Proving ABC is Isosceles: Triangle ABC and Bisectors

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The discussion revolves around proving that triangle ABC is isosceles given specific conditions involving angle bisectors and segment lengths. Participants explore various proof methods, including the Sine Rule and coordinate geometry, while expressing frustration over the difficulty of finding an elegant solution. One user reflects on their long-term struggle with the problem, suggesting it serves as a meditative challenge. There is also a debate about assumptions made regarding the use of the Sine Rule and the necessity of right angles for certain calculations. Ultimately, the thread highlights the complexity of the proof and the desire for a clear, traditional solution.
jdavel
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am i missing something, or is this really hard to prove? anyone know a proof? an elegant one?

Given:
triangle ABC
bisector of A intersects BC at D
bisector of B intersects AC at E
AE = BD

Prove: ABC is isosceles
 
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Draw a picture, and apply the Sine Rule like possessed. Notice that the two angles at D have the same sine; this is also true for the two angles at E.
 
Have the moderators given up on maintaining the distinction between these forums and the homework forums?
 
I first encountered this problem almost eight years ago and on occasion still try to prove it. It serves as a kind of meditation, almost Zen in a way.

I did manage to prove it using coordinate geometry, but of course that's cheating. A paper and compass solution eludes me still. I'm of two minds as to whether I'd like to get a solution from this thread, or still try and solve it myself.
 
DoDo,

That works. Nice!

P.S. Ben Niehoff, this really wasn't from a homework assignment. I ran across this problem years ago, could never solve it, and just happen to think of it a few days ago.
 
jdavel said:
P.S. Ben Niehoff, this really wasn't from a homework assignment. I ran across this problem years ago, could never solve it, and just happen to think of it a few days ago.

Sorry, my mistake. But there have certainly been a lot of them in this forum lately. It gets annoying after a while.
 
If we let \alpha = ABE and \beta = DAB, does then sin\alpha=AE/AB and sin\beta=BD/AB?
And since AE = BD, then \alpha and \beta are equal?

Am I making assumptions from my sketch here?
 
Why sin alfa = AE/AB ? What the Sine Rule says is that (sin alfa) / AE = (sin angle AEB) / AB.
 
I understand what you're saying, however, all I am using here is sin=opp/hyp. In my construction, sin(beta) = BD/hyp, and sin(alpha)=AE/hyp.

If they share the same hypotenuse (side AB in my post), then because AE=BE the two angles will be the same.

Here's my problem: I do believe I assumed AB is the hypotenuse for the two triangles being compared.
 
  • #10
In order to have an hypotenuse, you need a right angle somewhere.
 
  • #11
Right. I realize now the very obvious mistake I made. I chose to draw the triangle equilateral, giving me the right angles I needed. Of course, that breaks the rules from the get-go.
 

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