Let P (x) be a polynomial with real coefficients.
Show that there exists a nonzero polynomial Q (x) with real coefficients such that
P (x) Q (x) has terms that are all of a degree divisible by 10^9 .
Show that there exists a nonzero polynomial Q (x) with real coefficients such that
P (x) Q (x) has terms that are all of a degree divisible by 10^9 .
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