35296
domain: N
Appears in sequences
- Numbers k such that 217*2^k+1 is prime.at n=9A032485
- Row sums of triangle A064308.at n=5A064309
- Positive square-root of terms of the self-convolution of A087150.at n=40A087151
- Numbers k that divide Lucas(k) + 1.at n=42A094398
- Molecular topological indices of the path graphs P_n.at n=37A121318
- Coefficients of polynomials (in descending powers of x) P(n,x) := 1 + P(n-1,x)^2, where P(1,x) = x + 1.at n=26A158985
- Half the difference between the larger and smaller term of the n-th amicable pair.at n=36A162884
- Triangle of coefficients of polynomials v(n,x) jointly generated with A210862; see the Formula section.at n=49A210863
- Numbers n such that sum of cubes of digits of n equals the sum of prime divisors of n.at n=18A217531
- Number of (n+2)X(2+2) 0..1 arrays with every 3X3 subblock diagonal sum plus antidiagonal median nondecreasing horizontally and vertically.at n=2A254888
- Number of (n+2)X(3+2) 0..1 arrays with every 3X3 subblock diagonal sum plus antidiagonal median nondecreasing horizontally and vertically.at n=1A254889
- T(n,k)=Number of (n+2)X(k+2) 0..1 arrays with every 3X3 subblock diagonal sum plus antidiagonal median nondecreasing horizontally and vertically.at n=7A254894
- T(n,k)=Number of (n+2)X(k+2) 0..1 arrays with every 3X3 subblock diagonal sum plus antidiagonal median nondecreasing horizontally and vertically.at n=8A254894
- Half the difference between the larger and smaller terms of the n-th amicable pair (x,y) given in A259933.at n=36A275470
- The second Zagreb index of the Aztec diamond AZ(n) (see the Ramanes et al. reference, Theorem 2.2).at n=22A292345
- Triangle read by rows, T(n, k) the coefficients of some polynomials in Pi, for n >= 0 and 0 <= k <= n.at n=42A295516
- Irregular triangular array, read by rows: row n shows the coefficients of the polynomial p(n,x) defined in Comments.at n=29A329429
- Lexicographically earliest sequence of distinct terms > 0 such that the sum a(n) + a(n+1) is a substring of the concatenation (a(n), a(n+1)).at n=37A359482
- Expansion of (1/x) * Series_Reversion( x*(1-x-x^5)/(1-x) ).at n=24A366112