36880
domain: N
Appears in sequences
- Numbers k such that the least term in the periodic part of the continued fraction for sqrt(k) is 24.at n=15A031702
- a(n) = ((9 + sqrt(5))^n - (9 - sqrt(5))^n)/(2*sqrt(5)).at n=4A153886
- a(n) = 64*n^2 + 16.at n=23A157912
- a(n) = 576*n^2 + 2*n.at n=7A158369
- a(n) = 256*n^2 + 16.at n=12A158574
- Number of nX2 0,1 arrays with the row and column sums nondecreasing.at n=13A202554
- Values x of successive minima records of k = log(x)/log(d) where d runs through the positive values of x^3-round(sqrt(x^3))^2.at n=15A232536
- Number of length n+5 0..4 arrays with no six consecutive terms having two times the sum of any two elements equal to the sum of the remaining four.at n=1A249229
- T(n,k)=Number of length n+5 0..k arrays with no six consecutive terms having two times the sum of any two elements equal to the sum of the remaining four.at n=11A249233
- Number of length 2+5 0..n arrays with no six consecutive terms having two times the sum of any two elements equal to the sum of the remaining four.at n=3A249235
- Number of regions among all distinct circles that can be constructed from an n X n square grid of points when each pair of points is connected by a circle and the points lie at the ends of a diameter of the circle.at n=4A360352