Sullivan Algebra and Trigonometry: Section 1.1 Linear Equations Objectives of this Section Solve a Linear Equation Solve Equations That Lead to Linear.

Slides:

Advertisements

Similar presentations

1.3 Solving Equations 1.5 Solving Inequalities

Advertisements

1 Learning Objectives for Section 1.1 Linear Equations and Inequalities The student will be able to solve linear equations. The student will be able to.

Ch 6 Sec 3: Slide #1 Columbus State Community College Chapter 6 Section 3 More on Solving Linear Equations.

HAWKES LEARNING SYSTEMS math courseware specialists Copyright © 2010 Hawkes Learning Systems. All rights reserved. Hawkes Learning Systems: College Algebra.

HAWKES LEARNING SYSTEMS math courseware specialists Copyright © 2010 Hawkes Learning Systems. All rights reserved. Hawkes Learning Systems: College Algebra.

Chapter 1 Linear Equations and Graphs Section 1 Linear Equations and Inequalities.

Linear Systems The definition of a linear equation given in Chapter 1 can be extended to more variables; any equation of the form for real numbers.

8/8/ Inequalities. 8/8/ Bumper Cars You must be at least 130cm tall to ride the bumper cars. This can be represented by the inequality.

Step 1: Simplify Both Sides, if possible Distribute Combine like terms Step 2: Move the variable to one side Add or Subtract Like Term Step 3: Solve for.

2.1 The Addition Property of Equality

Copyright © 2013, 2009, 2006 Pearson Education, Inc. 1 1 Section 2.2 The Multiplication Property of Equality Copyright © 2013, 2009, 2006 Pearson Education,

1.3 Solving Equations Using a Graphing Utility; Solving Linear and Quadratic Equations.

An equation is a mathematical statement that two expressions are equivalent. The solution set of an equation is the value or values of the variable that.

Sullivan Algebra and Trigonometry: Section 12.1 Systems of Linear Equations Objectives of this Section Solve Systems of Equations by Substitution Solve.

Copyright © Cengage Learning. All rights reserved. Equations and Inequalities 2.

1.4 Solving Equations ●A variable is a letter which represents an unknown number. Any letter can be used as a variable. ●An algebraic expression contains.

§ 2.8 Solving Linear Inequalities. Martin-Gay, Beginning and Intermediate Algebra, 4ed 22 Linear Inequalities in One Variable A linear inequality in one.

Chapter 1 - Fundamentals Equations. Definitions Equation An equation is a statement that two mathematical statements are equal. Solutions The values.

Math 021.  An equation is defined as two algebraic expressions separated by an = sign.  The solution to an equation is a number that when substituted.

1.4 Solving Linear Equations. Blitzer, Algebra for College Students, 6e – Slide #2 Section 1.4 Linear Equations Definition of a Linear Equation A linear.

Solving Systems Using Elimination

Sullivan Algebra and Trigonometry: Section 1.5 Solving Inequalities Objectives of this Section Use Interval Notation Use Properties of Inequalities Solve.

Section 2.1 Solving Equations Using Properties of Equality.

Solving Equations. The equations are equivalent If they have the same solution(s)

1.3 Solving Linear Equations

Chapter 2 Copyright © 2015, 2011, 2007 Pearson Education, Inc. Chapter Copyright © 2015, 2011, 2007 Pearson Education, Inc. Chapter 2-1 Solving Linear.

College Algebra Section 1.2 Linear Equations Objectives of this Section Solve a Linear Equation Solve Rational Equations Solve Applied Problems Involving.

Section 4.3 Solving Absolute Value Equations and Inequalities

Sullivan Algebra and Trigonometry: Section 1.2 Objectives of this Section Translate Verbal Descriptions into Mathematical Expressions Set Up Applied Problems.

Bell Work: Simplify: √500,000,000. Answer: 10,000√5.

Copyright © 2010 Pearson Education, Inc. All rights reserved. Sec Addition Property of Equality If A, B, and C are real numbers, then the equations.

MTH Algebra THE ADDITION PROPERTY OF EQUALITY CHAPTER 2 SECTION 2.

Sullivan Algebra and Trigonometry: Section 1.1 Objectives of this Section Solve an Equation in One Variable Solve a Linear Equation Solve Equations That.

Chapter 1 Equations and Inequalities Copyright © 2014, 2010, 2007 Pearson Education, Inc Linear Equations and Rational Equations.

Solving Equations Using Addition or Subtraction Objective: Students will solve linear equations using addition and subtraction.

Bell Ringer 2. Systems of Equations 4 A system of equations is a collection of two or more equations with a same set of unknowns A system of linear equations.

Lesson 8.1. » A statement where two mathematical expressions are. » Think of an equation as a balance scale or teeter-totter. The left side must always.

Algebra 1 Section 3.1 Solve equations using addition and subtraction Consider the balance… Transformations that produce equivalent equations. 1.Add the.

§ 2.2 The Multiplication Property of Equality. Blitzer, Introductory Algebra, 5e – Slide #2 Section 2.2 Properties of Equality PropertyDefinition Addition.

Write, Interpret and Use Mathematical Expression and Equations.

Algebra 2 Solving Systems Algebraically Lesson 3-2 Part 2.

1.4 Solving Equations.

Chapter 1 Linear Equations and Graphs

Example: Solve the equation. Multiply both sides by 5. Simplify both sides. Add –3y to both sides. Simplify both sides. Add –30 to both sides. Simplify.

Chapter 1 Linear Equations and Graphs

Solving Equations with the Variable on Each Side

Copyright © 2014, 2010, 2007 Pearson Education, Inc.

Copyright © 2014, 2010, 2007 Pearson Education, Inc.

Chapter 2 Equations and Inequalities in One Variable

Warm Up Simplify each expression. 1. 3x + 2y – 5x – 2y

1.4 Solving Equations Using a Graphing Utility

Solving Algebraic Equations

Inequalities 12/3/2018.

6.5 Inequalities 12/3/2018.

EQ: How do I solve an equation in one variable?

Copyright © 2014, 2010, 2007 Pearson Education, Inc.

Grade 10 Academic (MPM2D) Unit 1: Linear System Solving First Degree Equations Mr. Choi © 2016 E. Choi – MPM2D - All Rights Reserved.

1.4 Solving Equations I’ve taught you how to solve equations the “simonized” way but here’s another way of doing the same thing!

1.4 Solving Equations Using a Graphing Utility

Solving a System of Equations in Two Variables by the Addition Method

SECTION 2-4 : SOLVING EQUATIONS WITH THE VARIABLE ON BOTH SIDES

Do Now 10/13/11 In your notebook, simplify the expressions below.

Section Solving Linear Systems Algebraically

2 Equations, Inequalities, and Applications.

2 Equations, Inequalities, and Applications.

Equations …. are mathematical sentences stating that two expressions are equivalent.

Algebra 1 Section 2.4.

Solving Equations.

Engineering Mathematics

Solving Equations with Fractions

Presentation transcript:

Sullivan Algebra and Trigonometry: Section 1.1 Linear Equations Objectives of this Section Solve a Linear Equation Solve Equations That Lead to Linear Equations Solve Applied Problems Involving Linear Equations

The set of all values of a variable that make an equation a true statement are called solutions, or roots, of the equation. Example: The statement x + 5 = 9 is true when x = 4 and false for any other choice of x. Thus, 4 is a solution of the equation. We also say that 4 satisfies the equation x + 5 = 9.

We solve equations by creating a series of equivalent equations, that is equations that have precisely the same solution set. Example: The equations 3x – 4 = 5x and 2x = -4 are equivalent equations, since the solution set for both equation is {-2}.

Procedures that Result in Equivalent Equations 1. Interchange the two sides of the equation. 2. Simplify the sides of the equation by combining like terms, eliminating parenthesis, and so on. 3. Add or subtract the same expression on both sides of the equation. 4. Multiply or divide both sides of the equation by the same nonzero expression. 5. If one side of the equation is 0 and the other side can be factored, then set each factor equal to 0.

Solve: Example

Solve:

Example Solve the equation:  xxxx  3124

A linear equation in one variable is equivalent to an equation of the form: Note that the previous example,  xxxx  3124 Is an example of a linear equation, since it is equivalent to: Both equations have the same solution set: { }

Example

Steps for Setting Up Applied Problems Step 1: Read the problem carefully, perhaps two or three times. Identify what you are looking for. Step 2: Assign a letter (variable) to represent what you are looking for. Express any remaining unknown quantities in terms of that variable. Step 3: Make a list of known facts and translate them into mathematical expressions. These may take the form of an equation or later, an inequality. Step 4: Solve the equation for the variable and answer the question using a sentence. Step 5: Check your answer with the facts of the problem.

Example: Yolanda, Mary, and Sophie won $200,000 playing the lottery. Based on how much each contributed to buy the ticket, Mary gets four fifths of what Yolanda gets, while Sophie gets three fourth of what Mary gets. How much does each receive?