35839

Properties

Appears in sequences

• Generalized Fibonacci numbers.at n=11A015441
• Primes p such that p, p+12, p+24 are consecutive primes.at n=34A052188
• Numbers k such that 2*k^2 + 14 is a square.at n=11A077446
• Expansion of x^2/((1-2*x)*(1+3*x)).at n=12A091005
• a(n) is the largest prime factor of 2^n + 3^n.at n=10A094474
• Sum of odd powers of 2 and of 3 divided by 5.at n=5A096951
• Numerators of upper bounds for Lagrange remainder in Taylor's expansion of log((1+x)/(1-x)) for x=1/3, multiplied by 6/5.at n=5A096952
• Primes that are a concatenation of 3, 5 and a prime.at n=31A101219
• Zsigmondy numbers for a = 3, b = 2: Zs(n, 3, 2) is the greatest divisor of 3^n - 2^n (A001047) that is relatively prime to 3^m - 2^m for all positive integers m < n.at n=21A109325
• Primes of form (3^n + 2^n)/5.at n=2A127908
• List of primitive prime divisors of the numbers 3^n-2^n (A001047) in their order of occurrence.at n=26A129734
• Numbers m such that k = m*23^2 divides 3^(k-1) - 2^(k-1).at n=17A130058
• Primes p such that k=p*23^2 divides 3^(k-1) - 2^(k-1); or primes in A130058.at n=7A130059
• a(n) = 2*a(n-1) + a(n-2), with a(0)= -1, a(1)= 3.at n=12A135532
• Smallest prime p such that M(n)^2 - p*M(n) + 1 is prime with M(n) = A000668(n).at n=13A139429
• Indices of primes in the Padovan sequence A000931.at n=24A152870
• a(n) = 1024*n - 1.at n=34A158421
• a(n) = n^3 - 3n^2 + 3.at n=34A177058
• A diagonal of square array A192404.at n=5A192407
• Number of simple connected graphs with n nodes and exactly 3 articulation points (cutpoints).at n=9A241769