Section 1.6 Natural Number Exponents and Order of Operations.

Slides:

Advertisements

Similar presentations

CCGPS Frameworks Student Edition 6th Grade Unit 3: Expressions.

Advertisements

Like Terms: All terms with same variable part

Multiplying, Dividing, and Simplifying Radicals

Copyright © 2010 Pearson Education, Inc. All rights reserved Sec

Section 1.5 Multiplication of Real Numbers. 1.5 Lecture Guide: Multiplication of Real Numbers and Natural Number Exponents Objective: Multiply positive.

Chapter P Prerequisites: Fundamental Concepts of Algebra

Variables and Exponents

Expressions Objective: EE.01 I can write and evaluate numerical expressions involving whole number exponents.

Warm Up 1. Find the length of a segment with endpoints (-1, 5) and (7, 9) 2. Find the volume for the figure.

Using Exponential Notation. 3∙3∙3∙3∙3 can be written as 3 is a factor 5 times exponent Base Read as “three to the fifth power”

Drill #1 Let B = Briana’s age. Write an algebraic statement that represents the following situations: 1.One year more than Briana’s age 2.5 years less.

1.2 – Evaluate and Simplify Algebraic Expressions A numerical expression consists of numbers, operations, and grouping symbols. An expression formed by.

Absolute Value The absolute value of a real number a, denoted by |a|, is the distance between a and 0 on the number line. 2– – 1– 3– 4– 5 | – 4|

Section 5.1 Product and Power Rules for Exponents.

C ollege A lgebra Basic Algebraic Operations (Appendix A) L:5 1 Instructor: Eng. Ahmed Abo absa University of Palestine IT-College.

Warm Up. HW Check Exponents Be sure to use these vocabulary words when referring to problems in this section!

Objective: Add, subtract and multiplying radical expressions; re-write rational exponents in radical form. Essential Question: What rules apply for adding,

Copyright 2013, 2009, 2005, 2002 Pearson, Education, Inc.

Chapter 1 Section 2 Copyright © 2008 Pearson Education, Inc. Publishing as Pearson Addison-Wesley.

1-7 Simplifying Expressions Warm Up Warm Up Lesson Presentation Lesson Presentation California Standards California StandardsPreview.

Chapter 1 Section 3 Copyright © 2011 Pearson Education, Inc.

Section 3Chapter 1. 1 Copyright © 2012, 2008, 2004 Pearson Education, Inc. Objectives Exponents, Roots, and Order of Operations Use exponents. Find.

Introduction An exponent is a quantity that shows the number of times a given number is being multiplied by itself in an exponential expression. In other.

Algebraic Expressions. Education's purpose is to replace an empty mind with an open one. Malcolm Forbes.

Squares & Square Roots Perfect Squares.

Chapter 01 – Section 01 Variables and Expressions.

Chapter 1-1 Variables and Expressions In this section you will learn how to,  Write mathematical expressions given verbal expressions  And how to write.

Order of Operations.

Section 5.6 Special Products of Binomials. 5.6 Lecture Guide: Special Products of Binomials Objective 1: Multiply by inspection a sum times a difference.

Section 5.1 Product and Power Rules for Exponents.

1 Copyright © 2015, 2011, 2007 Pearson Education, Inc. Chapter 1-1 Basic Concepts Chapter 1.

Copyright © 2011 Pearson Education, Inc. Publishing as Prentice Hall. Chapter 8 Real Numbers and Introduction to Algebra.

Section 1.3 Addition of Real Numbers. Objective: Add positive and negative real numbers. 1.3 Lecture Guide: Addition of Real Numbers There is a difference.

Copyright © Cengage Learning. All rights reserved. 1 Whole Numbers.

Exponents and Radicals Objective: To review rules and properties of exponents and radicals.

Section 9.4 Combining Operations and Simplifying Complex Rational Expressions.

1.2 – Day 1 Exponents and Radicals. 2 Objectives ► Integer Exponents ► Rules for Working with Exponents ► Scientific Notation ► Radicals ► Rational Exponents.

Vocabulary Unit 4 Section 1:

Copyright © 2014, 2010, and 2006 Pearson Education, Inc. Chapter 1 Introduction to Algebraic Expressions.

Copy entire table into notebook

Exponents and Order of Operations Section 1.7. An exponent is a shorthand notation for repeated multiplication is a factor 5 times Using.

Chapter 1 Decimals Patterns and Algebra. Lesson 1-1 A Plan for Problem Solving 1. Understand the Problem (Explore) – What is the question being asked?

1.1 Variables and Expressions In the algebraic expression 4s, the letter s is called a variable. In algebra, variables are symbols used to represent unspecified.

Slide 1 Copyright © 2015, 2011, 2008 Pearson Education, Inc. Chapter 2 The Whole Numbers Chapter 1.

§ 1.4 Introduction to Variable Expressions and Equations.

Math 094 Section 1.3 Exponents, Order of Operations, and Variable Expressions.

1 1.2 Objectives ► Integer Exponents ► Rules for Working with Exponents ► Scientific Notation ► Radicals ► Rational Exponents ► Rationalizing the Denominator.

Multiplication Properties of Exponents Lesson 4.1.

Multiplication Property of Exponents Today’s Objective: I can multiply exponential expressions.

Notes T4-53 Properties of Exponents Objective: I can use properties of exponents. Key Words: Base Exponent Variable.

© 2010 Pearson Prentice Hall. All rights reserved 1.7 Exponents and Order of Operations.

Chapter R Section 7: Radical Notation and Rational Exponents

1 Chapter Chapter 2 The Whole Numbers.

Order of Operations Giant Elephants May Attack

Preview Warm Up California Standards Lesson Presentation.

Exponents and Order of Operations

The number of times a number or expression (called a base) is used as a factor of repeated multiplication. Also called the power. 5⁴= 5 X 5 X 5 X 5 = 625.

Adding, Subtracting, and Multiplying Radical Expressions

Place Value, Names for Numbers, and Reading Tables

1.1 Real Numbers.

Example 1: Finding Real Roots

Objectives Rewrite radical expressions by using rational exponents.

Chapter 1 Section 4.

Copyright © Cengage Learning. All rights reserved.

Multiplication Properties of Exponents

Warm-Up Write an algebraic expression for the following phrases.

Warm Up Evaluate |5 – 16| –23 –8 4. |3 – 7| 4

Multiplication Properties of Exponents

Algebra 1 Section 1.8.

Presentation transcript:

Section 1.6 Natural Number Exponents and Order of Operations

Objective 1: Use natural number exponents. 1.6 Natural Number Exponents and Order of Operations Repeated Multiplication: Exponential notation is a concise notation to indicate repeatedly multiplying the same factor a given number of times. The expression can be written using exponential notation. The base, or factor being repeatedly multiplied, is 2. The exponent, or number of times the factor is repeated, is 8. So Exponential notation is a concise notation to indicate repeatedly multiplying the same factor a given number of times..

Algebraically Verbally Numerical Examples For any natural number n, with base b and exponent n. For any natural number n, is the product of b used as a factor n times. The expression is read as “b to the nth power.” Exponential Notation

Write each expression in exponential form. Write each expression in expanded form.

To avoid errors it is very important to identify the base of an exponential expression. If an exponent is on a number or variable, then that number or variable is the base. If an exponent is outside a pair of grouping symbols, then the contents of this pair of grouping symbols is the base. Identify the correct base, exponent and expanded form of each expression. Exponential ExpressionBaseExponentExpanded Form

Mentally evaluate each expression.

Mentally evaluate each expression.

16. and have the same value although the bases are different. Can you explain this? 15. Can you explain the subtle distinction between and ?

17.(a) Which of the following do you think is the correct evaluation of the expression ? Option IOption IIOption III (b) Try evaluating the above expression on your calculator. Do you agree with the calculator result? Objective 2: Use the standard order of operations.

A major objective in this section is to master the order of operations. The order of operations gives a consistent method for evaluating mathematical expressions like the one above. Standard Order of Operations Step 1: Start with the expression within the innermost pair of ________________ ____________________. Step 2: Perform all __________________. Step 3: Perform all __________________ and __________________ as they appear from left to right. Step 4: Perform all __________________ and __________________ as they appear from left to right.

. The first four grouping symbols contain both a beginning symbol before and an ending symbol after the group. In the radical symbol and the fraction bar the group is determined by the length of the horizontal bar. Some common grouping symbols are

Use the standard order of operations to perform the indicated operations. Use a calculator only to check your results.

Use the standard order of operations to perform the indicated operations. Use a calculator only to check your results.

Use the standard order of operations to perform the indicated operations. Use a calculator only to check your results

Use the standard order of operations to perform the indicated operations. Use a calculator only to check your results.

Use the standard order of operations to perform the indicated operations. Use a calculator only to check your results.

Use the standard order of operations to perform the indicated operations. Use a calculator only to check your results.

Use the standard order of operations to perform the indicated operations. Use a calculator only to check your results.

Use the standard order of operations to perform the indicated operations. Use a calculator only to check your results.

Use the standard order of operations to perform the indicated operations. Use a calculator only to check your results.

Objective 3: Use the distributive property of multiplication over addition. The distributive property can be used in two ways: to expand expressions that are in a factored form and to factor expressions with terms that have a common factor. Distributive Property of Multiplication Over Addition AlgebraicallyVerbally Numerical Examples For all real numbers a, b, and c, and. Multiplication distributes over addition.

Use the distributive property to expand each expression in the first column and to factor each expression in the second column

Use the distributive property to expand each expression in the first column and to factor each expression in the second column

Use the distributive property to expand each expression in the first column and to factor each expression in the second column.

44. What property justifies the fact that ? 46. What property justifies the fact that ? 45. What property justifies the fact that ?

Adding Like Terms: Use the distributive property to combine like terms

Adding Like Terms: Use the distributive property to combine like terms.

Adding Like Terms: Use the distributive property to combine like terms.

Adding Like Terms: Use the distributive property to combine like terms.

Phrases Used To Indicate Exponentiation Key PhrasesVerbal Examples Algebraic Examples To a power"3 to the 6 th power" Raised to "y raised to the 5 th power" Squared"4 squared" Cubed"x cubed"

55. x raised to the fourth power 56. The square of the quantity x plus two. Translate each verbal statement into algebraic form.

Write each expression in the horizontal one-line format used by calculators.

Each expression is given in the horizontal one-line format used by calculators. Rewrite each expression in the standard algebraic format