Search All of the Math Forum:
Views expressed in these public forums are not endorsed by
NCTM or The Math Forum.


mohamed
Posts:
9
From:
egypt
Registered:
7/25/13


i need help to prove
Posted:
Jul 25, 2013 8:20 PM


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



