32759
domain: N
Appears in sequences
- Number of atoms in a decahedron with n shells.at n=34A004068
- sin(sin(x)-arctanh(x))=-3/3!*x^3-23/5!*x^5-721/7!*x^7-32759/9!*x^9...at n=3A013389
- exp(arctan(x)-sinh(x))=1-3/3!*x^3+23/5!*x^5+90/6!*x^6-721/7!*x^7...at n=9A013460
- Numbers having four 7's in base 8.at n=27A043452
- Frobenius number of the numerical semigroup generated by consecutive squares.at n=11A069756
- Sum of three edges of box having both integral orthogonal sides and integral geodesic distances between opposite vertices.at n=5A095257
- Number of 5-almost primes 5ap such that 2^n < 5ap <= 2^(n+1).at n=18A120036
- a(n) = (-1/2)*Sum_{i1 + i2 + i3 = 2*n} ((2*n)!/(i1! i2! i3!))*B(i1), where B are the Bernoulli numbers (with i1, i2, i3 >= 1).at n=7A124133
- a(n) = prime(n)*prime(n+1) + prime(n) + prime(n+1).at n=40A126199
- a(n) = n^5 - n - 1.at n=7A126426
- Numbers m such that m mod k is k-1 for all k = 2..9.at n=12A166931
- a(n) = 4*2^n - 9.at n=12A172252
- a(1)=1. a(n) = the smallest integer > a(n-1) such that d(a(n))+d(a(n)+1) > d(a(n-1))+d(a(n-1)+1), where d(m) = the number of divisors of m.at n=42A175143
- a(n) = 2^n - 9.at n=15A185346
- Monotonic ordering of nonnegative differences 2^i-9^j, for 40>=i>=0, j>=0.at n=44A192122
- Monotonic ordering of nonnegative differences 8^i-3^j, for 40>= i>=0, j>=0.at n=28A192156
- Trajectory of 105 under iteration of the map x -> A080670(x).at n=3A195266
- Number of n X 3 nonnegative integer arrays with each row and column increasing from zero by 0, 1 or 2.at n=11A202807
- Lucas pseudoprimes.at n=26A217120
- The least number having n representations as p*q - p - q for primes p <= q.at n=10A218862