40483

Properties

Appears in sequences

• Primes whose consecutive digits differ by 4 or 5.at n=27A048416
• Primes p such that p + 2^2, p + 4^2 and p + 6^2 are also primes.at n=40A092475
• 5th diagonal of triangle in A059317.at n=29A106113
• Number of strings of n+2 numbers x(i) in -4..4 with the sum of x(i) equal to zero and the sums of x(i)*x(i+1) and x(i)*x(i+2) equal to each other.at n=5A184056
• T(n,k) = Number of strings of n+2 numbers x(i) in -k..k with the sum of x(i) equal to zero and the sums of x(i)*x(i+1) and x(i)*x(i+2) equal to each other.at n=41A184061
• Primes of the form 2*n^2 + 34*n + 15.at n=13A217494
• Number of (6+2) X (n+2) 0..3 arrays with every 3 X 3 subblock row and diagonal sum equal to 0 3 5 6 or 7 and every 3 X 3 column and antidiagonal sum not equal to 0 3 5 6 or 7.at n=14A252390
• Partial sums of the number of active (ON, black) cells in n-th stage of growth of two-dimensional cellular automaton defined by "Rule 577", based on the 5-celled von Neumann neighborhood.at n=35A273024
• First of three consecutive primes p,q,r such that r^2-p^2+p, r^2-p^2+q and r^2-p^2+r are consecutive primes.at n=40A347531
• Primes in A239237.at n=32A361252
• Primes having only {0, 3, 4, 8} as digits.at n=34A386059
• A generalization of Euclid-Mullin sequence A000945 applied to generate only primes of the form 4k+3: let Q be the product of all preceding terms, then a(n) is the smallest prime factor of the form 4k+3 of whichever of {Q+2, Q+4} has the form 4k+3.at n=12A389974
• Prime numbersat n=4243