97524

Appears in sequences

• Smallest integer m such that the product of every 4 consecutive integers > m has a prime factor > prime(n).at n=20A003033
• Smallest integer m such that the product of every 4 consecutive integers > m has a prime factor > prime(n).at n=21A003033
• Smallest integer m such that the product of every 4 consecutive integers > m has a prime factor > prime(n).at n=22A003033
• Smallest integer m such that the product of every 4 consecutive integers > m has a prime factor > prime(n).at n=23A003033
• Riordan array (1/(1-3x),x(1-x)/(1-3x)^2).at n=38A114195
• Integers n such that for all i > n the largest prime factor of i(i+1)(i+2)(i+3) exceeds the largest prime factor of n(n+1)(n+2)(n+3).at n=12A193945
• Integers n such that for all i > n the largest prime factor of i(i+1)(i+2)(i+3)(i+4) exceeds the largest prime factor of n(n+1)(n+2)(n+3)(n+4).at n=16A193946
• G.f. satisfies: A(x) = A(x^2)^3 + x*A(x^2)^2.at n=28A195200