37951
domain: N
Properties
Primality
- Prime
- yes
Appears in sequences
- a(n) = T(n,2n-7), T given by A027023.at n=9A027031
- Sum{T(i,n-i): i=0,1,...,n}, array T as in A047040; Sum{T(i,n-i): i=0,1,...,n}, array T given by A047050.at n=17A047041
- Initial term in sequence of four consecutive primes separated by 3 consecutive differences each <=6 (i.e., when d = 2, 4 or 6) and forming d-pattern = [6, 6, 4]; short d-string notation of pattern = [664].at n=25A078858
- Indices of primes in sequence defined by A(0) = 37, A(n) = 10*A(n-1) - 3 for n > 0.at n=13A101840
- Primes with at least one of each odd digit and no even digits.at n=11A108418
- Self-convolution equals A113224.at n=14A113281
- Even bisection of A113281: a(n) = A113281(2*n).at n=7A113283
- Home primes whose homeliness is greater than 5.at n=18A133965
- Home primes whose homeliness is greater than 6.at n=8A133967
- Home primes whose homeliness is 7.at n=5A133968
- Pyramid game person numbers that have integer solutions.at n=34A135051
- Primes of the form x^2 + 7*y^2, where x and y=x+1 are consecutive natural numbers.at n=32A176616
- Primes of the form 2*n^2 + 90*n + 43.at n=11A217621
- Positions of 2 in sequence A217916.at n=34A217918
- Primes p with each odd decimal digit present at least once.at n=11A232447
- Primes prime(k) such that 2^(k-1) - prime(k) is also prime.at n=16A244913
- Primes equal to a hexagonal number plus 1.at n=33A285790
- Prime numbersat n=4010