32803

Properties

Appears in sequences

• Numerators in expansion of exp(exp(x)-1)/(2-x).at n=8A058815
• Primes for which the five closest primes are smaller.at n=20A075037
• Average of four successive primes squared, (prime(n)^2 + prime(n+1)^2 + prime(n+2)^2 + prime(n+3)^2)/4, n>=2.at n=38A075894
• Primes p such that q-p = 28, where q is the next prime after p.at n=26A124595
• Primes p such that the multiplicative order of 2 modulo p is (p-1)/7.at n=31A152307
• Exponential Riordan array [exp(sinh(x)*exp(x)), sinh(x)*exp(x)].at n=29A154602
• Primes of the form 2^x+x+y+2^y, with x and y integers of any sign.at n=16A162574
• Primes p such that p*floor(p/2) - 4 and p*floor(p/2) + 4 are prime numbers.at n=37A164622
• Primes of the form n^2+42.at n=25A174812
• Primes of the form 2^k + 35.at n=6A176927
• Number of strings of numbers x(i=1..5) in 0..n with sum i^3*x(i) equal to 125*n.at n=43A184260
• Primes of the form 5n^2 - 2.at n=10A201784
• Primes of the form prime(k)^2 + k.at n=7A212304
• Numbers of the form x^3 + SumOfCubedDigits(x).at n=32A225051
• Primes of the form n^2 + pi(n).at n=28A228865
• Primes which are the arithmetic mean of the squares of four consecutive primes.at n=9A234364
• Prime numbers whose central digit equals the sum of the other digits.at n=26A235119
• Primes whose binary and ternary representations are also prime when read in decimal.at n=35A236537
• Primes representable as x^y + x + y, where x>1, y>1 are integers.at n=11A253776
• Odd primes p for which there are exactly as many primes in the range [prevprime(p)^2, prevprime(p)*p] as there are in the range [prevprime(p)*p, p^2], where prevprime(p) gives the previous prime before prime p.at n=34A256473