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Mar 14th, 2003, 06:27 PM
#1
Thread Starter
Fanatic Member
Set Theory
If a set containing infinitely many elements can be partitioned into infinitely many subsets, each containing finite elements and the intersection of any two such subsets is the null set, and I prove that for all of these subsets, the expected number of elements that satisfy the property X is 2 (actually a little bit bigger). is this good enough to claim that in original set, there are infinitely many elements with property X??
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The probability that a random rational number has an even denominator is 1/3 (Salamin and Gosper 1972)? This result is independently verified by me (2002)!
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