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Tournament Of Towns
1996 Tournament Of Towns
(502) 5
(502) 5
Part of
1996 Tournament Of Towns
Problems
(1)
TOT 502 1996 Spring S A5 n-1 , n, n + 1 and sum of squares
Source:
8/16/2024
Prove that there exist an infinite number of triples
n
−
1
n-1
n
−
1
,
n
n
n
,
n
+
1
n + 1
n
+
1
such that(a)
n
n
n
can be represented as the sum of two squares of natural numbers but neither of
n
−
1
n-1
n
−
1
and
n
+
1
n+1
n
+
1
can; (b) each of these three numbers can be represented as the sum of two squares. (V Senderov)
number theory