The smallest prime containing all of the square digits exactly once. [Gupta]
The smallest member of the first triplet composed of three successive primes (1049, 1051, and 1061) that is never prime in any smaller base b, 2 < b < 10, when expansions are interpreted as decimal numbers. [De Geest]
Phil Appleby of the United Kingdom achieved the highest competitive game score of 1049 in Scrabble on June 25, 1989 (according to the Guinness Book of World Records). [Patterson]
The smallest prime formed from three distinct semiprimes. [Silva]
An Eisenstein-Mersenne prime concatenated from the square digits. [Post]
Smallest square-digit prime whose square (1049^2 = 1100401)
contains only square digits. [Gupta]
(There is one curio for this number that has not yet been approved by an editor.)
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