Quasiperfect number

Template:Short description In mathematics, a quasiperfect number is a natural number Template:Mvar for which the sum of all its divisors (the sum-of-divisors function $σ (n)$ ) is equal to $2 n + 1$ . Equivalently, Template:Mvar is the sum of its non-trivial divisors (that is, its divisors excluding 1 and Template:Mvar). No quasiperfect numbers have been found so far.

The quasiperfect numbers are the abundant numbers of minimal abundance (which is 1).

Theorems

If a quasiperfect number exists, it must be an odd square number greater than 10³⁵ and have at least seven distinct prime factors.^[1]

Numbers Template:Mvar whose sum of factors equals $2 n + 2$ are known to exist. They are of form $2^{n - 1} \times (2^{n} - 3)$ where $2^{n} - 3$ is a prime. The only exception known so far is $650 = 2 \times 5^{2} \times 13$ . They are 20, 104, 464, 650, 1952, 130304, 522752, ... (sequence A088831 in the OEIS). Numbers Template:Mvar whose sum of factors equals $2 n - 2$ are also known to exist. They are of form $2^{n - 1} \times (2^{n} + 1)$ where $2^{n} + 1$ is prime. No exceptions are found so far. Because of the five known Fermat primes, there are five such numbers known: 3, 10, 136, 32896 and 2147516416 (sequence A191363 in the OEIS)

Betrothed numbers relate to quasiperfect numbers like amicable numbers relate to perfect numbers.

Notes

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References

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Template:Divisor classes Template:Classes of natural numbers

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[1]

Quasiperfect number

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Quasiperfect number

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