41204

Appears in sequences

• Non-palindromic numbers such that the two largest proper divisors are palindromes having at least two digits and no other divisor is a palindrome with at least two digits.at n=25A074889
• Number of ordered triples (w,x,y) with all terms in {-n,...-1,1,...,n} and 2w+x+y>1.at n=22A211618
• Number of nondecreasing sequences of n 1..7 integers with every element dividing the sequence sum.at n=37A212535
• Expansion of Product_{k>=0} 1/(1 - x^(3*k+1))^2.at n=47A261616
• a(0) = a(1) = 1; a(n) = [x^n] Product_{k=1..n-1} 1/(1 - a(k)*x^a(k)).at n=26A300411