MI 3 March 9, 2012 2 pts. 2 pts. 2 pts. 3 pts. Poly Unit Test Name: ______________ Show all work! Calculators are not allowed. State whether the following statements are true or false. Briefly explain your reasoning. _____ 1) y 2( x 5)2 3 has two real zeros. _____ 2) If a polynomial with real coefficients has a root of x 2 i , then ( x (2 i )) is a factor of the polynomial. _____ 3) The graph of the polynomial y x5 3x3 6 x 5 could be as shown below: 4) Write the equation of a seventh degree polynomial, with integer coefficients, with a bounce point at x 3 , a pass- through point at x 6 , and an imaginary root at 1 i . Write out your polynomial equation in factored form. MI-3 v1 SP ‘12 2 each 5) Determine whether each of the following is a polynomial. If it is a polynomial, state its degree, if not a polynomial, explain why. 3 g ( x) 6 x 2 2 2 x k ( x) 3 x8 5 x 7 1 3 pts. 6) Evaluate (5 3i) (2 i) . 4 pts. 7) Solve for z and express the answer in a bi form: (3 2i ) z (4 i) 2 3i 2 pts. 8) Find the sum and the product of the roots for the given polynomial without actually finding its roots: g ( x) 2 x5 8 x 4 5 x 2 14 Sum = ___________________ Product = _______________ 4 pts. 9) Write the equation of a polynomial function of smallest degree with the graph given below. 48 1 4 pts. 3 pts. 10) Sketch the graph of p ( x) 2 3 1 ( x 1) 2 ( x 2)3 ( x 4) . Indicate x and y intercepts clearly. 2 11) Given f ( x) ( x 1)( x 2)( x 1) . Find c so that 2 is a zero of y f ( x) c . 4 pts. f x 2x3 3x2 4x 15 12) Determine the exact values, over the complex numbers, of all the zeros of : y f x 2x3 3x2 4x 15 Show your work clearly. x 4 pts. 13) Solve z 3 27 0 and graph and label the solutions clearly. z im aginary real