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leonstreet's profile photo
leonstreet, … Gerry Myerson24
5/30/08
Numbers: Large and small; Real and fake
concept of number, and I have tried to be constructive as well as critical, and though this post may prove to be more piffle than pedigree, perhaps some passer-by or stall-holder, with
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Numbers: Large and small; Real and fake
concept of number, and I have tried to be constructive as well as critical, and though this post may prove to be more piffle than pedigree, perhaps some passer-by or stall-holder, with
5/30/08
Herman Jurjus's profile photo
Herman Jurjus, … abo10
10/26/06
Strange Borel quote
numbers is finite." > >>> and: > >>> "Van Dantzig asked in 1956 the question "is 10^10^10 a finite number?"" > >>>
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Strange Borel quote
numbers is finite." > >>> and: > >>> "Van Dantzig asked in 1956 the question "is 10^10^10 a finite number?"" > >>>
10/26/06
Dave L. Renfro's profile photo
Dave L. Renfro
3/4/02
GRAHAM'S NUMBER AND RAPIDLY GROWING FUNCTIONS
about Graham's number in Craig Smorynski's article "Some rapidly growing functions", The Mathematical Intelligencer 2 (1980), 149-154. Here is how Smorynski
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GRAHAM'S NUMBER AND RAPIDLY GROWING FUNCTIONS
about Graham's number in Craig Smorynski's article "Some rapidly growing functions", The Mathematical Intelligencer 2 (1980), 149-154. Here is how Smorynski
3/4/02
Richard Duffy's profile photo
Richard Duffy
8/15/89
easier proof that a circle can't be squared?
iterating a finite number of quadratic field extensions starting from the rationals. So all we need is to prove that *if* pi is algebraic, its degree is not a power of 2. (Maybe this is
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easier proof that a circle can't be squared?
iterating a finite number of quadratic field extensions starting from the rationals. So all we need is to prove that *if* pi is algebraic, its degree is not a power of 2. (Maybe this is
8/15/89