Presentation is loading. Please wait.

Presentation is loading. Please wait.

Graphs of polynomials a n > 0a n < 0 n even n odd f(x)=x 3 +2x 2 -x-2g(x)=-x 4 +5x 2 -4 degree 3degree 4 degree n h(x)=a n x n +a n-1 x n-1 +…+a 1 x+a.

Published byDamon Cody Glenn Modified over 9 years ago

Similar presentations

Presentation on theme: "Graphs of polynomials a n > 0a n < 0 n even n odd f(x)=x 3 +2x 2 -x-2g(x)=-x 4 +5x 2 -4 degree 3degree 4 degree n h(x)=a n x n +a n-1 x n-1 +…+a 1 x+a."— Presentation transcript:

1 Graphs of polynomials a n > 0a n < 0 n even n odd f(x)=x 3 +2x 2 -x-2g(x)=-x 4 +5x 2 -4 degree 3degree 4 degree n h(x)=a n x n +a n-1 x n-1 +…+a 1 x+a 0 2 turning points3 turning points At most (n-1) turning points

2 When you zoom out, the effect of the lower degree terms is difficult to see f(x)=x 3 +2x 2 -x-2 Close upZoom out looks like graph of cubic m(x)=x 3

3 Theorem for approximating zeros of polynomials Given a polynomial P(x)=a n x n +a n-1 x n-1 +…+a 1 x+a 0 If r is a zero of the polynomial then |r | < Max {|a n-1 /a n |, … |a 1 /a n |, |a 0 /a n |}

4 Using the theorem to select a graphing window Polynomial: f(x)=-2x 3 -3x 2 +9x+10 Max{3/2, 9/2, 10/2} = 5 so for any zero r, |r |<5 Thus a zero of this function must lie between -5 and 5. View graph between the x- values -5 and 5

Download ppt "Graphs of polynomials a n > 0a n < 0 n even n odd f(x)=x 3 +2x 2 -x-2g(x)=-x 4 +5x 2 -4 degree 3degree 4 degree n h(x)=a n x n +a n-1 x n-1 +…+a 1 x+a."

Similar presentations

Finding Zeros Given the Graph of a Polynomial Function Chapter 5.6.

Finding Zeros Given the Graph of a Polynomial Function Chapter 5.6.
Power Functions and Models; Polynomial Functions and Models February 8, 2007.

Power Functions and Models; Polynomial Functions and Models February 8, 2007.
Section 3.2 Polynomial Functions and Their Graphs.

Section 3.2 Polynomial Functions and Their Graphs.
Section 3.3 Dividing Polynomials; Remainder and Factor Theorems

Section 3.3 Dividing Polynomials; Remainder and Factor Theorems
Approximating Zeroes Learning Objective: to be able to find all critical points of a polynomial function. Warm-up (IN) Describe the graph: 1. 2.

Approximating Zeroes Learning Objective: to be able to find all critical points of a polynomial function. Warm-up (IN) Describe the graph: 1. 2.
Copyright © 2011 Pearson, Inc. 2.3 Polynomial Functions of Higher Degree with Modeling.

Copyright © 2011 Pearson, Inc. 2.3 Polynomial Functions of Higher Degree with Modeling.
Notes Over 6.7 Finding the Number of Solutions or Zeros

Notes Over 6.7 Finding the Number of Solutions or Zeros
Section 2.4 Dividing Polynomials; Remainder and Factor Theorems.

Section 2.4 Dividing Polynomials; Remainder and Factor Theorems.
Section 2.3 Polynomial and Synthetic Division Long Division of polynomials Ex. (6x 3 -19x 2 +16x-4) divided by (x-2) Ex. (x 3 -1) divided by (x-1) Ex (2x.

Section 2.3 Polynomial and Synthetic Division Long Division of polynomials Ex. (6x 3 -19x 2 +16x-4) divided by (x-2) Ex. (x 3 -1) divided by (x-1) Ex (2x.
Math 160 Notes Packet #7 Polynomial Functions 1. 2.

Math 160 Notes Packet #7 Polynomial Functions 1. 2.
2.32.3 Polynomial Functions of Higher Degree. Quick Review.

Polynomial Functions of Higher Degree. Quick Review.
The Original f(x)=x 3 -9x 2 +6x+16 State the leading coefficient and the last coefficient Record all factors of both coefficients According to the Fundamental.

The Original f(x)=x 3 -9x 2 +6x+16 State the leading coefficient and the last coefficient Record all factors of both coefficients According to the Fundamental.
7.1 Polynomial Functions Evaluate Polynomials

7.1 Polynomial Functions Evaluate Polynomials
17 A – Cubic Polynomials 3: Graphing Cubics from General Form.

17 A – Cubic Polynomials 3: Graphing Cubics from General Form.
SFM Productions Presents: Another day of Pre-Calculus torture! No fun for you - tons of fon for me! 2.2 Polynomial Functions of Higher Degree.

SFM Productions Presents: Another day of Pre-Calculus torture! No fun for you - tons of fon for me! 2.2 Polynomial Functions of Higher Degree.
Polynomials of Higher Degree 2-2. Polynomials and Their Graphs  Polynomials will always be continuous  Polynomials will always have smooth turns.

Polynomials of Higher Degree 2-2. Polynomials and Their Graphs  Polynomials will always be continuous  Polynomials will always have smooth turns.
2.3 Real and Non Real Roots of a Polynomial Polynomial Identities Secondary Math 3.

2.3 Real and Non Real Roots of a Polynomial Polynomial Identities Secondary Math 3.
Copyright © 2012 Pearson Education, Inc. Publishing as Prentice Hall. Section 5.1 Polynomial Functions and Models.

Copyright © 2012 Pearson Education, Inc. Publishing as Prentice Hall. Section 5.1 Polynomial Functions and Models.
Specialist Mathematics Polynomials Week 3. Graphs of Cubic Polynomials.

Specialist Mathematics Polynomials Week 3. Graphs of Cubic Polynomials.
4.2 Polynomial Functions and Models. A polynomial function is a function of the form.

4.2 Polynomial Functions and Models. A polynomial function is a function of the form.

Similar presentations

Ads by Google