44771

Properties

Appears in sequences

• Cubes written in base 9.at n=30A004639
• Fibonacci sequence beginning 1, 6.at n=20A022096
• Number of partitions of 5n such that cn(1,5) = cn(4,5) < cn(0,5) < cn(2,5) = cn(3,5).at n=15A036894
• a(n) = 3*a(n-1) - a(n-2) with a(0)=1, a(1)=7.at n=10A055267
• Primes p such that x^11 = 2 has a solution mod p, but x^(11^2) = 2 has no solution mod p.at n=4A070187
• Primes of the form perfect_power(n)+n.at n=29A075781
• Smallest member of a pair of consecutive twin prime pairs that have exactly n primes between them.at n=28A089637
• Primes that are the difference of two Fibonacci numbers; primes in A007298.at n=32A113188
• Primes p such that the multiplicative order of 2 modulo p is (p-1)/11.at n=19A152311
• Primes that are a sum of 7 consecutive Fibonacci numbers.at n=3A161611
• a(n) = (4*n^3 - 9*n^2 + 11*n + 3)/3.at n=33A161707
• Primes p of the form 4*k+3 such that p+2 is prime and p-1 is nonsquarefree.at n=37A175606
• Duplicate of A089637.at n=28A181981
• Primes p congruent to 11 mod 12 such that (p - 1)/2 does not divide the numerator of the Bernoulli number B(p-1).at n=32A232040
• P(n,k) is an array read by rows, with n > 0 and k=1..5, where row n gives the chain of 5 consecutive primes {p(i), p(i+1), p(i+2), p(i+3), p(i+4)} having the symmetrical property p(i) + p(i+4) = p(i+1) + p(i+3) = 2*p(i+2) for some index i.at n=29A267028
• Primes p such that (4^p - 2^p + 1)/3 is prime.at n=11A359436
• Prime numbersat n=4652