Course 2: Inequalities Objectives:

Slides:

Advertisements

Similar presentations

Solving Addition and Subtraction Inequalities

Advertisements

Vocabulary Chapter 6.

Solve an absolute value inequality

Systems of Linear Inequalities.  Two or more linear inequalities together form a system of linear inequalities.

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.

Solving Inequalities by Adding or Subtracting (SOL 7.15)

Graphing Inequalities of Two Variables Recall… Solving inequalities of 1 variable: x + 4 ≥ 6 x ≥ 2 [all points greater than or equal to 2] Different from.

Inequalities. Inequality - a mathematical sentence that contains, or not equal.  reads as greater than  reads as less than < reads as less than or equal.

Vocabulary inequality algebraic inequality solution set 1-9 Introduction to Inequalities Course 3.

PRE-ALGEBRA. Lesson 2-9 Warm-Up PRE-ALGEBRA “Solving One-Step Inequalities by Adding and Subtracting” (2-9) (3-1) What are “equivalent inequalities”?

$100 $200 $300 $400 $500 $200 $300 $400 $500 Graphing Inequalities One Step Inequalities Absolute Value Multi-Step Inequalities Compound Inequalities.

Solving Inequalities by Adding or Subtracting

Holt CA Course Solving Inequalities by Adding or Subtracting Preview of Grade 7 AF4.0 Students solve simple linear equations and inequalities over.

Pg #14-40e, Equations and Inequalities Equation = formed when an equal sign (=) is placed between two expressions creating a left and.

Equations and Inequalities. Equation – A sentence stating that two qualities are equal. Includes a variable – 3x + 5 = 17 Equation variable The solution.

Section 2.7 Solving Inequalities. Objectives Determine whether a number is a solution of an inequality Graph solution sets and use interval notation Solve.

Introduction to Inequalities

3.1 Inequalities and their graphs

Solve One-Step Inequalities Solve Multi-Step Inequalities.

Inequalities. SymbolMeaning Greater Than =Equal Greater Than or Equal To.

Chapter 6.1 Solving Inequalities Using Addition and Subtraction Mr. Beltz & Mr. Sparks.

InequalitiesInequalities. An inequality is like an equation, but instead of an equal sign (=) it has one of these signs: Inequalities work like equations,

6.5 Solving Inequalities by Factoring. Steps to Solve To solve an inequality by factoring, treat the inequality like an sign and solve. Make sure to set.

Learning Target: The student will be able to

Objectives: State and use symbols of inequality. Solve inequalities that involve addition and subtraction. Standards Addressed: C: Create and interpret.

Vocabulary Inequality: A mathematical sentence that compares the values of two expressions using an inequality symbol. Solution of an inequality: any number.

1.3 Open Sentences A mathematical statement with one or more variables is called an open sentence. An open sentence is neither true nor false until the.

9.3 – Linear Equation and Inequalities 1. Linear Equations 2.

Equations and Inequalities. Equation – A sentence stating that two qualities are equal. Includes a variable – 3x + 5 = 17 Equation variable The solution.

Intro to Inequalities Unit 4 Section 4.1. Definition A statement that a mathematical expression is greater than or less than another expression.

Activity 15 Inequalities TEST February 4 th over Equations and Inequalities.

Solving One-Step Inequalities

Algebra 1 Foundations, pg 174  Students will be able to write and identify solutions of inequalities.

2.1 Inequalities and Their Graphs CA 1.0 Use arithmetic properties of integers.

Inequalities Inequalities Objectives: To determine whether a number is a solution of an inequality To graph inequalities on the number line To write inequalities.

4-5 Inequalities (pages ) P6  Represent inequalities on a number line or a coordinate plane.

Equations and Inequalities. Unit 8 – Solving Inequalities.

Bell Ringer Use the < and > symbols to complete the inequality.

An inequality is a mathematical sentence that contains the following symbols:

Solving Inequalities Using Addition or Subtraction

1.4 – Writing Equations and Inequalities

Word problems that lead to inequalities

3.4 Solving Inequalities with Addition and Subtraction

Inequalities 12/3/2018.

6.5 Inequalities 12/3/2018.

6.5 Solving Inequalities by Factoring

Notes Over 1.4 It’s time to stop “daydreaming”

3-1 Inequalities and Their Graphs

3-1 Inequalities and their Graphs

2.1 Writing and Graphing Inequalities

2.5 Solving Compound Inequalities

Solving Inequalities by Adding or Subtracting

1.4 – Writing Equations and Inequalities

4 minutes Warm-Up Fill in each blank with , or = to make each statement true. 1) 2___3 5) 5___ 2) 5___4 6) -2___-5 3) 3___-1 7) 4) -7___-4.

Inequalities and Their Graphs

Sec 4-4B Solve Inequalities by addition and Subtraction

Notes Over 1.7 Solving Inequalities

SIMPLE INEQUALITIES.

Solve an inequality using subtraction

Notes Over 1.7 Solving Inequalities

Is 3 a solution for the inequality x – 2 < 6?

7.5 Write and Graph Inequalities

Course 2: Inequalities Objectives:

3-2 Solving Inequalities Using Addition and Subtraction

Choose a number greater than 8, substitute for y and solve:

Chapter 5 Review.

Presentation transcript:

Course 2: Inequalities Objectives: To determine whether a number is a solution of an inequality To graph inequalities on the number line To write inequalities

Inequalities An inequality is a mathematical sentence containing >, <, >, <.

Inequalities < > Words - is less than - is greater than -is less than or equal to - is at most is greater than or equal to is at least Symbols < >

Inequalities Any number that makes an inequality true is a solution of the inequality. Inequalities have many solutions. Example: x > 4 List 4 possible solutions. 4.5, 5, 7, 12.5

Example 2 The solutions are shown by shading a number line. Example: x > 4 3 4 5 6 7

Example 1 Determine whether each number is a solution of a) 3 yes, because 3 is less than 7 b) -2 yes, because -2 is less than 7 c) 9 no, because 9 is not less than or equal to 7 d) 7 yes, because 7 is equal to 7

1) Graph m > 3 on a number line. 1 2 3 4 5

2) Graph k < -2 on a number line. -3 -2 -1 1

3) Graph h > 3 on a number line. 1 2 3 4

4) Graph k < -2 on a number line. -3 -2 -1 1

Solving One-Step Inequalities by Adding or Subtracting 1) x + 4 > 8 - 4 - 4 x > 4

Check x + 4 > 8 Solution: x > 4 Substitute a value that is greater than 4 for x. 5 + 4 > 8 9 > 8  This is a true statement.

Graph x > 4 1 2 3 4 5

Solving One-Step Inequalities by Adding or Subtracting + 3 + 3 c < 5

Check c – 3 < 2 Solution: c < 5 Substitute a value that is less than or equal to 5 for c. 5 – 3 < 2 2 < 2  This is a true statement.

Graph c < 5 on a number line. 2 3 4 5 6

Solving One-Step Inequalities by Adding or Subtracting + 4 + 4 d < 2

Check d – 4 < -2 Solution: d < 2 Substitute a value that is less than 2 for d. 1 – 4 < -2 -3 < -2  This is a true statement.

Graph d < -2. -5 -4 -3 -2 -1

Solving One-Step Inequalities by Adding or Subtracting + 2 + 2 a > 8

Check a - 2 > 6 Solution: a > 8 Substitute a value that is greater than or equal to 8 for a. 8 - 2 > 6 6 > 6  This is a true statement.

Graph a > 8. 5 6 7 8 9

Solving One-Step Inequalities by Adding or Subtracting + 7 + 7 p > 7

Check p - 7 > 0 Solution: p > 7 Substitute a value that is greater than 7 for p. 8 - 7 > 0 1 > 0  This is a true statement.

Graph p > 7 4 5 6 7 8

Solving One-Step Inequalities by Adding or Subtracting 6) j + 5 < 2 - 5 - 5 j < -3

Check j + 5 < 2 Solution: j < -3 Substitute a value that is less than or equal to -3 for c. -3 + 5 < 2 2 < 2  This is a true statement.

Graph j < -3 on a number line. -5 -4 -3 -2 -1

Review