82824

Appears in sequences

• Partial sums of A034263.at n=13A051947
• Numbers whose number of divisors equals the sum of their separate prime-power decompositions.at n=26A087004
• Numbers n such that P(13*n) is prime, where P(n) is the unrestricted partition number.at n=40A113518
• Nonnegative values x of solutions (x, y) to the Diophantine equation x^2+(x+119)^2 = y^2.at n=36A129837
• Let x(1)x(2)...x(q) the decimal expansion of the numbers k having exactly q distinct prime divisors p(1) < p(2) < ... < p(q). Sequence lists the numbers k such that p(1)/x(q) + p(2)/x(q-1)+ ... + p(q)/x(1) is an integer.at n=33A235153
• Number of length-4 0..n arrays with no repeated value greater than or equal to the previous repeated value.at n=15A269410
• Expansion of 1 / ((1 - x)^7*(1 + x)^4).at n=26A299336
• a(n) = 1*2*3*4 - 5*6*7*8 + 9*10*11*12 - 13*14*15*16 + ... - (up to n).at n=19A319544
• a(n) = 4*3*2*1 - 8*7*6*5 + 12*11*10*9 - 16*15*14*13 + ... - (up to the n-th term).at n=19A319887