例句與造句

1. It is the only palindromic prime with an even number of digits.
2. Another beastly palindromic prime is 700666007.
3. The first ( base-10 ) triply palindromic prime is the 11-digit 10000500001.
4. Palindromic primes are those which read the same backwards ( usually with base-10 implied ) such as your 101.
5. *PM : examples of palindromic primes, id = 7933 new !-- WP guess : examples of palindromic primes-- Status:
6. It's difficult to find palindromic primes in a sentence. 用palindromic primes造句挺難的
7. *PM : examples of palindromic primes, id = 7933 new !-- WP guess : examples of palindromic primes-- Status:
8. The palindromic prime number 1000000000000066600000000000001 is known as Belphegor's Prime, due to the significance of containing the number thirteen zeroes and a one.
9. It is also a Mersenne prime, a Fermat prime, a factorial prime, a primorial prime, a permutable prime, and a palindromic prime.
10. This includes repunit primes and all other palindromic primes which only contain digits 0, 1 and 8 ( in binary, all palindromic primes are dihedral ).
11. This includes repunit primes and all other palindromic primes which only contain digits 0, 1 and 8 ( in binary, all palindromic primes are dihedral ).
12. Belphegor's Prime is an example of a "'beastly palindromic prime "'in which a prime " p " is palindromic with 666 in the center.
13. The palindromic prime 10 180054 + 8?( 10 58567  " 1 ) / 9?0 60744 + 1, discovered in 2009 by Darren Bedwell, is 180055 digits long and may be the largest known dihedral prime.
14. It's possible that a triply palindromic prime in base 10 may also be palindromic in another base, such as base 2, but it would be highly remarkable if it were also a triply palindromic prime in that base as well.
15. It's possible that a triply palindromic prime in base 10 may also be palindromic in another base, such as base 2, but it would be highly remarkable if it were also a triply palindromic prime in that base as well.
16. The palindromic prime 10 150006 + 7426247 + 1 is also a happy prime with 150, 007 digits because the many 0's do not contribute to the sum of squared digits, and 1 ^ 2 + 7 ^ 2 + 4 ^ 2 + 2 ^ 2 + 6 ^ 2 + 2 ^ 2 + 4 ^ 2 + 7 ^ 2 + 1 ^ 2 = 176, which is a happy number.