Find all possible rational zeros for the polynomial function. \( \begin{array}{l}P(x)=22 x^{3}-36 x^{2}+48 x-15 \\ \text { Choose the correct answer. } \\ \text { A. } \\ \pm \frac{15}{22}, \pm \frac{15}{11}, \pm \frac{15}{2}, \pm 15, \pm \frac{5}{22}, \pm \frac{5}{11}, \pm \frac{5}{2}, \pm 5, \pm \frac{3}{22}, \pm \frac{3}{11}, \pm \frac{3}{2}, \pm 3, \pm \frac{1}{22}, \pm \frac{1}{11}, \pm \frac{1}{2}, \pm 1 \\ \text { B. } \\ \frac{15}{22}, \frac{15}{11}, \frac{15}{2}, 15, \frac{5}{22}, \frac{5}{11}, \frac{5}{2}, 5, \frac{3}{22}, \frac{3}{11}, \frac{3}{2}, 3, \frac{1}{22}, \frac{1}{11}, \frac{1}{2}, 1 \\ \text { C. } \\ \pm \frac{22}{15}, \pm \frac{11}{15}, \pm \frac{2}{15}, \pm 15, \pm \frac{22}{5}, \pm \frac{11}{5}, \pm \frac{2}{5}, \pm 5, \pm \frac{22}{3}, \pm \frac{11}{3}, \pm \frac{2}{3}, \pm 3, \pm \frac{1}{15}, \pm \frac{1}{5}, \pm \frac{1}{3}, \pm 1\end{array} \)
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