32580
domain: N
Appears in sequences
- a(n) = floor(10000*log(n)).at n=25A004243
- Product of a prime and the previous number.at n=41A036689
- Quarter-squared applied twice.at n=38A059403
- a(n) = floor(n^4/64).at n=38A060494
- a(n) = smallest k such that (10^k-1)/9 == 0 mod prime(n)^2, or 0 if no such k exists.at n=41A087094
- Integer squares y from the smallest solutions of y^2 = x*(a^N - x)*(b^N + x) (elliptic line, Weierstrass equation) with a and b legs in primitive Pythagorean triangles and N = 2. Sequence ordered in increasing values of leg a.at n=14A120210
- Elements of A065607 from primitive triples.at n=31A120693
- a(n) = (p+2)!/p! where p is the n-th lesser twin prime, A001359(n).at n=12A126251
- a(n) = floor(n^4/4).at n=19A131479
- Sums of 4 distinct primorials.at n=34A177709
- Number of partitions of n in which any two parts differ by at most 10.at n=43A218512
- Column 3 of array in A226513.at n=29A226514
- Sum of positive even numbers up to n^2.at n=18A235367
- Multiplicative order of 2 modulo prime(n)^2 for n >= 2.at n=40A243905
- Numbers m such that gcd(A001008(m), m) > 1, in increasing order.at n=42A256102
- z-value of the lexicographically first solution (x,y,z) of 4/n = 1/x + 1/y + 1/z with 0 < x < y < z all integers, or 0 if there is no such solution. Corresponding x and y values are in A257839 and A257840.at n=44A257841
- Sum of the smallest parts of the partitions of n into 10 parts.at n=53A326589
- a(n) = (prime(n)+1) * prime(n+1).at n=40A345727
- Numbers that are sums of consecutive primorial numbers.at n=24A351125
- The n-th term in the trajectory of the n-th prime P under the 'Px+1' map.at n=24A368159