8957952
domain: N
Appears in sequences
- Denominator of sum of -7th powers of divisors of n.at n=11A017678
- a(n) = Sum_{k=0..2n} (k+1)*T(n,k), where T is given by A026536.at n=15A027271
- Triangle whose (i,j)-th entry is binomial(i,j)*6^(i-j)*12^j.at n=26A038266
- Triangle whose (i,j)-th entry is binomial(i,j)*12^(i-j)*6^j.at n=22A038332
- Numbers n such that sum of digits of n is equal to the sum of the prime factors of n, counted with multiplicity.at n=21A063737
- For an integer n with prime factorization p_1*p_2*p_3* ... *p_m let n* = (p_1+1)*(p_2+1)*(p_3+1)* ... *(p_m+1); sequence gives n* such that n* is divisible by n, ordered by increasing value of n.at n=20A064518
- Maximal number of divisors of any n-digit number.at n=28A066150
- Partial products of A052901.at n=19A208131
- Ordered union of the sets {h^6, h >=1} and {3*k^6, k >=1}.at n=25A249097
- Start with 1; multiply alternately by 3 and 4.at n=13A282022
- Numbers k such that k^3 is the sum of two positive 7th powers.at n=5A291829
- Superior 2-highly composite numbers: 3-smooth numbers (A003586) k for which there is a real number e > 0 such that d(k)/k^e >= d(j)/j^e for all 3-smooth numbers j, where d(k) is the number of divisors of k (A000005).at n=19A309016
- Cubefull highly composite numbers: numbers with a record number of cubefull divisors (A190867).at n=33A335850
- Numbers k such that A072079(k)/k sets a new record.at n=30A355579
- For an integer k with prime factorization p_1*p_2*p_3* ... *p_m let k* = (p_1+1)*(p_2+1)*(p_3+1)* ... *(p_m+1); sequence gives k* such that k* is divisible by k.at n=20A380574
- Absolute value squared of the maximal determinant of a matrix of order n with entries in the third roots of unity.at n=8A385034