Difference between revisions of "Angle Bisector Theorem"
(→Proof) |
(→Proof) |
||
Line 11: | Line 11: | ||
== Proof == | == Proof == | ||
− | By <math>LoS</math> on <math>\ | + | By <math>LoS</math> on <math>\angle ACD</math> and <math>\angle ABD</math>, |
<math>\frac{AB}{BD}=\frac{sin(BDA)}{sin(BAD)}</math> ... <math>(1)</math> and | <math>\frac{AB}{BD}=\frac{sin(BDA)}{sin(BAD)}</math> ... <math>(1)</math> and |
Revision as of 03:17, 26 April 2020
This is an AoPSWiki Word of the Week for June 6-12 |
Contents
Introduction
The Angle Bisector Theorem states that given triangle and angle bisector AD, where D is on side BC, then . It follows that . Likewise, the converse of this theorem holds as well.
Further by combining with Stewart's Theorem it can be shown that
Proof
By on and ,
... and $\frac{AC}{AD}=\frac{sin(ADC)/sin(DAC)}$ (Error compiling LaTeX. Unknown error_msg)... Well, we also know that and add to . I think that means that we can use here. Doing so, we see that I noticed that these are the numerators of and respectively. Since and are equal, then you get the equation for the bisector angle theorem. ~ SilverLightning59
Examples
- Let ABC be a triangle with angle bisector AD with D on line segment BC. If and , find AB and AC.
Solution: By the angle bisector theorem, or . Plugging this into and solving for AC gives . We can plug this back in to find . - In triangle ABC, let P be a point on BC and let . Find the value of .
Solution: First, we notice that . Thus, AP is the angle bisector of angle A, making our answer 0. - Part (b), 1959 IMO Problems/Problem 5.