46649

Properties

Appears in sequences

• Primes of the form k^2 - 7.at n=21A028883
• Primes whose digits are composite; primes having only {4, 6, 8, 9} as digits.at n=26A051416
• Primes p such that x^49 = 2 has no solution mod p, but x^7 = 2 has a solution mod p.at n=15A059667
• Primes with 15 as smallest positive primitive root.at n=16A061328
• Primes p such that p+7 == 0 (mod phi(p+7)).at n=32A067606
• Primes for which the smallest positive primitive root is odd and nonprime.at n=24A070269
• Largest prime < n^3.at n=34A077037
• Largest prime smaller than n^n.at n=4A098681
• Largest prime <= 6^n.at n=5A104091
• Primes having only {4, 6, 9} as digits.at n=13A107666
• Array read by antidiagonals: A(n,k) = Verlinde numbers for quasiparabolic bundles (n >= 3, k >= 0).at n=59A107735
• Prime Friedman numbers.at n=33A112419
• Triangle read by rows n>=0: the largest prime <= m^n+2 in columns m=3..n+3.at n=24A118132
• Primes of the form k^6-k-1.at n=3A126434
• Primes p such that continued fraction of (1 + sqrt(p))/2 has period 17 : primes in A146340.at n=39A146362
• Primes of the form 10n^2+6n+1.at n=25A154409
• Primes of the form k^k-k-1.at n=3A161472
• Numbers which contain only the digit 5 in their base-6 representation, with at most one exception. If the exception is the most-significant digit, it must be the digit 1, 2, 3, or 4, otherwise the exception must be the digit 4.at n=42A188532
• Primes of the form 8n^3-7.at n=4A200958
• Primes p such that (p+nextprime(p))/2 is a perfect square.at n=30A225195