1 Describe the vertical and/or horizontal  translations of the graph f(x) = x2 or f(x) = |x| b) a)

Slides:

Advertisements

Similar presentations

Finding Complex Roots of Quadratics

Advertisements

Lesson 1-6 Solving Quadratic Equations. Objective:

Quadratic Functions & Inequalities

Quadratic Functions & Inequalities

Bell Ringer: Find the zeros of each function.

Objectives: To solve quadratic equations using the Quadratic Formula. To determine the number of solutions by using the discriminant.

Quadratic Equations, Functions, and Models

Ch 1 – Functions and Their Graphs Different Equations for Lines Domain/Range and how to find them Increasing/Decreasing/Constant Function/Not a Function.

Polynomial Function A polynomial function of degree n, where n is a nonnegative integer, is a function defined by an expression of the form where.

2 pt 3 pt 4 pt 5 pt 1 pt 2 pt 3 pt 4 pt 5 pt 1 pt 2 pt 3 pt 4 pt 5 pt 1 pt 2 pt 3 pt 4 pt 5 pt 1 pt 2 pt 3 pt 4 pt 5 pt 1 pt Functions Quadratics 1 Quadratics.

9-1 Quadratic Equations and Functions 9-2 Characteristics of Quadratic Functions 9-3 Graphing Quadratic Functions 9-4 Solving Quadratic Equations by Graphing.

3.8 Warm Up Write the function in vertex form (by completing the square) and identify the vertex. a. y = x² + 14x + 11 b. y = 2x² + 4x – 5 c. y = x² -

Chapter 10.7 Notes: Solve Quadratic Equations by the Quadratic Formula Goal: You will solve quadratic equations by using the Quadratic Formula.

Warm Up #4 1. Write 15x2 + 6x = 14x2 – 12 in standard form. ANSWER

More about Quadratic Equations November 16, 2009.

Roots, Zeroes, and Solutions For Quadratics Day 2.

Quadratic Formula You can use this formula to find the solutions(roots) to a quadratic equation. This formula can be broken up into 2 parts: b 2 – 4ac.

The Quadratic Formula Students will be able to solve quadratic equations by using the quadratic formula.

Direction: _____________ Width: ______________ AOS: _________________ Set of corresponding points: _______________ Vertex: _______________ Max or Min?

Notes Over 5.6 Quadratic Formula

Chapter 4: Polynomial and Rational Functions. 4-2 Quadratic Equations For a quadratic equation in the form ax 2 + bx + c = 0 The quadratic Formula is.

Functions. Objectives: Find x and y intercepts Identify increasing, decreasing, constant intervals Determine end behaviors.

CHAPTER 10 LESSON OBJECTIVES. Objectives 10.1 Students will be able to: Identify quadratic functions and determine whether they have a minimum or maximum.

Math 140 Quiz 3 - Summer 2004 Solution Review (Small white numbers next to problem number represent its difficulty as per cent getting it wrong.)

Complex Numbers Quadratic Formula Completing The Square Discriminant.

Solving Quadratics Algebra 2 Chapter 3 Algebra 2 Chapter 3.

Warm-Up Solve each equation by factoring. 1) x x + 36 = 02) 2x 2 + 5x = 12.

Section 2.5 – Quadratic Equations

Factor each polynomial.

Polynomial Function Review

Graphing Quadratic Functions Solving by: Factoring

Discriminant and Quadratic

The Discriminant Given a quadratic equation, can youuse the

Using the Quadratic Formula to Find Solutions

Chapter 4 Quadratic Equations

Chapter 3 Quadratic Functions

Algebra 1 Final Exam Review

Solving quadratics methods

Find the number of real solutions for x2 +8x

Section 5-3: X-intercepts and the Quadratic Formula

(Sections 4-5 pt. 1 & 2, 4-6 pt. 1, 4-7, 4-8 pt. 1 & 2)

The Discriminant Check for Understanding –

Math 20-1 Chapter 4 Quadratic Equations

9.5 Quadratic Formula.

Quadratic Functions Quadratic Functions Polynomials Polynomials

5.6 The Quadratic Formula and the Discriminant

9.3 Solving Quadratic Equations

SECTION 9-3 : SOLVING QUADRATIC EQUATIONS

Unit 7 Day 4 the Quadratic Formula.

Skills Check ALL Factoring

Warm up – Solve by Completing the Square

E) Quadratic Formula & Discriminant

1. Use the quadratic formula to find all real zeros of the second-degree polynomial

Solving Quadratic Equations

Review: Simplify.

Section 9.5 Day 1 Solving Quadratic Equations by using the Quadratic Formula Algebra 1.

The Discriminant CA 22.0, 23.0.

Skills Check Solve by Factoring and Square Roots

Solving Special Cases.

The Discriminant Check for Understanding –

3.4 – The Quadratic Formula

Warm Up: Put on the back of guided notes

Linear and Quadratic Functions

Click to begin..

Warm Up #4 1. Write 15x2 + 6x = 14x2 – 12 in standard form. ANSWER

Solving Special Cases.

Quadratic Formula & Discriminant

Solve using factoring or square root property.

CHAPTER # THRU 5.4 TEST # 1 REVIEW QUESTIONS.

Presentation transcript:

1 Describe the vertical and/or horizontal  translations of the graph f(x) = x2 or f(x) = |x| b) a)

2 Write the equation of each quadratic function in standard form.

3 Graph the following equation:

4 Write the equation of each quadratic function in vertex form.

5 Vertex__________ AOS___________ y int___________ Sym. Pt ________ Graph the following equation: Vertex__________ AOS___________ y int___________ Sym. Pt ________

6 Graph the given function and its inverse on the same coordinate axes. Write an equation for the inverse. y = 3x - 6 Inverse Equation ________

7 Graph each square root function. State its domain and range. Domain________ Range __________

8 Simplify each expression. a) b) c)

9 Which ordered pair could be found on a graph of an odd function:

10 Solve the equation.

11 Solve each quadratic equation by completing the square.

12 Solve each quadratic equation by using the quadratic formula.

13 Solve each equation. Discard any extraneous solutions.

How many ways can a committee of 7 14 How many ways can a committee of 7 choose 3 people to go to a conference?

15 Evaluate the discriminant of each equation. Tell how many solutions each equation has and whether the solutions are real or imaginary and how many.

16 Write each polynomial function in standard form

17 Divide:

18 Graph the following function. x - intercepts:______ y - intercepts:______ degree:______ end behavior:_____

19 Given the following zeros, write the factored and standard form of the equation. Zeros: 3, -3, and 1

20 Expand and simplify the following: