir.shelomovskii@gmail.com, vvsss