58617

Appears in sequences

• Expansion of log(1+x)*cosh(sin(x)).at n=9A009412
• a(n) is the smallest positive integer m such that if k >= m then a(k+1,n)^(1/(k+1)) <= a(k,n)^(1/k), where a(k,n) is the k-th term of the sequence {p | p and p+2n are primes}.at n=33A248855
• T(n,k)=Number of length n+4 0..k arrays with every five consecutive terms having the maximum of some two terms equal to the minimum of the remaining three terms.at n=37A254698
• Number of length 2+4 0..n arrays with every five consecutive terms having the maximum of some two terms equal to the minimum of the remaining three terms.at n=7A254700
• Greatest integer k such that k/2^n < sqrt(1/5).at n=17A293334
• The integer k that minimizes |k/2^n - sqrt(1/5)|.at n=17A293336