This is a front-end for the Online Encyclopedia of Integer Sequences, made by Christian Perfect. The idea is to provide OEIS entries in non-ancient HTML, and then to think about how they're presented visually. The source code is on GitHub.
for(n = 0, 100, print1(omega(12^n + 1), ", "))
EulerPhi[11^Range[0,19] + 1] (* Paul F. Marrero Romero, Nov 10 2023 *)
{a(n) = eulerphi(11^n+1)}
a(4)=21966 because 11^4+1 has divisors {1, 2, 7321, 14642}.
a:=n->numtheory[sigma](11^n+1): seq(a(n), n=0..100);
DivisorSigma[1,11^Range[0,20]+1] (* Harvey P. Dale, Jun 22 2025 *)
a(4)=4 because 11^4+1 has divisors {1, 2, 7321, 14642}.
a:=n->numtheory[tau](11^n+1): seq(a(n), n=0..100);
DivisorSigma[0,11^Range[0,70]+1] (* Harvey P. Dale, Mar 17 2025 *)
a(n) = numdiv(11^n+1);
PrimeNu[4^Range[0,100]+1] (* Paolo Xausa, Oct 14 2023 *)
for(n = 0, 100, print1(omega(4^n + 1), ", "))
from sympy import primenu def A366605(n): return primenu((1<<(n<<1))+1) # Chai Wah Wu, Oct 14 2023
for(n = 0, 100, print1(omega(8^n + 1), ", "))
Table[PrimeNu[5^n+1],{n,0,90}] (* Harvey P. Dale, Apr 06 2025 *)
for(n = 0, 100, print1(omega(5^n + 1), ", "))
PrimeNu[6^Range[0,84] + 1] (* Paul F. Marrero Romero, Nov 11 2023 *)
for(n = 0, 100, print1(omega(6^n + 1), ", "))
PrimeNu[7^Range[0,84] + 1] (* Paul F. Marrero Romero, Nov 11 2023 *)
for(n = 0, 100, print1(omega(7^n + 1), ", "))
PrimeNu[9^Range[0,90]+1] (* Harvey P. Dale, Jul 04 2024 *)
for(n = 0, 100, print1(omega(9^n + 1), ", "))