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#1 2012-05-29 22:54:56

hammana
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equilateral triangle inside a triangle

On 2012-04-05 at 13:38 in the "Help me" section the following was proposed

"Given an arbitrary triangle find the equilateral triangle circumscribed around the original one such that the area of that equilateral triangle is maximized"

I am proposing the dual problem, by replacing "circumscribed around" by "inscribed inside" and " maximized" by "minimized"

Last edited by hammana (2012-05-29 22:57:20)

 

#2 2012-05-29 23:04:37

anonimnystefy
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Re: equilateral triangle inside a triangle

Is that the one I posted? I think so.


The limit operator is just an excuse for doing something you know you can't.
“It's the subject that nobody knows anything about that we can all talk about!” ― Richard Feynman
“Taking a new step, uttering a new word, is what people fear most.” ― Fyodor Dostoyevsky, Crime and Punishment
 

#3 2012-05-30 06:46:29

hammana
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Re: equilateral triangle inside a triangle

Hi anonimnystefy

that is right, your problem inspired this one, their solutions are quite similar.

 

#4 2012-05-30 07:14:32

anonimnystefy
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Re: equilateral triangle inside a triangle

Ok. I will try this one.


The limit operator is just an excuse for doing something you know you can't.
“It's the subject that nobody knows anything about that we can all talk about!” ― Richard Feynman
“Taking a new step, uttering a new word, is what people fear most.” ― Fyodor Dostoyevsky, Crime and Punishment
 

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