15 14 13 12 11 10 9 8 7 6 5 4 3 2 1 $1 Million $500,000 $250,000 $125,000 $64,000 $32,000 $16,000 $8,000 $4,000 $2,000 $1,000 $500 $300 $200 $100 Welcome.

Slides:

Advertisements

Similar presentations

$100 $200 $300 $400 $500 $100 $200 $300 $400 $500 $100 $200 $300 $400 $500 $100 $200 $300 $400 $500 $100 $200 $300 $400 $500 $100 $200 $300.

Advertisements

Zeros of Polynomial Functions Section 2.5. Objectives Use the Factor Theorem to show that x-c is a factor a polynomial. Find all real zeros of a polynomial.

Zeros of Polynomial Functions

Digital Lesson Polynomial Functions.

1 5.4 Polynomial and Rational Inequalities In this section, we will study the following topics: Solving polynomial inequalities Solving rational inequalities.

Section 3.4 Zeros of Polynomial Functions. The Rational Zero Theorem.

Section 5.5 – The Real Zeros of a Rational Function

Polynomial Functions Digital Lesson. Copyright © by Houghton Mifflin Company, Inc. All rights reserved. 2 Polynomial Function A polynomial function is.

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.)

The Rational Zero Theorem

The Fundamental Theorem of Algebra And Zeros of Polynomials

3.1 Quadratic Functions Objectives

The Rational Zero Theorem The Rational Zero Theorem gives a list of possible rational zeros of a polynomial function. Equivalently, the theorem gives all.

2 pt 3 pt 4 pt 5pt 1 pt 2 pt 3 pt 4 pt 5 pt 1 pt 2pt 3 pt 4pt 5 pt 1pt 2pt 3 pt 4 pt 5 pt 1 pt 2 pt 3 pt 4pt 5 pt 1pt Roly Poly Divide and Conquer! Get.

Polynomial Functions and Their Graphs

Academy Algebra II/Trig 5.5: The Real Zeros of a Polynomial Functions HW: p.387 (14, 27, 30, 31, 37, 38, 46, 51)

Warm Up: Solve & Sketch the graph:. Graphing Polynomials & Finding a Polynomial Function.

4-5, 4-6 Factor and Remainder Theorems r is an x intercept of the graph of the function If r is a real number that is a zero of a function then x = r.

Unit 3 Review for Common Assessment

Ms. C. Taylor Common Core Math 3. Warm-Up Polynomials.

Real Zeros of a Polynomial Function Objectives: Solve Polynomial Equations. Apply Descartes Rule Find a polynomial Equation given the zeros.

Quiz Show. Polynomial Operations 100ABCDE Evaluating Polynomials 200ABCDE Factoring & Solving Polynomials 300ABCDE App. Problems & Theorems 400ABCDE Polynomial.

Warm - Up Find the Vertex of f(x) = x 2 – 2x + 4.

 Evaluate a polynomial  Direct Substitution  Synthetic Substitution  Polynomial Division  Long Division  Synthetic Division  Remainder Theorem 

Welcome to MM250 Unit 6 Seminar: Polynomial Functions To resize your pods: Place your mouse here. Left mouse click and hold. Drag to the right to enlarge.

$1 Million $500,000 $250,000 $125,000 $64,000 $32,000 $16,000 $8,000 $4,000 $2,000 $1,000 $500 $300 $200 $100 Welcome.

Polynomial Functions and Their Graphs

Section 2.1 Complex Numbers. The Imaginary Unit i.

Chapter 3 Polynomial and Rational Functions Copyright © 2014, 2010, 2007 Pearson Education, Inc Rational Functions and Their Graphs.

$1 Million $500,000 $250,000 $125,000 $64,000 $32,000 $16,000 $8,000 $4,000 $2,000 $1,000 $500 $300 $200 $100 Welcome.

Copyright © 2009 Pearson Education, Inc. CHAPTER 4: Polynomial and Rational Functions 4.1 Polynomial Functions and Models 4.2 Graphing Polynomial Functions.

4.5 Quadratic Equations Zero of the Function- a value where f(x) = 0 and the graph of the function intersects the x-axis Zero Product Property- for all.

Section 2.2 Polynomial Functions Of Higher Degree.

WARM-UP: 10/30/13 Find the standard form of the quadratic function. Identify the vertex and graph.

Topics covered and examples: reteach.  Solve linear equation.

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.

Chapter 4: Polynomial and Rational Functions. Warm Up: List the possible rational roots of the equation. g(x) = 3x x 3 – 7x 2 – 64x – The.

Solving Polynomials. What does it mean to solve an equation?

Graphing Polynomial Functions. Finding the End Behavior of a function Degree Leading Coefficient Graph Comparison End Behavior As x  – , Rise right.

Polynomial Functions Advanced Math Chapter 3. Quadratic Functions and Models Advanced Math Section 3.1.

7.6 Rational Zero Theorem Objectives: 1. Identify the possible rational zeros of a polynomial function. 2. Find all the rational zeros of a polynomial.

1 © 2010 Pearson Education, Inc. All rights reserved © 2010 Pearson Education, Inc. All rights reserved Chapter 3 Polynomial and Rational Functions.

Chapter 4: Polynomial and Rational Functions. Determine the roots of the polynomial 4-4 The Rational Root Theorem x 2 + 2x – 8 = 0.

Slide Copyright © 2009 Pearson Education, Inc. Active Learning Lecture Slides For use with Classroom Response Systems © 2009 Pearson Education, Inc.

Precalculus Lesson 2.5 The Fundamental Theorem of Algebra.

Solving Polynomials. Factoring Options 1.GCF Factoring (take-out a common term) 2.Sum or Difference of Cubes 3.Factor by Grouping 4.U Substitution 5.Polynomial.

Polynomials Graphing and Solving. Standards MM3A1. Students will analyze graphs of polynomial functions of higher degree. a. Graph simple polynomial functions.

$1 Million $500,000 $250,000 $125,000 $64,000 $32,000 $16,000 $8,000 $4,000 $2,000 $1,000 $500 $300 $200 $100 Welcome.

Higher Degree Polynomial.  Case 1: If n is odd AND the leading coefficient, is positive, the graph falls to the left and rises to the right  Case 2:

PreCalculus 4-R Unit 4 Polynomial and Rational Functions Review Problems.

Unit 3.3- Polynomial Equations Continued. Objectives  Divide polynomials with synthetic division  Combine graphical and algebraic methods to solve polynomial.

Section 3.4 Zeros of Polynomial Functions. The Rational Zero Theorem.

Quadratic Function A quadratic function is defined by a quadratic or second-degree polynomial. Standard Form

Dividing Polynomials Two options: Long Division Synthetic Division.

HOMEWORK CHECK.

Polynomial Function Review

Welcome to Who Wants to be a Millionaire

Section 3.4 Zeros of Polynomial Functions

Review Chapter 2 Sections

Real Zeros Intro - Chapter 4.2.

Section 3.4 Zeros of Polynomial Functions

Welcome to Who Wants to be a Millionaire

**Get signed by your parents for 5 bonus points on the test!!

Factor Theorems.

Polynomial and Rational Inequalities

3.5 Polynomial and Rational Inequalities

2.6 Find Rational Zeros Pg. 89.

2.6 Find Rational Zeros Pg. 89.

Presentation transcript:

$1 Million $500,000 $250,000 $125,000 $64,000 $32,000 $16,000 $8,000 $4,000 $2,000 $1,000 $500 $300 $200 $100 Welcome to Who Wants to be a Millionaire 50:50

©

© $1 Million $500,000 $250,000 $125,000 $64,000 $32,000 $16,000 $8,000 $4,000 $2,000 $1,000 $500 $300 $200 $100

© A: Positive: 2,0 Negative: 1 C: Positive: 3,0 Negative: 0 B: Positive: 3,1 Negative: 0 D: Positive: 2,1 Negative: 1 50: $1 Million $500,000 $250,000 $125,000 $64,000 $32,000 $16,000 $8,000 $4,000 $2,000 $1,000 $500 $300 $200 $100 Use Descartes’s Rule of Signs to determine the possible numbers of positive and negative real zeroes of f(x) = -7x³+9x²-x+5

© $1 Million $500,000 $250,000 $125,000 $64,000 $32,000 $16,000 $8,000 $4,000 $2,000 $1,000 $500 $300 $200 $100

© 1772 A: (4+i)÷4 C: 4/3 + 4i B: (3+i²)÷4 D: ¾ + i/4 50: $1 Million $500,000 $250,000 $125,000 $64,000 $32,000 $16,000 $8,000 $4,000 $2,000 $1,000 $500 $300 $200 $100 Divide the following complex numbers (1+2i)÷(2+2i) and express the result in standard form, where a and b are fractions.

© $1 Million $500,000 $250,000 $125,000 $64,000 $32,000 $16,000 $8,000 $4,000 $2,000 $1,000 $500 $300 $200 $100

© A: (-∞, 1- √2)(1+√2, ∞) C: (-∞, 1- √2][1+√2, ∞) B: Ǿ D: [1- √2, 1+√2] 50: $1 Million $500,000 $250,000 $125,000 $64,000 $32,000 $16,000 $8,000 $4,000 $2,000 $1,000 $500 $300 $200 $100 Solve the polynomial inequality x²≤2x+1 Express the solution set in interval notation.

© $1 Million $500,000 $250,000 $125,000 $64,000 $32,000 $16,000 $8,000 $4,000 $2,000 $1,000 $500 $300 $200 $100

© A: C: B: ±1,±2,±3,±6,±1/2,±1/6, ±1/3,±2/3,±3/2 D: 50: $1 Million $500,000 $250,000 $125,000 $64,000 $32,000 $16,000 $8,000 $4,000 $2,000 $1,000 $500 $300 $200 $100 ±1,±2,±3,±6,±1/2,±1/3,±1/6 ±1,±3,±1/2,±1/6,±1/3,±3/2 ±1,±2,±3,±6,±1/3,±2/3 Use the Rational Zero Theorem to list all possible rational zeroes for the given function f(x)=-3x^4 +10x³+8x²-7x+6

© $1 Million $500,000 $250,000 $125,000 $64,000 $32,000 $16,000 $8,000 $4,000 $2,000 $1,000 $500 $300 $200 $100

© A: ±1,±2,±5,±10,±4 AR=10 C: ±1,±2,±5,±10,±4 AR=5 B : ±1,±2,±20,±5,±10,±4 AR=5 D: ±1,±2,±20,±5,±10,±4 AR=10 50: $1 Million $500,000 $250,000 $125,000 $64,000 $32,000 $16,000 $8,000 $4,000 $2,000 $1,000 $500 $300 $200 $100. In the fraction ½, the 2 is called the The following equation is given. x³-5x²-4x+20=0 List all possible rational roots Use synthetic division to find an actual rational root

© Congratulations! You’ve Reached the $1,000 Milestone! Congratulations! C o n g r a t u l a t i o n s !

© $1 Million $500,000 $250,000 $125,000 $64,000 $32,000 $16,000 $8,000 $4,000 $2,000 $1,000 $500 $300 $200 $100

© A: 64 C: 70 B: 51 D: 59 50: $1 Million $500,000 $250,000 $125,000 $64,000 $32,000 $16,000 $8,000 $4,000 $2,000 $1,000 $500 $300 $200 $100 y varies directly as x and inversely as the square of z. y=9 when x=75 and z=5. find y when x=68 and z=2

© $1 Million $500,000 $250,000 $125,000 $64,000 $32,000 $16,000 $8,000 $4,000 $2,000 $1,000 $500 $300 $200 $100

© A: (11,∞) C: (-∞,11) B: (-∞,11) D: Ǿ 50: $1 Million $500,000 $250,000 $125,000 $64,000 $32,000 $16,000 $8,000 $4,000 $2,000 $1,000 $500 $300 $200 $100 Solve the polynomial inequality x²-22x+121<0 Express the solution set in interval notation

© $1 Million $500,000 $250,000 $125,000 $64,000 $32,000 $16,000 $8,000 $4,000 $2,000 $1,000 $500 $300 $200 $100

© A: 28i C: 24 B: 24i D: 28 50: $1 Million $500,000 $250,000 $125,000 $64,000 $32,000 $16,000 $8,000 $4,000 $2,000 $1,000 $500 $300 $200 $100 Perform the indicated operations and write the result in standard form, a+bi 2√-36 +4√-16

© $1 Million $500,000 $250,000 $125,000 $64,000 $32,000 $16,000 $8,000 $4,000 $2,000 $1,000 $500 $300 $200 $100

© A: falls left and rises right -2,0,4 odd C: rises left and falls right -2,0,4 even B: falls left and falls right -2,2,0 odd D: rises left and rises right, -2,2,0 even 50: $1 Million $500,000 $250,000 $125,000 $64,000 $32,000 $16,000 $8,000 $4,000 $2,000 $1,000 $500 $300 $200 $100, f(x)=x 4 -4x². What is the graph’s end behavior?. What are the x-intercepts?. Determine the symmetry of the graph

© $1 Million $500,000 $250,000 $125,000 $64,000 $32,000 $16,000 $8,000 $4,000 $2,000 $1,000 $500 $300 $200 $100

© A: {-1,-1/2,0} C: {-1/2,0,1} B: {-1,-1/2,1/2} D: {-1,-1/2,1} 50: $1 Million $500,000 $250,000 $125,000 $64,000 $32,000 $16,000 $8,000 $4,000 $2,000 $1,000 $500 $300 $200 $100 Solve the equation 4x³+4x²-x-1=0 given that -1/2 is a zero The solution set is?

© Congratulations! You’ve Reached the $32,000 Milestone! Congratulations! C o n g r a t u l a t i o n s !

© $1 Million $500,000 $250,000 $125,000 $64,000 $32,000 $16,000 $8,000 $4,000 $2,000 $1,000 $500 $300 $200 $100

© A: $475 to produce each bicycle C: $450 to produce each bicycle B: $375 to produce each bicycle D: $350 to produce each bicycle 50: $1 Million $500,000 $250,000 $125,000 $64,000 $32,000 $16,000 $8,000 $4,000 $2,000 $1,000 $500 $300 $200 $100 = (75,0) A company is planning to manufacture mountain bikes. The fixed monthly cost will be $300,000 and it will cost $300 to produce each bicycle.. Find average cost function C producing x mountain bikes and than interpret how much it would cost to produce 4000 bikes

© $1 Million $500,000 $250,000 $125,000 $64,000 $32,000 $16,000 $8,000 $4,000 $2,000 $1,000 $500 $300 $200 $100

© A: maximum, -62 at x=2 C: minimum, -56 at x=4 B: maximum, 50 at x=4 D: minimum, 54 at x=2 50: $1 Million $500,000 $250,000 $125,000 $64,000 $32,000 $16,000 $8,000 $4,000 $2,000 $1,000 $500 $300 $200 $100. Determine, without graphing, whether the function has a minimum value or a maximum value.. Find the minimum or maximum value and determine where it occurs. f(x) = 3x²-24x-8

© $1 Million $500,000 $250,000 $125,000 $64,000 $32,000 $16,000 $8,000 $4,000 $2,000 $1,000 $500 $300 $200 $100

© A: 3x²+6x-40 C: 3x²-12x+32 B: 3x²+6x-40, R=99 D: 3x²-12x+32, R= : $1 Million $500,000 $250,000 $125,000 $64,000 $32,000 $16,000 $8,000 $4,000 $2,000 $1,000 $500 $300 $200 $100 Divide 3x³-3x²-4x+3 by x+3

© $1 Million $500,000 $250,000 $125,000 $64,000 $32,000 $16,000 $8,000 $4,000 $2,000 $1,000 $500 $300 $200 $100

© A: 2x^4 -2 C: 4x^4 +4 B: x^4 -2 D: x^ : $1 Million $500,000 $250,000 $125,000 $64,000 $32,000 $16,000 $8,000 $4,000 $2,000 $1,000 $500 $300 $200 $100 Find a fourth-degree polynomial function f(x) with real coefficients that has -1,1 and i as zeroes and such that f(3)=160

© $1 Million $500,000 $250,000 $125,000 $64,000 $32,000 $16,000 $8,000 $4,000 $2,000 $1,000 $500 $300 $200 $100

© A: 2, multiplicity -3; 5, multiplicity 6 C: 2, multiplicity -3; 6, multiplicity 5 B: -3, multiplicity 2; 5, multiplicity 6 D: -3, multiplicity 2; 6, multiplicity 5 50: $1 Million $500,000 $250,000 $125,000 $64,000 $32,000 $16,000 $8,000 $4,000 $2,000 $1,000 $500 $300 $200 $100 Find the zeroes of f(x) = (x+3)² (x-5)^6 and state the multiplicity

© YOU WIN $1 MILLION DOLLARS!