Compare 101 vs 109
Property | 101 | 109 |
---|---|---|
Type | prime | prime |
Unique factors | 1 | 1 |
Total factors | 1 | 1 |
Prime factorization | 1011 | 1091 |
Prime factorization | 101 | 109 |
Divisors count | 2 | 2 |
Divisors | 1, 101 | 1, 109 |
Number of properties | 18 | 19 |
Additive primes | 15th | |
Centered decagonal primes | 4th | |
Centered triangular primes | 3rd | |
Chen primes | 21st | 23rd |
Cousin primes (1st member) | 11th | |
Cousin primes (2nd member) | 9th | |
Cuban primes 2 | 2nd | |
Dihedral primes | 4th | |
Good primes | 12th | |
Happy primes | 9th | |
Long primes | 10th | |
Palindromic primes | 6th | |
Pierpont primes | 11th | |
Primes | 26th | 29th |
Prime quadruplets (1st member) | 3rd | |
Prime quadruplets (4th member) | 3rd | |
Prime quintuplet 1s (2nd member) | 2nd | |
Prime quintuplet 1s (5th member) | 2nd | |
Prime quintuplet 2s (1st member) | 3rd | |
Prime quintuplet 2s (4th member) | 3rd | |
Prime sextuplets (2nd member) | 2nd | |
Prime sextuplets (5th member) | 2nd | |
Prime triplets (1st member) | 10th | |
Prime triplets (2nd member) | 9th | 12th |
Prime triplets (3rd member) | 11th | |
Pythagorean primes | 12th | 13th |
Sexy primes (1st member) | 17th | |
Sexy primes (2nd member) | 18th | |
Sexy prime triplets (1st member) | 11th | |
Sexy prime triplets (3rd member) | 10th | |
Super primes | 10th | |
Twin primes (1st member) | 9th | |
Twin primes (2nd member) | 10th | |
Roman numberals | CI | CIX |
Base 2 | 11001012 | 11011012 |
Base 3 | 102023 | 110013 |
Base 4 | 12114 | 12314 |
Base 5 | 4015 | 4145 |
Base 6 | 2456 | 3016 |
Base 7 | 2037 | 2147 |
Base 8 | 1458 | 1558 |
Base 9 | 1229 | 1319 |
Base 10 | 10110 | 10910 |
Base 11 | 9211 | 9a11 |
Base 12 | 8512 | 9112 |
Base 13 | 7a13 | 8513 |
Base 14 | 7314 | 7b14 |
Base 15 | 6b15 | 7415 |
Base 16 | 6516 | 6d16 |