Almost perfect number
In mathematics, an almost perfect number (sometimes also called slightly defective or least deficient number) is a natural number n such that the sum of all divisors of n (the sum-of-divisors function σ(n)) is equal to 2n − 1, the sum of all proper divisors of n, s(n) = σ(n) − n, then being equal to n − 1. The only known almost perfect numbers are powers of 2 with non-negative exponents (sequence A000079 in OEIS). Therefore the only known odd almost perfect number is 20 = 1, and the only known even almost perfect numbers are those of the form 2k for some positive number k; however, it has not been shown that all almost perfect numbers are of this form. It is known that an odd almost perfect number greater than 1 would have at least 6 prime factors.[1][2]
If m is an odd almost perfect number then m(2m − 1) is a Descartes number.[3] Moreover if a and b are positive odd integers such that 
and such that 4m − a and 4m + b are both primes, then m(4m − a)(4m + b) would be an odd weird number.[4]
References
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External links
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Divisibility-based sets of integers
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| Overview |
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| Factorization forms | ||
| Constrained divisor sums | ||
| With many divisors | ||
| Aliquot sequence-related | ||
| Other sets | ||
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