MATH 100 Midterm: MATH 100 KSU fExam f02

Write complex answers in a + bi form: (16 points) perform the indicated divisions: (a) (x3 + 3x2 10x 7) (x 3). , remainder= (b) (2x4 9) (x2 x + 3). You may use your calculator to reduce the possibilities: (7 points) find the zeros of p(x) = x7 + 8x6 + 16x5 and their multiplicities. Give the solution set in interval notation: (9 points) solve the inequality |3x 5| > 4 and sketch the solution set on the real number line below. 7 x: (2 points) the graph of a polynomial f has 6 turning points. The smallest degree f can have is pg score/32. 2: (18 points) provide the following information and use it to graph g(x) = The other zeros are: (4 points) use the leading-term test to determine which graph best represents the behavior of the given polynomial as x and x : Circle one: a b c d. (b) 1000x4 + 2x5 + 500.