# 11

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There are eleven two-digit primes ending in a prime digit. [Silva]

The sum of the 11 primes after 11 is another palindromic prime. [Silva]

11!+11!+11!+11!+11!+1 is prime. One is repeated 11 times in the expression. [Silva]

11 is the only prime of the form p*q+r, where p, q, r are consecutive primes. [Silva]

The only prime that can be expressed by two consecutive primes in the forms p^q+q and q^p+p. [Silva]

11 ones minus 11! is an 11-digit prime with 11 as the first and last digits. [Silva]

The first prime of the smallest pair of non-trivial reversible twin primes. [Silva]

There are eleven five-digit palindromic primes formed from prime digits. [Silva]

Probably the only prime whose cube is formed from the next prime after it and its reversal. [Silva]

12345678910 minus 11 is an eleven-digit prime. [Silva]

Obtained by subtracting the sum of all digital primes from the sum of all non-prime digits. [Silva]