Prove or disprove the following:
For any positive integer \( n \), there exists a polynomial \( P_n \) of degree \( n^2 \) such that
(1) all coefficients of \( P_n \) are integers with absolute value at most \( n^2 \), and
(2) \( 1 \) is a root of \( P_n =0 \) with multiplicity at least \( n \).
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