Many reupunits are primes. For a repunit Rn to be prime, it is a necessary but not sufficient condition that the number (or sum) of its digits also be prime. For example, R3, R5, R7 are not primes. Indexes for which repunits are primes are {2, 19, 23, 317, 1031, ...}. It is not known whether there are infinitely many prime repunits. Prime repunits are similar to a special class of primes that remain primes after any permutation of their digits. They are called permutable primes[?] or absolute primes[?].
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Note: Some mathematical theoreticians regard the repunit as an arbitrary concept, arguing that it depends on the use of decimal numerals.
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