32587

Properties

Appears in sequences

• Primes that remain prime through 3 iterations of function f(x) = 5x + 2.at n=30A023283
• First prime after phi(prime(n)^2).at n=41A079477
• Primes p such that p-2 and p+2 are divisible by a cube.at n=4A089202
• (2n+1)-digit anti-palindromic numbers or numberdromes, whose first and last digits add to ten, second and next-to-last add to ten and so on with the central digit a 5.at n=28A093472
• a(n) is the number of binary strings of length n+3 such that there exists a subsequence of length 4 with 2 ones in it.at n=11A118648
• Primes of the form k# + (k+1)#,..,+(k+x)#+1; where k#,(k+1)#,(k+x)# are primorials numbers, members of A002110.at n=3A127729
• Primes p such that 8*p^2-2*p-1 divides Fibonacci(p).at n=27A159231
• Triangle read by rows: T(n,k) is the sum of the k X k minors in the n X n Pascal matrix (0<=k<=n; the empty 0 X 0 minor is defined to be 1).at n=47A184173
• Triangle read by rows: T(n,k) is the sum of the k X k minors in the n X n Pascal matrix (0<=k<=n; the empty 0 X 0 minor is defined to be 1).at n=52A184173
• a(n) = (sum of first n primorial numbers) minus 1.at n=5A217723
• Lexicographically largest increasing sequence of primes for which the continued square root map (see A257574) produces Pi.at n=25A257582
• Sum of the 2 X 2 minors in the n X n Pascal matrix.at n=9A306376
• a(n) = A343046(n, n).at n=37A343047
• Primes that are the sum of the cubes of four primes, not necessarily distinct.at n=32A353249
• a(n) = A002070(n) + A036689(n).at n=41A366346
• Numbers k such that k + k'*2 is equal to a partial sum of primorial numbers (a term of A143293), where k' stands for the arithmetic derivative of k, A003415.at n=5A369061
• a(n) is the first prime p such that p - 2 and p + 2 both have exactly n prime factors, counted with multiplicity.at n=4A371651
• Prime numbersat n=3498