5336100
domain: N
Appears in sequences
- First diagonal of A027447.at n=11A027451
- Smallest order for which there are n nonisomorphic finite Abelian groups, or 0 if no such order exists.at n=31A046056
- a(n) is the square of the product of first n primes.at n=5A061742
- Goedel encoding of the prime factors of n, in increasing order and repeated according to multiplicity.at n=31A074736
- Triangular array: for s=0 to r-1, a(r,s) = p(s)^(r-s), where p(s) is the s-th primorial number. (p(0)=1, p(1)=2, p(2)=2*3, p(3)=2*3*5,...).at n=26A079474
- Least m such that A080256(m)=n and has a maximum number A000792(n) of divisors.at n=13A087902
- Integer powers of primorial numbers.at n=40A100778
- Least number k that can be written as k^2 * j with 0 < j <= k and gcd(k, j) = 1 in n ways.at n=8A104025
- Primorial numbers raised to the power of 2^n (where n is a nonnegative integer), sorted.at n=17A133492
- Perfect squares that are a product of two distinct triangular numbers.at n=16A169836
- Prime encoded sequence of generic integer partitions of n in the antilexicographic order of the partitions.at n=16A182911
- Cubefree products of primorials (A002110).at n=27A220423
- Areas of primitive Heronian triangles K which are perfect squares.at n=44A248108
- Number of (n+1) X (3+1) arrays of permutations of 0..n*4+3 with each element having index change +-(.,.) 0,0 1,-2 or 2,-1.at n=6A264123
- Number of (n+1)X(7+1) arrays of permutations of 0..n*8+7 with each element having index change +-(.,.) 0,0 1,-2 or 2,-1.at n=2A264127
- T(n,k)=Number of (n+1)X(k+1) arrays of permutations of 0..(n+1)*(k+1)-1 with each element having index change +-(.,.) 0,0 1,-2 or 2,-1.at n=38A264128
- T(n,k)=Number of (n+1)X(k+1) arrays of permutations of 0..(n+1)*(k+1)-1 with each element having index change +-(.,.) 0,0 1,-2 or 2,-1.at n=42A264128
- Leading least prime signatures, ordered by the underlying partitions, as in A063008.at n=37A316532
- Irregular triangle read by rows where T(n,k) = A002110(n/d)^d, where d = A027750(n,k) and A002110(m) is the product of the first m primes.at n=24A322792
- Proper powers of primorial numbers.at n=32A322793