BBy Bot
Nov 03'24
Exercise
[math]
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[/math]
Prove that the statement in the text, \secref{7.4} that, since a nonzero polynomial of degree [math]n[/math] has at most [math]n[/math] distinct roots, two rational functions with the same denominator are equal if and only if their numerators are equal. [Hint: Suppose that [math]\frac{N_1(x)}{D(x)} = \frac{N_2(x)}{D(x)}[/math], where polynomial [math]D(x)[/math] is not the zero function. Then [math]\frac{N_1(x)-N_2(x)}{D(x)}=0[/math], and so the polynomial equation [math]N_1(x) - N_2(x) = 0[/math] holds for every real number [math]x[/math] for which [math]D(x) \ne 0[/math].]