13.10 PERFECT NUMBERS AND THE MERSENNE PRIMES
The integer n is perfect if the sum of all of its divisors is equal to 2n. Mystical interpretations were given to perfect numbers.5 The first four perfect numbers are
TABLE 13.14 Mersenne Primes
The perfect numbers listed above are all even; it is not known if odd perfect numbers exist. In the third century B.C., Euclid proved that if p and 2p − 1 are prime, then 2p − 1(2p − 1) is perfect. Euler proved in the eighteenth century that every even perfect number was of this form.
Marin Mersenne (1588–1648) was a monk in the Order of Minims near Paris. He taught philosophy and was interested in science and mathematics. If 2n − 1 (n > 2) is a prime, then n must be a prime; for if N = st, then 2st − 1 = (2s − 1) (2s(t − 1) + 2s(t − 2) + · · · + 1). In 1644 Mersenne conjectured that 2p − 1 is a prime for p = 2, 3, 5, 7, 13, 17, 19, 31, 67, 127, 257 and these were the only solutions for p ≤ 257. It is unlikely that Mersenne could have tested all of these numbers in 1644 and his conjecture is not completely correct.
Table 13.14 lists 43 known Mersenne numbers, the last discovered on December 15, 2005, by Dr Curtis Cooper and Dr Steven Boone, professors ...
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