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Leyland Primes (x^y+y^x primes)
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2020-08-20, 11:50
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pxp
Sep 2010
Weston, Ontario
10110011
_{2}
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pxp
That makes L(35829,302) #1693.
I have examined all Leyland numbers in the two gaps between L(35829,302) <88857>, #1693, and L(37738,243) <90029> and found 20 new primes. That makes L(37738,243) #1715.
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