195657
domain: N
Appears in sequences
- Expansion of 1/((1-6x)(1-7x)(1-10x)(1-11x)).at n=4A028207
- Number of parts in all partitions of n with largest multiplicity eight.at n=42A320378
- For any number n with binary expansion Sum_{k = 1..m} 2^e_k (where 0 <= e_1 < ... < e_m), a(n) = Product_{k = 1..m} prime(1+e_k)^k (where prime(k) denotes the k-th prime number).at n=26A344530
- Integers k such that k = Sum k/(p_i + j), where p_i are the prime factors of k (with multiplicity). Case j = -5.at n=7A380927
- Positive integers k = p_1^e_1*p_2^e_2*p_3^e_3, such that the points (p_1, e_1), (p_2, e_2) and (p_3, e_3) lie on a straight line with nonzero slope.at n=13A389340