37277

Properties

Appears in sequences

• Expansion of (1-x)/(1 - x - 2*x^3 + x^4).at n=27A052916
• Larger of a pair of consecutive primes having only prime digits.at n=22A082756
• Members of A083989 whose 10's complement is also a member of A083989.at n=33A083991
• Primes which are -1 mod m, where m is the index of the prime in sequence A002313 (Real primes with corresponding complex primes). The index m can be found in A084164 Primes which are 1 mod m can be found in sequence A084165.at n=10A084163
• Balanced primes of order nine.at n=20A096701
• Irregular array where row n is the positive integers which divide the sum of all previous rows. a(1,1)=1.at n=62A119763
• Number of matrices with nonnegative integer entries and without zero rows or columns such that sum of all entries is equal to n.at n=6A120733
• Primes A080478(n)^2 + A080478(n+1)^2.at n=23A139361
• Primes in A118482.at n=13A172102
• Integers k such that 2^(k-1) == 1 (mod k) and 2^(m-1) == 1 (mod m), where m = k*(A000265(k-1) - 1) + 1 and A000265 gives the odd part of its argument.at n=24A187849
• Primes obtained by merging 5 successive digits in the decimal expansion of sqrt(2) + sqrt(3) + sqrt(5).at n=35A241221
• Numbers generated by a Fibonacci-like sequence in which zeros are suppressed.at n=29A243063
• a(n) is the number of distinct products p of Fibonacci numbers such that Fibonacci(n) < p <= Fibonacci(n + 1).at n=50A286948
• Primes p such that 4*p+3, 6*p+5 and 8*p+7 are all primes.at n=41A329551
• Primes p such that the 10's complement A089186(p) and the concatenations of p and A089186(p) and of A089186(p) and p are all prime.at n=30A372082
• Primes which satisfy the requirements of A380943 in more than one way.at n=16A383810
• Primes which satisfy the requirements of A380943 in exactly two ways.at n=15A383811
• Prime numbersat n=3948