42533

Properties

Appears in sequences

• Primes p such that p-24, p and p+24 are consecutive primes.at n=2A053074
• List of triples of primes with common difference 24.at n=7A128383
• Primes p such that 54*p-1, 54*p+1 and 60*p-1, 60*p+1 are twin primes.at n=5A138698
• K-bit primes p such that p-2^i and p+2^i are composite for 0<=i<=K-1.at n=30A153352
• Prime numbers with gaps larger than 18 towards both neighboring primes.at n=28A163111
• Prime numbers with gaps larger than 20 towards both neighboring primes.at n=14A163112
• Least prime p == -1 (mod n) that divides Fibonacci((p+1)/n), or 0 if no such prime exists.at n=33A168172
• Shiraishi numbers: a parametrized family of solutions c to the Diophantine equation a^3 + b^3 + c^3 = d^3 with d = c+1.at n=32A226903
• Primes of the form (k^2+7)/11.at n=32A242930
• Primes which are the average of the two adjacent primes and also of the two adjacent squarefree numbers.at n=31A245589
• Odd numbers m such that for all 2^k < m the numbers m + 2^k, m - 2^k, m*2^k + 1, and m*2^k - 1 are composite, with k >= 1.at n=6A256163
• Primes p such that for all 2^k < p the numbers p + 2^k, p - 2^k, p*2^k + 1, and p*2^k - 1 are composite.at n=3A256237
• Partial sums of the number of active (ON, black) cells in n-th stage of growth of two-dimensional cellular automaton defined by "Rule 329", based on the 5-celled von Neumann neighborhood.at n=40A271275
• Primes that can be generated by the concatenation in base 6, in ascending order, of two consecutive integers read in base 10.at n=23A287306
• Numbers k such that 5*10^k - 51 is prime.at n=20A294130
• Primes P where the distance to the nearest prime is greater than 2*log(P).at n=29A330426
• Primes k such that the concatenation of (b, k, b) and (k, b, k) are both prime, where b is the binary representation of k.at n=15A389801
• Prime numbersat n=4449