Phone :

(716) 878-6422
Email:

cunnindw@buffalostate.edu
Ketchum Hall 113

**Open to: **everyone

3:00 p.m. to 4:15 p.m. | Dr. Konstantine Zelator will be presenting about *Sums of Squares Whose Bases are Consecutive Terms of an Arithmetic Progression*.

Abstract: The main result of this work can be stated as follows: Let p be a prime, p = 3, or p =5 or 7 (mod 12). Then the sum of the squares of any p positive integers, which are consecutive terms of an arithmetic progression; is a non-perfect square. The article that contains this result is published in www.arxiv.org (see arX- iv’:1311.6484 [math.GM]

Daniel W. Cunningham

Phone :

(716) 878-6422
Email:

cunnindw@buffalostate.edu