1. Polynomial Functions and Their Graphs Mat 151 SLU �
2. Definition of a Polynomial Function Let n be a nonnegative integer and let an, an-1,…, a2, a1, a0, be real numbers with an not 0. The function defined by
f (x) = anxn + an-1xn-1 +…+ a2x2 + a1x + a0
is called a polynomial function of x of degree n. The number an, the coefficient of the variable to the highest power, is called the leading coefficient.
3. Note: Polynomial functions are often written in the factored form as: f(x) = an (x – r1 ) n1 … (x – rk )nk
Where an is the leading coeffient and ri’s are the zeros of f.
5. Properties of Polynomials Domain: The set of all real numbers.
Range: Depends on the degree of the polynomial.
Every polynomial has a smooth continuous graph, with no holes, no corners.
Every polynomial has a y-intercept.
Every odd degree polynomial crosses the x-axis at least once.
Every polynomial of nth degree has at most n-1 turning points.
9. Zeros of a Polynomial All the numbers for which a polynomial function f(x) = 0 are called the zeros of the polynomial function.
The set of all real zeros of a polynomial function are the x-intercept of the polynomial.
11. Example Find all zeros of f (x) = 2x4 – 2.
Solution: We find the zeros of f by setting f (x) equal to 0.
2x4 – 2 = 0
2(x4 – 1) = 0
2(x2 - 1)(x2 + 1) = 0
2(x - 1)(x + 1)(x2 + 1)=0
x - 1 = 0 or x + 1 = 0 or x2 + 1 = 0
X = 1 or x = -1 or x = +/-i
12. Multiplicities of Zeros If r is a zero of a polynomial function f, then we can factor f as
f(x) = (x – r)k q(x)
So that q(x) does not have (x-r) as a factor. Then k is the multiplicity of r.
13. Multiplicity and x-Intercepts If r is a zero of even multiplicity, then the graph touches the x-axis and turns around at r. If r is a zero of odd multiplicity, then the graph crosses the x-axis at r. Regardless of whether a zero is even or odd, graphs tend to flatten out at zeros with multiplicity greater than one.
14. Example Find the x-intercepts and multiplicity of f(x) = 2(x+2)2(x-3)
Solution:
x=-2 is a zero of multiplicity 2 or even
x=3 is a zero of multiplicity 1 or odd
15. Graphing a Polynomial Function f (x) = anxn + an-1xn-1 + an-2xn-2 + ¼ + a1x + a0 (an not 0)
Use the Leading Coefficient Test to determine the graph's end behavior.
Find x-intercepts by setting f (x) = 0 and solving the resulting polynomial equation. If there is an x-intercept at r as a result of (x - r)k in the complete factorization of f (x), then:
a. If k is even, the graph touches the x-axis at r and turns around.
b. If k is odd, the graph crosses the x-axis at r.
c. If k > 1, the graph flattens out at (r, 0).
3. Find the y-intercept by setting x equal to 0 and computing f (0).
16. Graphing a Polynomial Function f (x) = anxn + an-1xn-1 + an-2xn-2 + ¼ + a1x + a0 (an not 0)
Use symmetry, if applicable, to help draw the graph:
a. y-axis symmetry: f (-x) = f (x)
b. Origin symmetry: f (-x) = - f (x).
5. Use the fact that the maximum number of turning points of the graph is n - 1 to check whether it is drawn correctly.
