75675600
domain: N
Appears in sequences
- State assignments for n-state machine.at n=9A006845
- Denominator of b(n), where b(n+1) = Sum_{k=0..n} b'((n^2-k^2)/n), b(0) = b(1) = 1, and b'(x) = b(x) if x is an integer and is linearly interpolated otherwise.at n=15A071301
- Denominators of partial sums for a series for 2*Zeta(2)/3 = (Pi^2)/9.at n=6A130550
- Triangle read by rows: T(m,l) = number of labeled covers of size l of a finite set of m unlabeled elements (m >= 1, 1 <= l <= 2^m - 1).at n=19A133709
- Denominators of partial sums of a certain alternating series of inverse central binomial coefficients.at n=6A145560
- Numbers k that set a record for the number of distinct prime signatures represented among their unitary divisors.at n=13A182862
- E.g.f. A(x) satisfies the property that the coefficient of x^n in the n-th iteration of e.g.f. A(x), for n>=1, begins with [1,2] and continues with all zeros thereafter.at n=7A228508
- Triangle read by rows, T(n,k) = C(2*n,n+k)*Sum_{m=0..k} (-1)^(m+k)*C(n+k,n+m)* Stirling2(n+m,m), for n>=0 and 0<=k<=n.at n=43A268439
- If 2n = 2^e1 + 2^e2 + ... + 2^ek [e1 .. ek distinct], then a(n) = A002110(e1) * A002110(e2) * ... * A002110(ek).at n=43A283477
- Indices of records in A309004.at n=10A309309
- Least common multiple of the first n terms of A359804.at n=32A369685
- Least common multiple of the first n terms of A359804.at n=33A369685
- Least common multiple of the first n terms of A359804.at n=34A369685
- Least common multiple of the first n terms of A359804.at n=35A369685
- Least common multiple of the first n terms of A359804.at n=36A369685
- Least common multiple of the first n terms of A359804.at n=37A369685
- The smallest of the most common numbers among the multinomial coefficients n!/(x_1! * ... * x_k!) for all partitions (x_1, ..., x_k) of n.at n=15A376662
- Square array read by antidiagonals: row n lists numbers whose maximal frequency in a fixed row of A036038 (or A078760) is equal to n, i.e., numbers m such that A376663(m) = n.at n=24A376667
- Positive integers whose maximum frequency in a fixed row of A036038 (or A078760) is equal to 4, i.e., numbers m such that A376663(m) = 4.at n=3A376671