Compare 103 vs 191
| Property | 103 | 191 |
|---|---|---|
| Type | prime | prime |
| Unique factors | 1 | 1 |
| Total factors | 1 | 1 |
| Prime factorization | 1031 | 1911 |
| Prime factorization | 103 | 191 |
| Divisors count | 2 | 2 |
| Divisors | 1, 103 | 1, 191 |
| Number of properties | 14 | 16 |
| Additive primes | 24th | |
| Chen primes | 34th | |
| Class 1+ primes | 14th | |
| Cousin primes (1st member) | 10th | |
| Good primes | 16th | |
| Happy primes | 8th | |
| Harmonic primes | 15th | |
| Palindromic primes | 10th | |
| Pierpont primes of the 2nd kind | 14th | |
| Primes | 27th | 43rd |
| Prime quadruplets (1st member) | 4th | |
| Prime quadruplets (2nd member) | 3rd | |
| Prime quintuplet 1s (3rd member) | 2nd | |
| Prime quintuplet 2s (2nd member) | 3rd | |
| Prime sextuplets (3rd member) | 2nd | |
| Prime triplets (1st member) | 11th | 13th |
| Prime triplets (2nd member) | 10th | |
| Prime triplets (3rd member) | 9th | |
| Sexy primes (1st member) | 18th | 25th |
| Sexy primes (2nd member) | 16th | |
| Sexy prime triplets (2nd member) | 10th | |
| Solinas primes | 25th | |
| Sophie germain primes | 15th | |
| Super primes | 14th | |
| Thabit primes | 6th | |
| Twin primes (1st member) | 14th | |
| Twin primes (2nd member) | 9th | |
| Roman numberals | CIII | CXCI |
| Base 2 | 11001112 | 101111112 |
| Base 3 | 102113 | 210023 |
| Base 4 | 12134 | 23334 |
| Base 5 | 4035 | 12315 |
| Base 6 | 2516 | 5156 |
| Base 7 | 2057 | 3627 |
| Base 8 | 1478 | 2778 |
| Base 9 | 1249 | 2329 |
| Base 10 | 10310 | 19110 |
| Base 11 | 9411 | 16411 |
| Base 12 | 8712 | 13b12 |
| Base 13 | 7c13 | 11913 |
| Base 14 | 7514 | d914 |
| Base 15 | 6d15 | cb15 |
| Base 16 | 6716 | bf16 |