88799
domain: N
Properties
Primality
- Prime
- yes
Appears in sequences
- Initial members of prime septuplets (p, p+2, p+8, p+12, p+14, p+18, p+20).at n=1A022010
- Primes p such that the differences between the 5 consecutive primes starting with p are (2,6,4,2).at n=16A078948
- Triangle of primes associated with A083779.at n=42A083781
- Primes with digit sum = 41.at n=7A106774
- The lesser of twin prime pairs with each prime in a different century.at n=32A158277
- The smallest prime divisor of 1 + 2^2 + 3^3 + ... + n^n.at n=11A175232
- Initial primes in prime septuplets (p, p+2, p+8, p+12, p+14, p+18, p+20) preceding the maximal gaps in A201251.at n=1A201252
- Primes p in prime septuplets (p, p+2, p+8, p+12, p+14, p+18, p+20) at the end of the maximal gaps in A201251.at n=0A233038
- Lesser of twin primes of (29n + 1, 29n + 3).at n=37A248620
- Initial members of prime sextuples (n, n+2, n+12, n+14, n+18, n+20).at n=5A253627
- Initial members of prime septuplets.at n=2A257124
- For a lesser p of twin primes, let B_(p+2) and B_p be sequences defined as A159559, but with initial terms p+2 and p respectively. The sequence lists p for which all differences B_(p+2)(n)-B_p(n)<=6.at n=31A276848
- a(n) = (1/4)*A291024(n).at n=13A291142
- Primes p such that p + 2, p + 8, p + 12, p + 18 and p + 20 are also primes.at n=6A383393
- Primes p such that p + 8, p + 14, p + 18 and p + 20 are also primes.at n=26A385035
- Prime numbersat n=8599