139815
domain: N
Appears in sequences
- Larger of amicable pair.at n=14A002046
- Amicable numbers.at n=31A063990
- Largest members of k-sociable cycles of order r.at n=24A183013
- Numbers k such that sigma(k) = sigma(sigma(k)-k).at n=35A206708
- Deficient numbers whose aliquot sequence is deficient, abundant, deficient, ..., etc.at n=30A234970
- Let us denote 's' the sum of the deficient numbers in the aliquot parts of x. Sequence lists numbers x such that sigma(s)-s is equal to x.at n=25A254879
- Amicable pairs.at n=29A259180
- Amicable pairs (x < y) ordered by nondecreasing sum (x + y) and then by increasing x.at n=31A259933
- Larger of amicable pair (x, y) as they are listed in A259933.at n=15A260087
- Amicable pairs of odd numbers.at n=9A262623
- Odd amicable numbers.at n=9A262625
- (1+e)-sigma amicable numbers.at n=29A274116
- List of pairs of amicable numbers (m,n) where the sum of the pair is divisible by 10.at n=15A291422
- Amicable pairs with the property that the number of divisors of the smaller member is greater than the number of divisors of the larger member.at n=17A328063
- Amicable pairs with the property that the number of divisors of the smaller member is twice the number of divisors of the larger member.at n=15A328065
- Larger of recursive amicable numbers pair: numbers m < k such that m = s(k) and k = s(m), where s(k) = A333926(k) - k is the sum of proper recursive divisors of k.at n=14A333930
- Integers k such that there exists an integer 0<m<k such that m*sigma(m)^2 + k*sigma(k)^2 = (m+k)^3.at n=18A383714
- Integers k such that there exists an integer 0<m<k such that sigma(m)^2 + sigma(k)^2 = 2*(m+k)^2.at n=32A385008
- Numbers y such that there exists an integer 0 < x < y such that sigma(x)^x * sigma(y)^y = (x+y)^(x+y).at n=14A385186