Author Topic: Problem 1  (Read 4503 times)

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Offline Towelie

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Problem 1
« on: March 31, 2007, 11:58:22 am »
If an equilateral triangle and a square have the same area, what is the ratio of their perimeters?

by the way, my math teacher is having us email a bum and he sends us problems, if we get it right 1% of extra credit added to our grade. I have 99% in that class so... whatever :), I'll pass the problems onto you guys as they come. This is problem #1!

Offline while1

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Re: Problem 1
« Reply #1 on: March 31, 2007, 12:08:29 pm »
seriously a bum?
I tend to edit my topics and replies frequently.

http://www.operationsmile.org

Offline Towelie

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Re: Problem 1
« Reply #2 on: March 31, 2007, 12:10:12 pm »
Yeah, pretty much. He doesn't have a job and lives in an RV, but he has money from relatives to spend etc. To get internet he jacks it from other people's wireless connection.

Offline dark_drake

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Re: Problem 1
« Reply #3 on: March 31, 2007, 12:26:39 pm »
1:(2/3)*3^(1/4)

Well, if x is the length of one side of the triangle, it's:
3x:2x*3^(1/4)

That's a wild guess from what I remember from geometry. 
« Last Edit: March 31, 2007, 12:33:43 pm by dark_drake »
errr... something like that...

Offline Sidoh

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Re: Problem 1
« Reply #4 on: March 31, 2007, 12:32:30 pm »
I get this: , but I have a creeping suspicion that it's supposed to be the golden ratio...

Offline Towelie

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Re: Problem 1
« Reply #5 on: March 31, 2007, 12:35:35 pm »
by plugging in numbers I got 1.139753528:1 :P, but I can't replicate that algebraically

Offline dark_drake

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Re: Problem 1
« Reply #6 on: March 31, 2007, 12:41:50 pm »
Ok, here goes how I did it.

If x is the length of the side of the triangle, the height is sqrt(3)*x/2.  So, the area is now: 1/2*sqrt(3)*x/2*x=(sqrt(3)*x^2)/4.

All right, so now that the areas have to be equal, let y be the length of the side of a square.  y^2=(sqrt(3)*x^2)/4, so the length of the side is: y=(3^(1/4)*x)/2

Ok, so now we have the perimeters.  3x for the triangle, and 4y or 4*(3^(1/4)*x)/2 or 2x*3^(1/4) for the square.

3x:2x*3^(1/4).
 
edit:
by plugging in numbers I got 1.139753528:1 :P, but I can't replicate that algebraically
If you put a number into mine and simplify, you will get 1:0.877383, and 1/0.877383=what you got.
« Last Edit: March 31, 2007, 01:26:30 pm by dark_drake »
errr... something like that...

Offline Sidoh

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Re: Problem 1
« Reply #7 on: March 31, 2007, 01:09:52 pm »
Yep, that's right.  Working out the problem after reading it correctly (and realizing I found the height of the triangle incorrectly... lol), I got the same thing.

I probably should have eaten something before I tried that, even as trivial is it is... lol
« Last Edit: March 31, 2007, 01:15:31 pm by Sidoh »