-94

Appears in sequences

• Coefficients of the '2nd-order' mock theta function mu(q).at n=37A006306
• 6th differences of primes.at n=39A036267
• Triangle formed from expansion of (x-1)*(x+2)*(x-3)*...*(x+-n).at n=38A047991
• Matrix inverse of triangle A055277(n+1,k).at n=40A055288
• McKay-Thompson series of class 10E for Monster.at n=38A058101
• McKay-Thompson series of class 10b for Monster.at n=18A058103
• Apply inverse of "INVERT" transform to primes with prime exponents.at n=11A058315
• Difference between the sum of the odd aliquot divisors of n and the sum of the even aliquot divisors of n.at n=79A058344
• McKay-Thompson series of class 27d for Monster.at n=41A058604
• McKay-Thompson series of class 33A for Monster.at n=52A058636
• a(n) = 2*n*mu(n).at n=46A062004
• Expansion of Product_{k>=1} (1 - 2x^k).at n=51A070877
• Imaginary part of the function defined multiplicatively on the complex numbers by 2->(2,0) and p->((floor(p/4)+floor((p mod 4)/2))*4,2-(p mod 4)) for odd primes p.at n=53A076341
• Expansion of (1-x)^(-1)/(1+x-x^2-2*x^3).at n=28A077901
• 5th differences of partition numbers A000041.at n=26A081095
• Triangle of coefficients of numerators of powers of e^2 in Sum_{k>=1} {1 / (1 + (k+1/2)^2*Pi^2)^n} + {4^n / (4+Pi^2)^n}.at n=10A085471
• Values of L(10^n), where L(n) is the summatory function of the Liouville function A008836(n).at n=4A090410
• Expansion of (1-3*x^2)/((1-2*x)*(1+3*x)).at n=5A091003
• First differences of A081145.at n=56A099004
• Riordan array (((1+x)^2 - x^3)/(1+x)^3, 1/(1+x)).at n=56A099569