-343

Appears in sequences

• Shifts left when Moebius transformation applied twice.at n=32A007551
• Expansion of e.g.f.: cos(exp(x)-sec(x))=1-1/2!*x^2-3/4!*x^4+20/5!*x^5+3/6!*x^6...at n=8A013332
• Numerators of table a(n,k) read by antidiagonals: a(0,k) = 1/(k+1), a(n+1,k) = (k+1)*(a(n,k) - a(n,k+1)), n >= 0, k >= 0.at n=84A051714
• Coefficients of the '6th-order' mock theta function psi(q).at n=50A053269
• a(n) = (a(n-1)a(n-5) + a(n-2)a(n-4) + a(n-3)^2)/a(n-6).at n=50A058232
• Weight 5 level 11 cusp form with complex multiplication by Q(sqrt(11)) and trivial character.at n=14A065099
• Coefficients of the C-Bailey Mod 9 identity.at n=55A104469
• McKay-Thompson series of class 44b for the Monster group.at n=61A112184
• Triangular table containing values of coefficients of the characteristic polynomial of a certain n x n circulant matrix, read by rows.at n=30A127412
• Expansion of q^(-3/8)* eta(q)^7* eta(q^4)^2/ eta(q^2)^3 in powers of q.at n=47A128713
• Expansion of q^(-3/8)* eta(q)^7* eta(q^4)^2/ eta(q^2)^3 in powers of q.at n=67A128713
• Scaled row sum zero vector recursion:s=7; v(n)={s^(n+1),s^(n+1)-Sum[s^i,{i,2,n}],s^n,...,-1}/s^2.at n=32A152861
• Scaled row sum zero vector recursion:s=7; v(n)={s^(n+1),s^(n+1)-Sum[s^i,{i,2,n}],s^n,...,-1}/s^2.at n=24A152861
• Scaled row sum zero vector recursion:s=7; v(n)={s^(n+1),s^(n+1)-Sum[s^i,{i,2,n}],s^n,...,-1}/s^2.at n=41A152861
• Scaled row sum zero vector recursion:s=7; v(n)={s^(n+1),s^(n+1)-Sum[s^i,{i,2,n}],s^n,...,-1}/s^2.at n=17A152861
• Perfect powers (m^k where m is an integer and k >= 2) multiplied by -1 when m is prime for largest k (m^k thus a prime power).at n=25A157985
• Numerator of Hermite(n, 13/32).at n=2A160396
• Totally multiplicative sequence with a(p) = 7*(p-3) for prime p.at n=7A167317
• Coefficients in expansion of Jacobi theta_1'''(0).at n=6A178737
• Expansion of o.g.f.(1-x^4)/(1-x+x^8).at n=52A193669