A202078 Number of arrays of 7 integers in -n..n with sum zero and the sum of every adjacent pair being odd.
6, 96, 1014, 3752, 15010, 35604, 95342, 181834, 390544, 654086, 1221708, 1876930, 3183404, 4598874, 7268148, 10026924, 15014418, 19984692, 28678218, 37094052, 51428190, 64980344, 87564274, 108501126, 142759916, 173998474, 224327824
Offset: 1
Keywords
Examples
Some solutions for n=3 ..1...-1....3....1...-3...-3....3....3....1...-3....1....1....3...-1...-1...-1 ..2....0...-2....0....0....0...-2...-2....0...-2....2...-2....0...-2....0....2 ..1....1....1...-1....1...-1...-3....1...-3....1....1....3....1....1....3...-1 ..2....2....2....0....0...-2...-2...-2....2...-2...-2....2...-2...-2....0....0 .-3....1....1....1....1....3....3....3...-1....3...-3...-3...-3....3...-1...-1 .-2....0...-2...-2....0....0...-2...-2....0....2....0...-2....0....0...-2....0 .-1...-3...-3....1....1....3....3...-1....1....1....1....1....1....1....1....1
Links
- R. H. Hardin, Table of n, a(n) for n = 1..210
Formula
Empirical: a(n) = a(n-1) +6*a(n-2) -6*a(n-3) -15*a(n-4) +15*a(n-5) +20*a(n-6) -20*a(n-7) -15*a(n-8) +15*a(n-9) +6*a(n-10) -6*a(n-11) -a(n-12) +a(n-13)
Comments