2023 IOQM/Problem 4
Revision as of 11:46, 24 October 2023 by Sansgankrsngupta (talk | contribs) (→Solution1(Diophantine))
Problem
Let be positive integers such that
Find the maximum possible value of .
Solution1(Diophantine)
, subtracting 1 on both sides we get factorizing the LHS we get
. Now divide the equation by to get Since and are integers, this implies divides 2, so possible values are -1, -2, 1, 2
This means = 0, -1(Rejected as is a positive integer), 2, 3. so =2 or 3. Now checking for each value, we find that when =2, there is no integral value of . When = 3 =4 which is the only possible integral solution.
So, = 3+ 4 =
~SANSGANKRSNGUPTA(inspired by PJ AND AM sir)