25463

Properties

Appears in sequences

• Fibonacci sequence beginning 3, 8.at n=18A022121
• Primes whose digits can be arranged in increasing cyclic order - to form a substring of 123456789012345678901234567890...at n=38A068710
• a(n) = 2(a(n-2) - a(n-1)) + a(n-3) where a(0)=-3, a(1)=11 & a(2)=-30.at n=9A098150
• Primes p such that their cubes are pandigital.at n=25A124629
• Primes p such that continued fraction of (1 + sqrt(p))/2 has period 8; primes in A146333.at n=17A146353
• Primes formed by rearranging five consecutive decimal digits (avoiding leading 0).at n=7A156119
• a(n) = 49*n^2 - 20*n + 2.at n=22A157373
• Greater prime factor of successively better golden semiprimes.at n=14A165572
• Numbers k such that Sum_{i=1..k} i^6 divides Product_{i=1..k} i^6.at n=27A166606
• a(n)=3*a(n-1)-a(n-2) with a(0)=1, a(1)=3, a(2)=11.at n=10A167375
• Primes whose digits can be arranged as consecutive digits (more precisely, to form a substring of 0123456789).at n=28A177119
• a(n) = 6*n^3 - 263*n^2 + 3469*n - 12841.at n=32A218457
• Smallest of four consecutive primes whose sum is a triangular number.at n=12A226154
• Smallest k<3*2^n such that 3*2^n+k is the smallest of four consecutive primes in arithmetic progression or 0 if no solution.at n=43A230852
• Primes p such that p - d and p + d are also primes, where d is the largest digit of p.at n=19A245877
• First row of spectral array W(e^gamma).at n=24A250255
• Primes of the form 10n^2 - 90n + 163.at n=28A256376
• Numerators of lower primes-only best approximates (POBAs) to the golden ratio, phi (A001622); see Comments.at n=11A265796
• Numerators of primes-only best approximates (POBAs) to the golden ratio, phi; see Comments.at n=15A265800
• Denominators of primes-only best approximates (POBAs) to 1/(golden ratio) = 1/phi; see Comments.at n=14A265807