This is a front-end for the Online Encyclopedia of Integer Sequences, made by Christian Perfect. The idea is to provide OEIS entries in non-ancient HTML, and then to think about how they're presented visually. The source code is on GitHub.
%I A125077 #16 Jun 05 2021 01:37:43 %S A125077 1,1,3,1,4,11,1,7,15,41,1,8,38,56,153,1,11,46,186,209,571,1,12,81,232, %T A125077 859,780,2131,1,15,93,499,1091,3821,7953,1,16,140,592,2774,4912,16556, %U A125077 10864,29681,1,19,156,1044,3366 %N A125077 #4 in an infinite set of generalized Pascal's triangles with trigonometric properties. %C A125077 Row sums are powers of 4. The triangle is #4 in an infinite of generalized Pascal's triangles constrained by two rules: row sums are powers of N and upward sloping diagonals (as coefficients to polynomials with alternating signs) have roots N + 2*cos(2*Pi/Q). %C A125077 Right border, A001835, and next to right border, A001353 = bisections of denominator of continued fraction [1, 2, 1, 2, 1, 2, 1, 2]; i.e., bisection of A002530. - _Gary W. Adamson_, Jun 21 2009 %F A125077 Upward-sloping diagonals of the triangle are derived from (alternating) characteristic polynomials of two types of matrices: those of the form: (all 1's in the super and subdiagonals and 3,4,4,4,... in the main diagonal) and (all 1's in the super and subdiagonals and 4,4,4,... in the main diagonal. %e A125077 First few rows of the triangle are: %e A125077 1; %e A125077 1, 3; %e A125077 1, 4, 11; %e A125077 1, 7, 15, 41; %e A125077 1, 8, 38, 56, 153; %e A125077 1, 11, 46, 186, 209, 571; %e A125077 1, 12, 81, 232, 859, 780, 2131; %e A125077 ... %e A125077 The upward-sloping diagonal (1, 11, 38, 41) relates to the heptagon and in the form x^3 - 11x^2 + 38x - 41 has a root 5.24697960... = 4 + 2*cos(2*Pi/7). The corresponding matrix is [3, 1, 0; 1, 4, 1; 0, 1, 4]. The next upward-sloping diagonal relates to the octagon, with a characteristic polynomial x^3 - 12x^2 + 46x - 56 and a root 5.414213562... = 4 + 2*cos(2*Pi/8). The corresponding matrix is [4, 1, 0; 1, 4, 1; 0, 1, 4]. %Y A125077 Cf. A125076, A125078. %Y A125077 Cf. A001835, A001353. - _Gary W. Adamson_, Jun 21 2009 %K A125077 nonn,tabl %O A125077 1,3 %A A125077 _Gary W. Adamson_, Nov 18 2006