25111
domain: N
Properties
Primality
- Prime
- yes
Appears in sequences
- Each permutation in the list A060117 converted to Site Swap notation, with "zero throws" (fixed elements) replaced with n, the length of siteswap.at n=34A060495
- Primes p such that (x1*x2*...*xk)^(x1+x2+...+xk) = (x1+x2+...+xk)^(x1*x2*...*xk) where x1x2...xk are the digits of p in base 10.at n=12A064157
- Prime numbers such that sum of digits equals product of digits.at n=11A066306
- Primes which can be expressed as concatenation of powers of 5 and 0's.at n=22A066596
- Primes associated with groups in A076077.at n=33A076076
- a(n) is the smallest m such that m < 10^n, 10^n + m is prime and if the natural number k is such that 1 < k < 10 and 3 doesn't divide k*10^n + m then k*10^n+m is prime.at n=5A078728
- Initial term in sequence of four consecutive primes whose consecutive differences have d-pattern = [6, 4, 6]; short d-string notation for pattern = [646].at n=30A078856
- Smallest prime such that n*k(n)^2+n*k(n)+1 is a prime > (n-1)*k(n-1)^2+(n-1)*k(n-1)+1 with k(n)>1 or 0 if n=4 as no prime possible.at n=26A104995
- Primes p such that the polynomial x^5-x^4-x^3-x^2-x-1 mod p has 5 distinct zeros.at n=17A106281
- Primes that do not divide any term of the Lucas 5-step sequence A074048.at n=8A106301
- Primes with digital product = 10.at n=5A107696
- Times in hours, minutes and seconds (to the nearest second) at which the hour and minute hands of an analog clock, if interchanged, continue to indicate some other albeit accurate times, over a complete 12-hour sweep for the slower hand. Leading zeros omitted.at n=34A121577
- Prime numbers p of the form 10k+1 for which the pentanacci quintic polynomial x^5-x^4-x^3-x^2-x-1 modulus p is factorizable into five binomials.at n=4A135843
- Prime numbers p for which quintonacci quintic polynomial x^5-x^4-x^3-x^2-x-1 modulus p is completely factorizable.at n=18A135846
- Prime numbers p such that p +- ((p-1)/5) are primes.at n=22A137714
- Primes p such that the multiplicative order of 2 modulo p is (p-1)/10.at n=33A152310
- Primes p such that p^2 divides 2^(2^(p-1)-1) - 1.at n=29A188465
- Numbers with digital product = 10.at n=35A199990
- Primes of the form 2*n^2 + 42*n + 19.at n=13A221903
- Prime numbers containing the string 111.at n=18A243527