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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
@mohamed THE HE1,
pleaseeeeeeeeee i m mohamed i want to reply to make sure from my theorem
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. :-)
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)?
@contrex,
Tee hee? Meaning?
(I'm not a native speaker)
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