97772875200
domain: N
Appears in sequences
- Smallest number with same number of divisors as n!.at n=15A045977
- Smallest n-digit number with A066150(n) divisors.at n=10A066151
- The n-digit number whose divisors have the maximal sum (A066410).at n=10A066424
- Largest n-digit number with maximal number of divisors.at n=10A069650
- Highly composite numbers (A002182) that lack a prime factor that the previous HCN has.at n=5A210618
- LCM of the first few p-smooth numbers for a prime number p if in A007416; otherwise smallest number with same number of divisors (see example for details).at n=24A212654
- Table (read by rows) of all k-digit positive integers (in ascending order) with maximum number of divisors A066150(k).at n=33A240544
- a(n) = f(5*n)/(f(n-2)*f(n-1)*f(n)*f(n+1)*f(n+2)), where f(k) = k!.at n=2A248709
- Number T(n,k) of partitions of an n-set with distinct block sizes and maximal block size equal to k; triangle T(n,k), k>=0, k<=n<=k*(k+1)/2, read by columns.at n=40A262078
- Maximum value of the multinomial coefficients M(n;lambda), where lambda ranges over all partitions of n into distinct parts.at n=20A290517
- Highly composite numbers (A002182) that are not superabundant numbers (A004394).at n=25A308913
- Highly composite numbers that cease to be highly composite if divided by their largest prime factor.at n=24A352699
- Smallest highly composite number beginning with n.at n=8A353216
- Positive integers whose maximum frequency in a fixed row of A036038 (or A078760) is equal to 5, i.e., numbers m such that A376663(m) = 5.at n=9A376672