Sequences
392,541 sequences
- Inverse of 1102nd cyclotomic polynomial.A015111
Inverse of 1102nd cyclotomic polynomial.
- Triangle of q-binomial coefficients for q=-4.A015112
Triangle of q-binomial coefficients for q=-4.
- Triangle of q-binomial coefficients for q=-5.A015113
Triangle of q-binomial coefficients for q=-5.
- Inverse of 1105th cyclotomic polynomial.A015114
Inverse of 1105th cyclotomic polynomial.
- Inverse of 1106th cyclotomic polynomial.A015115
Inverse of 1106th cyclotomic polynomial.
- Triangle of q-binomial coefficients for q=-6.A015116
Triangle of q-binomial coefficients for q=-6.
- Triangle of q-binomial coefficients for q=-7.A015117
Triangle of q-binomial coefficients for q=-7.
- Triangle of q-binomial coefficients for q=-8.A015118
Triangle of q-binomial coefficients for q=-8.
- Inverse of 1110th cyclotomic polynomial.A015119
Inverse of 1110th cyclotomic polynomial.
- Inverse of 1111th cyclotomic polynomial.A015120
Inverse of 1111th cyclotomic polynomial.
- Triangle of q-binomial coefficients for q=-9.A015121
Triangle of q-binomial coefficients for q=-9.
- Inverse of 1113th cyclotomic polynomial.A015122
Inverse of 1113th cyclotomic polynomial.
- Triangle of q-binomial coefficients for q=-10.A015123
Triangle of q-binomial coefficients for q=-10.
- Triangle of q-binomial coefficients for q=-11.A015124
Triangle of q-binomial coefficients for q=-11.
- Triangle of q-binomial coefficients for q=-12.A015125
Triangle of q-binomial coefficients for q=-12.
- Least k such that phi(k) = phi(n).A015126
Least k such that phi(k) = phi(n).
- Inverse of 1118th cyclotomic polynomial.A015127
Inverse of 1118th cyclotomic polynomial.
- Number of overpartitions of n: an overpartition of n is an ordered sequence of nonincreasing integers that sum to n, where the first occurrence of each integer may be overlined.A015128
Number of overpartitions of n: an overpartition of n is an ordered sequence of nonincreasing integers that sum to n, where the first occurrence of each integer may be overlined.
- Triangle of (Gaussian) q-binomial coefficients for q = -13.A015129
Triangle of (Gaussian) q-binomial coefficients for q = -13.
- Inverse of 1121st cyclotomic polynomial.A015130
Inverse of 1121st cyclotomic polynomial.
- Inverse of 1122nd cyclotomic polynomial.A015131
Inverse of 1122nd cyclotomic polynomial.
- Triangle of (Gaussian) q-binomial coefficients for q=-14.A015132
Triangle of (Gaussian) q-binomial coefficients for q=-14.
- Triangle of (Gaussian) q-binomial coefficients for q=-15.A015133
Triangle of (Gaussian) q-binomial coefficients for q=-15.
- Consider Fibonacci-type sequences b(0)=X, b(1)=Y, b(k)=b(k-1)+b(k-2) mod n; all are periodic; sequence gives number of distinct periods.A015134
Consider Fibonacci-type sequences b(0)=X, b(1)=Y, b(k)=b(k-1)+b(k-2) mod n; all are periodic; sequence gives number of distinct periods.
- Consider Fibonacci-type sequences f(0)=X, f(1)=Y, f(k)=f(k-1)+f(k-2) mod n; all are periodic; sequence gives number of distinct periods.A015135
Consider Fibonacci-type sequences f(0)=X, f(1)=Y, f(k)=f(k-1)+f(k-2) mod n; all are periodic; sequence gives number of distinct periods.
- Consider Fibonacci-type sequences b(0)=X, b(1)=Y, b(k) = (b(k-1) + b(k-2)) mod n; all are periodic; sequence gives minimal nontrivial period.A015136
Consider Fibonacci-type sequences b(0)=X, b(1)=Y, b(k) = (b(k-1) + b(k-2)) mod n; all are periodic; sequence gives minimal nontrivial period.
- Consider Fibonacci-type sequences b(0)=X, b(1)=Y, b(k)=b(k-1)+b(k-2) mod n; all are periodic; sequence gives number of nontrivial periods of minimal length.A015137
Consider Fibonacci-type sequences b(0)=X, b(1)=Y, b(k)=b(k-1)+b(k-2) mod n; all are periodic; sequence gives number of nontrivial periods of minimal length.
- Consider Fibonacci-type sequences b(0)=X, b(1)=Y, b(k)=b(k-1)+b(k-2) mod n; all are periodic; sequence gives number of maximal length periods.A015138
Consider Fibonacci-type sequences b(0)=X, b(1)=Y, b(k)=b(k-1)+b(k-2) mod n; all are periodic; sequence gives number of maximal length periods.
- Triangle of (Gaussian) q-binomial coefficients for q=-16.A015139
Triangle of (Gaussian) q-binomial coefficients for q=-16.
- Inverse of 1131st cyclotomic polynomial.A015140
Inverse of 1131st cyclotomic polynomial.
- Triangle of (Gaussian) q-binomial coefficients for q=-17.A015141
Triangle of (Gaussian) q-binomial coefficients for q=-17.
- Inverse of 1133rd cyclotomic polynomial.A015142
Inverse of 1133rd cyclotomic polynomial.
- Triangle of (Gaussian) q-binomial coefficients for q=-18.A015143
Triangle of (Gaussian) q-binomial coefficients for q=-18.
- Triangle of (Gaussian) q-binomial coefficients for q=-19.A015144
Triangle of (Gaussian) q-binomial coefficients for q=-19.
- Triangle of (Gaussian) q-binomial coefficients for q=-20.A015145
Triangle of (Gaussian) q-binomial coefficients for q=-20.
- Triangle of (Gaussian) q-binomial coefficients for q=-21.A015146
Triangle of (Gaussian) q-binomial coefficients for q=-21.
- Triangle of (Gaussian) q-binomial coefficients for q=-22.A015147
Triangle of (Gaussian) q-binomial coefficients for q=-22.
- Inverse of 1139th cyclotomic polynomial.A015148
Inverse of 1139th cyclotomic polynomial.
- Inverse of 1140th cyclotomic polynomial.A015149
Inverse of 1140th cyclotomic polynomial.
- Triangle of (Gaussian) q-binomial coefficients for q=-23.A015150
Triangle of (Gaussian) q-binomial coefficients for q=-23.
- Triangle of (Gaussian) q-binomial coefficients for q=-24.A015151
Triangle of (Gaussian) q-binomial coefficients for q=-24.
- Sum of (Gaussian) q-binomial coefficients for q=-2.A015152
Sum of (Gaussian) q-binomial coefficients for q=-2.
- Inverse of 1144th cyclotomic polynomial.A015153
Inverse of 1144th cyclotomic polynomial.
- Sum of (Gaussian) q-binomial coefficients for q=-3.A015154
Sum of (Gaussian) q-binomial coefficients for q=-3.
- Sum of (Gaussian) q-binomial coefficients for q=-4.A015155
Sum of (Gaussian) q-binomial coefficients for q=-4.
- Inverse of 1147th cyclotomic polynomial.A015156
Inverse of 1147th cyclotomic polynomial.
- Inverse of 1148th cyclotomic polynomial.A015157
Inverse of 1148th cyclotomic polynomial.
- Theta series of 17-dimensional lattice Q_17(6).A015158
Theta series of 17-dimensional lattice Q_17(6).
- Theta series of 17-dimensional lattice Q_17(6)^{+2}.A015159
Theta series of 17-dimensional lattice Q_17(6)^{+2}.
- Theta series of 17-dimensional lattice Q_17(6)^{+3}.A015160
Theta series of 17-dimensional lattice Q_17(6)^{+3}.