Given a cubic polynomial function p(x) = ax^2 + bx^2 + cx + d [a, b, c, d notequalto 0], answer the following questions. Justify each answer. How many x-intercepts can there be? Does the degree of this polynomial function any x-intercepts? Will the graph pass through the origin? Could the graph 'touch' the x-axis in two different ? Identify the end behavior of the graph. If known that one zero m ml and another zero is Imaginary, what can be determined about the remaining zeros?