For the polynomial function \( f(x)=-x^{2}(x-2)(x+5) \), answer parts a through \( e \). B. Ihere are no zeros at which the graph crosses the \( x \)-axis. At which zero(s) does the graph of the function touch the \( x \)-axis and turn around? Select the correct choice belor A. The graph touches the \( x \)-axis and turns around at the zero(s) (Type an integer or a decimal. Use a comma to separate answers as needed.) B. Find the \( y \)-intercept. The \( y \)-intercept is 0 . (Simplify your answer.) d. Determine whether the graph has \( y \)-axis symmetry, origin symmetry, or neither. Choose the correct answer touches the \( x \)-axis and turns around. A. The graph of \( f \) is symmetric about the \( y \)-axis. The graph of \( f \) is symmetric about the origin. C. The graph of \( f \) is neither symmetric about the \( y \)-axis nor symmetric about the origin. B. Get more help -
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