8589934593
domain: N
Appears in sequences
- a(n) = 2^n + 1.at n=33A000051
- Pisot sequence L(5,9).at n=31A020737
- Numbers whose cube is palindromic in base 8.at n=18A046239
- Pisot sequence L(3,5).at n=32A048578
- a(n) = 8^n + 1.at n=11A062395
- a(n) = gcd(2^((n*(n+1)/2)) + 1, 2^n + 1).at n=32A066827
- a(n) = 2^(2^n + 1) + 1.at n=5A070969
- Numbers of the form (8^{mr}-1)/(8^r-1) for positive integers m, r.at n=28A076287
- Partial sums of A084509. Positions of ones in the first differences of A084506.at n=18A084508
- a(n) = 2^(2*n+1) + 1.at n=16A087289
- Smallest prime between 2^n and 2^(n+1) having a minimal number of 1's in binary representation, A091936(n) - 2^n.at n=53A092099
- Expansion of (1-x-x^2)/((1-x)*(1-2*x)).at n=34A094373
- a(n) = 2^n + sin(n*Pi/2).at n=33A100455
- A sequence of triples arising from a matrix calculation, in particular let m = floor(n/3), then (a(3*m), a(3*m+1), a(3*m+2)) = M^(m*(m+1)/n) * (0, 1, 1) where M is the matrix [[2,0,1], [0,1,0], [-2,1,0]].at n=33A103193
- a(n) = 8^n + 1 - 0^n.at n=11A103459
- Pierpont 5-almost primes. 5-almost primes of form (2^K)*(3^L)+1.at n=14A111345
- Binomial transform of periodic sequence (2, 3, 1).at n=32A130752
- Sequence identical to its third differences: a(n+3) = 3a(n+2)-3a(n+1)+2a(n), with a(0)=1, a(1)=4, a(2)=9.at n=32A130785
- a(n) = A135574(n+1) - 2*A135574(n).at n=33A135575
- Exchange successive pairs of terms of A000051.at n=32A140590