-357

Appears in sequences

• E.g.f.: sin(log(1+x))*log(1+x)/2.at n=7A024332
• Expansion of Product_{m>=1} ((1+q^(2*m-1))/(1+q^(2*m)))^7.at n=8A029844
• Triangle T, read by rows, such that column k equals column 0 of T^(k+1), where column 0 of T allows the n-th row sums to be zero for n>0 and where T^k is the k-th power of T as a lower triangular matrix.at n=28A101897
• Column 0 of triangular matrix A101897, in which column k equals column 0 of A101897^(k+1) and where the n-th row sums are zero for n>0.at n=7A101900
• Triangle, read by rows, equal to the matrix inverse of R=A113389.at n=42A114159
• Triangle, real terms extracted from squares of paired terms in arithmetic sequences.at n=47A121164
• Numerator of Bernoulli(n, -2/5).at n=5A157906
• Numerator of Bernoulli(n, -7/10).at n=3A159015
• Numerator of Bernoulli(n, -3/11).at n=3A159244
• First differences of A169699.at n=15A169700
• Triangle, read by rows, T(n, k) = p(n)/(p(k)*p(n-k)), where p(n) = Product_{j=1..n} A001607(j).at n=48A177693
• Triangle, read by rows, T(n, k) = p(n)/(p(k)*p(n-k)), where p(n) = Product_{j=1..n} A001607(j).at n=51A177693
• Exponential generating function is (1-x^1/1!)(1-x^2/2!)(1-x^3/3!)....at n=8A185895
• Triangle of coefficients of Gaussian polynomials [2n+5,4]_q represented as finite sum of terms (1+q^2)^k*q^(g-k), where k = 0,1,...,g with g=4n+2.at n=40A267484
• First differences of number of active (ON, black) cells in n-th stage of growth of two-dimensional cellular automaton defined by "Rule 165", based on the 5-celled von Neumann neighborhood.at n=11A270460
• Coefficients in the expansion of ([s] + [2s]x + [3s]x^2 + ...)/([r] + [2r]x + [3r]x^2 + ...); [ ] = floor, r = sqrt(2), s = sqrt(3).at n=28A279628
• Expansion of Product_{k>=1} 1/(1 - mu(k)*x^k), where mu() is the Möbius function (A008683).at n=59A306327
• Expansion of Product_{k>=1} (1 - x^k * (1 + x)).at n=50A306565
• Inverse binomial transform of A327460.at n=7A327459
• Difference triangle for A327460 read by upwards antidiagonals.at n=28A328071