Characteristics of Poly. Functions

4. if each point on the graph has a point the same distance from the central point, but in the opposite direction.
6. a polynomial function with a degree of four.
7. a polynomial function with a degree of five.
9. he behavior of the graph as x approachesinfinity and as x approaches negative infi nity
12. Equations and functions that have imaginary solutions requiring i have imaginary roots
13. the set of all relative maximums,relative minimums, absolute maximums, and absolute minimums for a graph.
14. a point that has a y-coordinate that is greater than the y-coordinates of every other point on the graph.
15. a function for which f(2x) 5 2f(x) for all values of x in the domain.
18. the line divides the graph into two identical parts.
19. a function that can be written in the form p(x) 5 xn 1 xn 2 1 1 ? ? ? 1 x2 1 x 1 , where the coeffi cients, represented by each, are complex numbers and the exponents are nonnegative integers.

1. a point that has a y-coordinate that is lessthan the y-coordinates of every other point on the graph.
2. A function of the form P(x) 5 axn where n is a non-negative integer.
3. a function for which f(2x) 5 f(x) for all values of x in the domain.
5. can be used to calculate the solutions to any quadratic equation of the form ax2 1 bx 1 c, where a, b, and c represent real numbers and a fi 0.
8. the ratio of the independent variable to the dependent variable over a specific interval.
10. Equations and functions that have imaginary solutions requiring i have imaginary zeros.
11. the set of all numbers written in the form a + bi, where a and b are real numbers.
16. a number such that i^2=-1.
17. the set of all numbers written in the form a 1 bi, where a and b are real numbers and b is not equal to 0.