On Some Results on Practical Numbers

Abstract

A positive integer n is said to be a practical number if every integer in [1,n] can be represented as the sum of distinct divisors of n. In this article, we consider practical numbers of a given polynomial form. We give a necessary and sufficient condition on coefficients a and b for there to be infinitely many practical numbers of the form an+b. We also give a necessary and sufficient for a quadratic polynomial to contain infinitely many practical numbers, using which we solve first part of a conjecture mentioned in [9]. In the final section, we prove that every number of 8k+1 form can be expressed as a sum of a practical number and a square, and for every j∈ \0,…,7\ \1\ there are infinitely many natural numbers of 8k+j form which cannot be written as sum of a square and a practical number.

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