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Deficient numbers such that the sum of their individual digits when raised to their own power is an abundant number.
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%I #8 Dec 15 2017 17:36:04

%S 15,26,33,39,50,51,57,62,68,69,75,79,82,86,93,97,99,118,127,141,147,

%T 165,167,172,178,181,187,207,217,235,239,242,244,248,253,257,259,271,

%U 275,277,284,293,295,325,329,345,356,358,363,365,369,385,401,407,410

%N Deficient numbers such that the sum of their individual digits when raised to their own power is an abundant number.

%D J. Earls, Some Smarandache-Type Sequences and Problems Concerning Abundant and Deficient Numbers, Smarandache Notions Journal, (to appear).

%e 147 is a deficient number and 1^1 + 4^4 + 7^7 = 823800 is an abundant number.

%Y Cf. A005101, A005100.

%K base,easy,nonn

%O 1,1

%A _Jason Earls_, Oct 06 2002