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hyperbolic geometry

 
 
Reply Thu 25 Jul, 2013 11:24 am
the numbers of polygon in hyperbolic plan is uncountable
proof
the area of hyperpolic polygon is 1/wdv from gauss bonnet and to obtain abigger hyperbolic polygon m/wdv as hyperbolic plan is complete metric the function 1/w is maximal from hahn banach theorem and the mobius transformation is confomal and lines is uniqe so m takes the values of R
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Type: Question • Score: 0 • Views: 1,724 • Replies: 5
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mohamed THE HE1
 
  1  
Reply Thu 25 Jul, 2013 04:04 pm
@mohamed THE HE1,
pleaseeeeeeeeee i m mohamed i want to reply to make sure from my theorem
0 Replies
 
Olivier5
 
  1  
Reply Thu 25 Jul, 2013 04:17 pm
Mohamad, nobody is qualified enough to respond. It's Hebrew to us, if you pardon the expression.

You're hereby nominated the resident A2K mathematical expert. :-)
contrex
 
  1  
Reply Thu 25 Jul, 2013 05:21 pm
If he's so clever, why doesn't he approach math students and teachers at his nearest college? Or post on alt.math (a Usenet group, available on Google Groups)?

0 Replies
 
contrex
 
  1  
Reply Thu 25 Jul, 2013 05:23 pm
@Olivier5,
Olivier5 wrote:
It's Hebrew to us, if you pardon the expression.


Tee hee
Olivier5
 
  1  
Reply Fri 26 Jul, 2013 11:16 am
@contrex,
Tee hee? Meaning?

(I'm not a native speaker)
0 Replies
 
 

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