2021 JMPSC Invitationals Problems/Problem 11
Problem
For some , the arithmetic progression has exactly perfect squares. Find the maximum possible value of
Solution
First note that the integers in the given arithmetic progression are precisely the integers which leave a remainder of when divided by .
Suppose a perfect square is in this arithmetic progression. Observe that the remainders when , , , , and are divided by are , , , , and , respectively. Furthermore, for any integer , and so and leave the same remainder when divided by . It follows that the perfect squares in this arithmetic progression are exactly the numbers of the form and , respectively.
Finally, the sequence of such squares is
In particular, the first and second such squares are associated with , the third and fourth are associated with , and so on. It follows that the such number, which is associated with , is
Therefore the arithmetic progression must not reach . This means the desired answer is ~djmathman