29032

Appears in sequences

• Numbers k such that the period of the continued fraction for sqrt(k) contains exactly 29 ones.at n=12A031797
• Sums of terms of groups in A075626.at n=37A075629
• Numbers n such that n^2 is divisible by the sum of the distinct prime divisors of n^2 + 1.at n=16A196219
• Number of n X 1 0..1 arrays with the number of 1's king-move adjacent to some 0 one less than the number of 0's adjacent to some 1.at n=17A284449
• G.f. satisfies A(x) = ( 1 + x * A(x)^(1/4) * (1 + A(x)^(5/4)) )^2.at n=6A371723