26417

Properties

Appears in sequences

• Numbers k such that the continued fraction for sqrt(k) has period 91.at n=17A020430
• Primes p from A031924 such that A052180(primepi(p)) = 29.at n=15A052236
• Consider primes p such that integer part of the volume of cube with faces of area p is prime; sequence gives integer part of volumes.at n=15A107989
• Primes p that remain prime through at least 2 iterations of the function f(p) = p^2 + 4.at n=38A116886
• Primes p that divide Fibonacci[(p+1)/7].at n=32A125252
• Number of n X 2 (0,1,2) arrays of permanents of 2 X 2 subblocks of some (n+1) X 3 binary array with rows and columns of the latter in lexicographically nondecreasing order.at n=13A227021
• Prime(k), where k is such that (1 + Sum_{i=1..k} prime(i)^17) / k is an integer.at n=10A233557
• Third prime p such that (p+n)^2+n is prime but (p+j)^2+j is not prime for all 0<j<n.at n=41A238675
• Number of partitions of 2n having twice as many odd parts as even.at n=26A239258
• Number of partitions p of n such that floor(mean(p)) and ceiling(mean(p)) are parts of p.at n=44A241340
• Primes p congruent to 1 modulo 13 such that x^13 = 2 has a solution modulo p.at n=17A275773
• Numbers k such that 5 is the smallest decimal digit of k^2.at n=41A291630
• Primes which, when added to their reversals, produce palindromic primes.at n=42A342681
• Prime numbersat n=2902