1. If P(x) is a polynomial of degree 7, and Q(x) is a polynomial of degree 2, what kind of function is f(x) = P(x)*Q(x)?

2. Let P(x) be a polynomial of degree 7. What is the highest number of real roots (zeroes) that P(x) could have?

3. Let P(x) be a polynomial function of degree 7. What is the lowest number of real roots (zeroes) that P(x) could have?

4. Let Q(x) be a polynomial function of degree 4. What is the lowest number of real roots (zeroes) that Q(x) could have?

5. Let f(x) = P(x) = x*x*x*x*(x – 1)*(x – 2)*(x – 3). How many distinct real roots does f(x) have?