Given a polynomial function of the formf left parenthesis x right parenthesis equals a Subscript n Baseline x Superscript n Baseline plus a Subscript n minus 1 Baseline x Superscript n minus 1 Baseline plus a Subscript n minus 2 Baseline x Superscript n minus 2 Baseline plus . . . plus a 1 x plus a 0, which statement is true about the rational zeros theorem? Question content area bottom Part 1 Choose the correct statement below. A. The potential rational zeros of the given polynomial must be of the form StartFraction p Over q EndFraction where p must be a factor of the leading coefficient a Subscript n and q must be a factor of the constant coefficient a 0. B. In order to apply the rational zeros theorem, all coefficients of the given polynomial function must be positive numbers. C. If a polynomial function has integer coefficients and a rational zero, then the rational zero must appear on the list created using the rational zeros theorem. D. After creating a list of potential rational zeros using the rational zeros theorem, the given polynomial function is guaranteed to have a zero that appears on that list