Presentation is loading. Please wait.

Presentation is loading. Please wait.

Lots of Pages Homework Pg. 184#41 – 53 all #28 C(7, 4) r = #33 #40 (-∞, -5/3]U[3, ∞)#42[-2, -1)U(-1, ∞) #52 (-∞, 2]#88y – axis #91 origin#104Does not pass.

Published byPatricia McKinney Modified over 8 years ago

Similar presentations

Presentation on theme: "Lots of Pages Homework Pg. 184#41 – 53 all #28 C(7, 4) r = #33 #40 (-∞, -5/3]U[3, ∞)#42[-2, -1)U(-1, ∞) #52 (-∞, 2]#88y – axis #91 origin#104Does not pass."— Presentation transcript:

1 Lots of Pages Homework Pg. 184#41 – 53 all #28 C(7, 4) r = #33 #40 (-∞, -5/3]U[3, ∞)#42[-2, -1)U(-1, ∞) #52 (-∞, 2]#88y – axis #91 origin#104Does not pass HLT # 105 y = (x 2 /4) + 4 #106(- ∞, ∞) and [0, ∞) #107 a) origin; b) y – axis #15c = 17/3 #24 ↖ ↗#300.05x 7 #9 x = -3.60, -0.88, 1.63; max (-2.85, 74.12), (0.37, -2.52); min(-0.32, -3.43), (1.19, -4.33) #19 x = -5.81, 1.04, 6.27; max (-3, 211); min(4, -132) #24 D:(-∞, -5)U(-5, ∞); R:(-∞, 0)U(0, ∞); Discontinuous at x = -5 #26 D:(-∞, -0.5)U(-0.5, ∞); R:(-∞, ∞); Discontinuous at x = -0.5

2 3.1 Graphs of Polynomial Functions Information from a Function End behavior type End behavior model Determine domain and range Determine all zeros Determine y – intercept Determine all local min/max values Determine intervals of increasing/decreasing Draw a complete graph Find all the information for: When working with IVT, the function must be: ___________ Then you check: ____________ If the value is inside the endpoints, proceed to find the c. If the value is outside the endpoints, graph to know whether or not to proceed.

3 3.3 Real Zeros of Polynomials: The Factor Theorem Remainder Theorem If a polynomial is divided by x – c, then the remainder is f(c). Thus f(x) = (x – c)q(x) + f(c) where q(x) is the quotient. Examples Find the remainder when the polynomial: f(x) = x 3 + 3x 2 – 2x – 7 is divided by x – 2 x + 4

4 3.3 Real Zeros of Polynomials: The Factor Theorem Factor Theorem Let f(x) be a polynomial. Then x – c is a factor of f(x) if, and only if, c is a zero of f(x). -3 is a zero → x + 3 is a factor 5 is a zero → x – 5 is a factor Examples Use your calculator to find the zeros of: f(x) = 2x 3 – 4x 2 + x – 2 Use long division to prove x – 2 is a factor of f(x) = 2x 3 – 4x 2 + x – 2

5 3.4 Rational Zeros and Horner’s Algorithm Rational Zero’s Theorem If f(x) is a polynomial with all coefficients as integers and p as the constant term and q as the leading coefficient, then x = p/q is a rational zero. Examples Make a complete list of possible rational number zeros of f(x) = 12x 5 – 5x 3 + 4x – 15

Download ppt "Lots of Pages Homework Pg. 184#41 – 53 all #28 C(7, 4) r = #33 #40 (-∞, -5/3]U[3, ∞)#42[-2, -1)U(-1, ∞) #52 (-∞, 2]#88y – axis #91 origin#104Does not pass."

Similar presentations

Plowing Through Sec. 2.4b with Two New Topics: Homework: p. 374 33-55 odd Remainder and Factor Theorems with more Division Practice.

Plowing Through Sec. 2.4b with Two New Topics: Homework: p odd Remainder and Factor Theorems with more Division Practice.
Warm up!! Pg. 130 #’s 16, 22, 36, 42, 52, 96.

Warm up!! Pg. 130 #’s 16, 22, 36, 42, 52, 96.
Section 5.5 – The Real Zeros of a Rational Function

Section 5.5 – The Real Zeros of a Rational Function
OBJECTIVE: I will be able to calculate the real zeros of a polynomial function using synthetic division and the Rational Zero Theorem through use of in-class.

OBJECTIVE: I will be able to calculate the real zeros of a polynomial function using synthetic division and the Rational Zero Theorem through use of in-class.
The Remainder and Factor Theorems Check for Understanding 2.3 – Factor polynomials using a variety of methods including the factor theorem, synthetic division,

The Remainder and Factor Theorems Check for Understanding 2.3 – Factor polynomials using a variety of methods including the factor theorem, synthetic division,
Bell Problem Find the real number solutions of the equation: 18x 3 = 50x.

Bell Problem Find the real number solutions of the equation: 18x 3 = 50x.
Remainder and Factor Theorem Unit 11. Definitions Roots and Zeros: The real number, r, is a zero of f(x) iff: 1.) r is a solution, or root of f(x)=0 2.)

Remainder and Factor Theorem Unit 11. Definitions Roots and Zeros: The real number, r, is a zero of f(x) iff: 1.) r is a solution, or root of f(x)=0 2.)
3.2 Polynomials-- Properties of Division Leading to Synthetic Division.

3.2 Polynomials-- Properties of Division Leading to Synthetic Division.
Academy Algebra II/Trig 5.5: The Real Zeros of a Polynomial Functions HW: p.387 (14, 27, 30, 31, 37, 38, 46, 51)

Academy Algebra II/Trig 5.5: The Real Zeros of a Polynomial Functions HW: p.387 (14, 27, 30, 31, 37, 38, 46, 51)
SECTION 3.5 REAL ZEROS OF A POLYNOMIAL FUNCTION REAL ZEROS OF A POLYNOMIAL FUNCTION.

SECTION 3.5 REAL ZEROS OF A POLYNOMIAL FUNCTION REAL ZEROS OF A POLYNOMIAL FUNCTION.
PRE-AP PRE-CALCULUS CHAPTER 2, SECTION 4 Real Zeros of Polynomial Functions 2013 - 2014.

PRE-AP PRE-CALCULUS CHAPTER 2, SECTION 4 Real Zeros of Polynomial Functions
7.5.1 Zeros of Polynomial Functions

7.5.1 Zeros of Polynomial Functions
Quick Crisp Review Zeros of a polynomial function are where the x-intercepts or solutions when you set the equation equal to zero. Synthetic and long division.

Quick Crisp Review Zeros of a polynomial function are where the x-intercepts or solutions when you set the equation equal to zero. Synthetic and long division.
Polynomials Expressions like 3x 4 + 2x 3 – 6x 2 + 11 and m 6 – 4m 2 +3 are called polynomials. (5x – 2)(2x+3) is also a polynomial as it can be written.

Polynomials Expressions like 3x 4 + 2x 3 – 6x and m 6 – 4m 2 +3 are called polynomials. (5x – 2)(2x+3) is also a polynomial as it can be written.
2.4 – Real Zeros of Polynomial Functions

2.4 – Real Zeros of Polynomial Functions
Lesson 2.4, page 301 Dividing Polynomials Objective: To divide polynomials using long and synthetic division, and to use the remainder and factor theorems.

Lesson 2.4, page 301 Dividing Polynomials Objective: To divide polynomials using long and synthetic division, and to use the remainder and factor theorems.
Polynomial Division and the Remainder Theorem Section 9.4.

Polynomial Division and the Remainder Theorem Section 9.4.
Lesson 2.3 Real Zeros of Polynomials. The Division Algorithm.

Lesson 2.3 Real Zeros of Polynomials. The Division Algorithm.
Copyright © 2009 Pearson Education, Inc. CHAPTER 4: Polynomial and Rational Functions 4.1 Polynomial Functions and Models 4.2 Graphing Polynomial Functions.

Copyright © 2009 Pearson Education, Inc. CHAPTER 4: Polynomial and Rational Functions 4.1 Polynomial Functions and Models 4.2 Graphing Polynomial Functions.
1 What we will learn today…  How to divide polynomials and relate the result to the remainder and factor theorems  How to use polynomial division.

1 What we will learn today…  How to divide polynomials and relate the result to the remainder and factor theorems  How to use polynomial division.

Similar presentations

Ads by Google