1016064

Appears in sequences

• (Terms in A014738)/4.at n=30A051515
• Numbers whose sum of non-unitary divisors is a prime and sets a new record for such primes.at n=31A063760
• Squares arising in A085039. n-th partial sum of A085039.at n=30A085040
• Sum of the non-unitary divisors of A064115(n) (or of 1+A064115(n)).at n=16A103846
• Numbers of the form (7^i)*(12^j), with i, j >= 0.at n=26A108238
• a(n) is the square of the coefficient of x^n in 1/(1 - x*A(x^2)), where g.f. A(x) = Sum_{n>=0} a(n)*x^n.at n=14A121648
• Triangle T(n, k) = n! * binomial(n, k)*( psi(n-k+1) - psi(k+1) ), read by rows.at n=39A157521
• Triangle of polynomial coefficients related to 3F2([1,n+1,n+1],[n+2,n+2],z).at n=19A162990
• The second right hand column of triangle A162990.at n=4A162992
• Sequence with e.g.f. g(x) = -(1/2)*sqrt(2*exp(-2*x)-1) + 1/2.at n=8A176785
• Number of (n+2) X 4 binary arrays avoiding patterns 001 and 011 in rows and columns.at n=10A202094
• Number of nX2 0..2 arrays with every element neighboring horizontally or vertically both a 0 and a 1.at n=12A203536
• Triangle read by rows: terms T(n,k) of a binomial decomposition of n^n as Sum(k=0..n)T(n,k).at n=52A244121
• Number of (n+1)X(3+1) 0..1 arrays with nondecreasing sum of every two consecutive values in every row and column.at n=11A250427
• The first of three consecutive squares the sum of which is equal to the sum of three consecutive primes.at n=29A298222
• Obverse convolution (n)**(floor(3n/2)); see Comments.at n=6A374879
• Squares in A378769.at n=22A378984
• Nonprimes k such that sopfr(k) = rad(k), where sopfr(k) is sum of the prime factors of k (counting multiplicity), and rad(k) is the product of its distinct prime factors.at n=18A386916