969323029
domain: N
Appears in sequences
- Bisection of Lucas sequence: a(n) = L(2*n+1).at n=21A002878
- Odd Lucas numbers.at n=28A014447
- a(n) = 4*a(n-1) + a(n-2); a(0)=1, a(1)=7.at n=14A048876
- Squarefree Lucas numbers.at n=31A063509
- Sequence arising from factorization of the Fibonacci numbers.at n=42A072183
- Sums of two consecutive nonprime Fibonacci numbers (A090206).at n=33A090208
- a(1) = 1, a(2) = 2, a(n+1) = n*a(1) + (n-1)*a(2) + ... + (n-r)*a(r+1) + ... + a(n).at n=22A093960
- a(0)=-1, a(1)=-1, a(n)=-3*a(n-1)-a(n-2) for n>1.at n=22A098149
- Lucas numbers for which the product of the digits is a Fibonacci number.at n=19A117769
- Lucas numbers for which the sum of the digits is a prime.at n=13A117790
- Numbers n such that the quintic polynomial x^5 - 10*n*x^2 - 24*n has Galois group A_5 over rationals.at n=20A135064
- Odd terms in A014217.at n=22A142718
- Nonprime Lucas numbers.at n=29A172159
- a(n) = Lucas(prime(n)).at n=13A180363
- Integers n such that n^2 is the difference of two Lucas numbers (A000032).at n=28A221471
- Numbers m such that m^2 - 1 is the product of three distinct Fibonacci numbers > 1.at n=28A242103
- Numbers k such that k^2+2 is the product of a Fibonacci number and a Lucas number.at n=26A259561
- a(n) = Lucas(4*n + 3).at n=10A288913
- a(n) = sqrt(5*b(n)^2 - 4), with b(n) = A134493(n) = Fibonacci(6*n+1), n >= 0.at n=7A305315
- Numbers k such that k^2 is a centered 40-gonal number.at n=14A351353