Think about the situations presented in Comp-U-Us and Mowing Lawns. You used two different expressions to model each situation. In Comp-U-Us, one expression.

Slides:

Advertisements

Similar presentations

College Algebra Math 130 Amy Jones Lewis. Comp-U-Us  You and two of your friends have decided to start a new company, Comp-U-Us, to assemble and sell.

Advertisements

Introduction Equations are mathematical sentences that state two expressions are equal. In order to solve equations in algebra, you must perform operations.

Solving Rational Equations

Finding angles with algebraic expressions

2.4 Solving Equations with Variables on Both Sides

The Distributive Property

Solving Equations with variables on both sides of the Equals Chapter 3.5.

2.1 The Addition Property of Equality

Solving Equations. Inverse Operations  When solving equations algebraically, use the inverse (opposite) operation that is displayed to determine what.

Academy Algebra II/Trig 6.6: Solve Exponential and Logarithmic Equations Unit 8 Test ( ): Friday 3/22.

Solving Linear Equations MATH 017 Intermediate Algebra S. Rook.

Unit 6 vocabulary Test over words next week, it will benefit you to study and understand what there words mean.

Unit 2 – Week 4 Reasoning with Linear Equations and Inequalities Lesson 3 Students are introduced to the formal process of solving an equation: starting.

Unit 6 vocabulary Test over words next week, it will benefit you to study and understand what there words mean.

Solving Polynomial Equations – Factoring Method A special property is needed to solve polynomial equations by the method of factoring. If a ∙ b = 0 then.

Equivalent Number Sentences, Equals Sign Means Equality __ + __ = __ - __ = Addition and Subtraction 22 Patterns and Algebra 19.

HW # 30- NO HOMEWORK- HALLOWEEN Warm up You are hosting a Halloween party. You will need to provide 3 cans of soda per person, 4 slices of pizza per person,

Solving Multi- Step Equations. And we don’t know “Y” either!!

21 st Century Lessons Equivalent Expressions 1. Warm Up OBJECTIVE: Students will be able to identify when two expressions are equivalent. Language Objective:

Unit 6 vocabulary Test over words next week, it will benefit you to study and understand what there words mean.

Goal: Solve linear equations.. Definitions: Equation: statement in which two expressions are equal. Linear Equation (in one variable): equation that.

Solution Because no variable appears in the denominator, no restrictions exist. The LCM of 5, 2, and 4 is 20, so we multiply both sides by 20: Example.

§ 2.3 The Multiplication Property of Equality. Martin-Gay, Beginning Algebra, 5ed 22 Multiplication Property of Equality If a, b, and c are real numbers,

Section 2-4 Reasoning with Properties from Algebra.

Section 2.1 Solving Equations Using Properties of Equality.

Solve each equation for y. 1. 3x + y = 52. y – 2x = x – y = x + 4y = 85. 9y + 3x = 16. 5y – 2x = 4 Clear each equation of decimals x.

 Warm Up!! (Left side) What is the difference between an Equation and an Expression??

Copyright © 2011 Pearson Education, Inc. Publishing as Prentice Hall. 2.6 Solving Equations: The Addition and Multiplication Properties.

Advanced Algebra - Trigonometry Objective: SWBAT solve linear equations. 1.

Solving Addition and Subtraction Equations. Inverse operation is an operation that “undoes” another operation. Addition and subtraction are inverse operation.

Write an algebraic expression to represent 5 less than a number “n”.

Day Problems Solve by graphing. Check your solution.

Ch 1.7 (part 1) One Step (Addition & Subtraction) Objective: To solve one-step variable equations using the Inverse Property of Addition.

Solving Logarithmic Equations

Exponential Functions & Inequalities

Lesson 11-5 Warm-Up.

Multi Step Equations. Algebra Examples 3/8 – 1/4x = 1/2x – 3/4 3/8 – 1/4x = 1/2x – 3/4 8(3/8 – 1/4x) = 8(1/2x – 3/4) (Multiply both sides by 8) 8(3/8.

Warm Up Simplify each expression. 1.10c + c 2. 5m + 2(2m – 7) 11c 9m – 14.

1. 4 [ -2(4 + 1) ÷ 5] – 4 ÷ x + (-8) = 4. Equations with Fractions Equations w/ Distributive Property Equations & Combining Like Terms Equations.

Martin-Gay, Beginning Algebra, 5ed

7 th Grade Math Vocabulary Word, Definition, Model Emery Unit 2.

8-2B Solve Quadratic Equations by Factoring Algebra 1 Glencoe McGraw-HillLinda Stamper.

__ + __ = __ - __ = Addition and Subtraction 22 Patterns and Algebra 19.

Lesson 7.3 Solving Addition and Subtraction Equations 2/2/10.

Distributive Property

Properties Quiz on Thursday!

Lesson 3.1: Solving Equations using Addition or Subtraction

Equations with Variables on Both Sides

Bellwork (this is done on loose leaf paper)

Bellringer 10.4Writing to Win:

Introduction Equations are mathematical sentences that state two expressions are equal. In order to solve equations in algebra, you must perform operations.

6-2 Solving Systems Using Substitution

Solving Systems using Substitution

Algebra II September 8, 2005.

Ch 2.2 One Step (Addition & Subtraction)

Standard Form Examples 3x + y = 5 -2x + y = 10 x – y = 6

Equations and Inequalities

Rational Expressions and Equations

Justify your reasoning.

Evaluating expressions and Properties of operations

a + 2 = 6 What does this represent? 2 a

Learn to combine like terms in an expression.

2 Chapter Chapter 2 Equations, Inequalities and Problem Solving.

2-3 Equations With Variables on Both Sides

Rewriting Equations Equivalent Equations.

Solving Equations Using Multiplication and Division

Distributive Property

Solving Equations Algebra tiles can be used to explain and justify the equation solving process. The development of the equation solving model is based.

Maintenance Sheet due Friday

1.3 Solving Linear Equations

Presentation transcript:

Think about the situations presented in Comp-U-Us and Mowing Lawns. You used two different expressions to model each situation. In Comp-U-Us, one expression you wrote was 1800(x+20). The other expression you wrote was 1800x + 20(1800) or 1800x + 36, Are these expressions all equivalent? Do you get the same results from either algebraic expression? How can you determine if they are equivalent? Give an example that illustrates whether the two expressions are equivalent or not. 4-56

Think about the situations presented in Comp-U-Us and Mowing Lawns. You used two different expressions to model each situation. In Comp-U-Us, one expression you wrote was 1800(x+20). The other expression you wrote was 1800x + 20(1800) or 1800x + 36,000.

2. Your example above should help to show that The “law” or rule that says that these two expressions are equal is called the Distributive Property. Look at the left side of this equation. Explain what was done to arrive at the right side of the equation.