[Search for users] [Overall Top Noters] [List of all Conferences] [Download this site]

Conference rusure::math

Title:	Mathematics at DEC

Moderator:	RUSURE::EDP

Created:	Mon Feb 03 1986
Last Modified:	Fri Jun 06 1997
Last Successful Update:	Fri Jun 06 1997
Number of topics:	2083
Total number of notes:	14613

1987.0. "Crux Mathematicorum 2052" by RUSURE::EDP (Always mount a scratch monkey.) Fri Aug 11 1995 13:23

    Proposed by K. R. S. Sastry, Dodballapur, India.
    
    The infinite arithmetic progression 1+3+5+7+... of odd positive
    integers has the property that all of its partial sums
    
    	1, 1+3, 1+3+5, 1+3+5+7, ...
    
    are perfect squares.  Are there any other infinite arithmetic
    progressions, all terms positive integers with no common factor, having
    this same property?

T.R Title User Personal
Name Date Lines

1987.1 no other solutions JOBURG::BUCHANAN Sat Aug 12 1995 03:48 18

T.R	Title	User	Personal Name	Date	Lines
1987.1	no other solutions	JOBURG::BUCHANAN		`Sat Aug 12 1995 03:48`	18
	If the terms of the progression are: c + ai, i = 0,1,... The jth partial sum is: cj + aj(j-1)/2, j=1,2,... So: j(4c+2a(j-1)) is a square for all j. Let j = kl�, where k is square free: k\|4c+2a(kl�-1) So: k\|4c-2a, but k could be any prime. So 4c-2a = 0, and since we are told that (a,c)=1, the only solution is the one given in the base note.

    If the terms of the progression are:
    
    	c + ai, i = 0,1,...
    
    The jth partial sum is:
    
    	cj + aj(j-1)/2, j=1,2,...
    
    So:
    
    	j(4c+2a(j-1)) is a square for all j.
    
    Let j = kl�, where k is square free:
    
    	k|4c+2a(kl�-1)
    
    So: k|4c-2a, but k could be any prime. So 4c-2a = 0, and since we are
    told that (a,c)=1, the only solution is the one given in the base note.