The fourth problem of the second season of PEN is as follows:

N17. Suppose that and are distinct real numbers such that:

are all integers. Show that and are integers.

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December 1, 2008 by Ofir Gorodetsky

The fourth problem of the second season of PEN is as follows:

N17. Suppose that and are distinct real numbers such that:

are all integers. Show that and are integers.

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