Distributive Property Jeopardy By Grace Padgett & Theresa Nguyen.

Slides:

Advertisements

Similar presentations

Distributive Property

Advertisements

Aim: How do we divide monomials?

6-3: Complex Rational Expressions complex rational expression (fraction) – contains a fraction in its numerator, denominator, or both.

ExponentsExponents Objective #1: Students will write numbers in exponential form Objective #2: Students will multiply and divide numbers in exponential.

Algebra 2: Section 6.1 Properties of Exponents. Product of Powers –(when multiplying like bases, add exponents) Power of a Power –(when taking an exponent.

EXAMPLE 2 Evaluate exponential expressions a. 6 – Product of a power property = 6 0 Add exponents. = 1 Definition of zero exponent = 6 –

Copyright©amberpasillas2010. Simplify two different ways. == = =

 To add numbers in scientific notation: 1) Add the constants 2) Keep the exponent the same  Example: (2.1 x 10 5 ) + (3.2 x 10 5 ) = ( ) x 10.

Chapter 8 Review Laws of Exponents. LAW #1 Product law: add the exponents together when multiplying the powers with the same base. Ex: NOTE: This operation.

1.2 Properties of Real Numbers. Sets Of Numbers – Naturals Numbers: counting numbers {1, 2, 3, 4…} – Wholes Numbers: counting numbers and zero {0, 1,

8.1 Multiplying Monomials

Objective 1: To multiply monomials. Objective 2: To divide monomials and simplify expressions with negative exponents.

Review Laws of Exponents

Lesson 1 MULTIPLYING MONOMIALS. What are we going to do…  Multiply monomials.  Simplify expressions involving powers of monomials.

Multiplying and Dividing Monomials 4.3 Monomial: An expression that is either a: (1) numeral or constant, ex : 5 (2)a v ariable, ex: x (3)or a product.

Chapter 6 Polynomial Functions and Inequalities. 6.1 Properties of Exponents Negative Exponents a -n = –Move the base with the negative exponent to the.

Simplifying Algebraic Expressions Distribution and Like Terms Section 5.5.

How do we use the laws of exponents?. The zero power Anything to the power of zero is one.

WORDS ZERO PRODUCT PROPERTY: A base raised to the power of 0 is equal to 1 NEGATIVE EXPONENT PROPERTY: A negative exponent of a number is equal to the.

Properties of Polynomials. Polynomials are sums of "variables and exponents" expressions. Each piece of the polynomial that is being added, is called.

8-1 Multiplying Monomials This presentation was created following the Fair Use Guidelines for Educational Multimedia. Certain materials are included under.

Equation Jeopardy Add Mixed Multiply/ Divide Fractions Q $100 Q $200 Q $300 Q $400 Q $500 Q $100 Q $200 Q $300 Q $400 Q $500 Final Jeopardy Subtract.

Simple Factoring Objective: Find the greatest common factor in and factor polynomials.

Notes 2.4– Solving Equations with Variables on Both Sides.

Polynomials. Polynomial a n x n + a n-1 x n-1 +….. + a 2 x 2 + a 1 x + a 0 Where all exponents are whole numbers – Non negative integers.

5.3 Multiplying and Dividing Monomials Goals: To multiply and divide monomials.

Lesson 6.1 AIM: Understanding Multiplication of Exponents.

PROPERTIES OF EXPONENTS

The Distributive Property Chapter 1.6. Review multiplication.

6.3.2 – Using Distributive Property. Recall, what defines a like term in terms of variables and powers? Examples; xy 3 and 21xy 3 How did we combine like.

Properties of Exponents

Bell Ringer Solve. 1. 7x – 1 = 2x + 19

Lesson 1-5: Solving Equations

Combining Like Terms and the Distributive Property.

Complex Number System Reals Rationals (fractions, decimals) Integers (…, -1, -2, 0, 1, 2, …) Whole (0, 1, 2, …) Natural (1, 2, …) Irrationals.

Multiplying Monomials. Monomial – Any number, or variable, or product /quotient of numbers and variables. Ex: 6x 6x - x 2 y 2 - y 2 z 3 ½xy In an expression,

Get out Page 212 Add this problem to Page 212. a.)

 Anything to the power of zero is one  4 0 =1  X 0 =1  =?

8.1 ADDING AND SUBTRACTING POLYNOMIALS To classify, add, and subtract polynomials.

Section 4.3 The Distributing Property of Algebra.

Complex Number System Reals Rationals (fractions, decimals) Integers (…, -1, -2, 0, 1, 2, …) Whole (0, 1, 2, …) Natural (1, 2, …) Irrationals.

Combining Like Terms. Vocabulary A term is a number or the product of a number and a variable(s). ex. 5, -12p, 35m 3, x 2 y 5 z 13 A constant is a term.

Starter Simplify (4a -2 b 3 ) -3. Polynomials Polynomial a n x n + a n-1 x n-1 +….. + a 2 x 2 + a 1 x + a 0 Where all exponents are whole numbers –

Chapter 7 Review. x 0 = 1 Anything raised to the zero power = 1 1.)2.)

LESSON 4-7 EXPONENTS & MULTIPLYING. When we multiply terms with exponents  ADD exponents of like variables.

Adding and subtracting polynomials 1L interpret expressions that represent a quantity in terms of its context.

Unit 2: Properties of Exponents Jeopardy

Module 1 Day 3 Power Properties.

2 Understanding Variables and Solving Equations.

Exponent Rules: Continued

Multiplying 2 Digit Factors

Objectives The student will be able to:

7-4 More Multiplication Properties of Exponents

2-4 The Distributive Property

Properties of Exponents – Part 1 Multiplication

Multiplying Polynomials

Bell Ringer #4 (2-5-16) Try and define these terms or say what they mean: 1. distribute 2. factor 3. constant 4. coefficient 5. variable.

Equations Containing Decimals

PROPERTIES of EXPONENTS

Multiplication and Division Properties of Exponents

Unit 2: Properties of Exponents Jeopardy

Simplifying Variable Expressions

2.7 The Distributive Property

Do Now Evaluate each algebraic expression for y = 3. 3y + y y

Properties of Exponents – Part 1 Multiplication

Combining Like Terms.

5.3 Multiplying Monomials

Bell Ringer #4 (2-5-16) Try and define these terms or say what they mean: 1. distribute 2. factor 3. constant 4. coefficient 5. variable.

Presentation transcript:

Distributive Property Jeopardy By Grace Padgett & Theresa Nguyen

Tips to Distribute Add the exponents when multiplying variables Ex. x (x + 1) = x² + x Multiply the constants Ex. 7x (5x + 2) = 35x² + 14x And you’re ready to distribute!

Distributing Variables Distributing Variables Distributing Negatives Distributing Negatives Nearly Impossible! Distributing Fractions Distributing Fractions Distributing Whole Numbers Distributing Whole Numbers

7x + 14 Distributing Whole Numbers (100) 7 (x + 2)

3x² + 15 Distributing Whole Numbers (200) 3 (x² + 5)

15x Distributing Whole Numbers (300) 15 (x + 7)

-7x - 35 Distributing Negatives (100) -7 (x +5)

10x² + 70x + 20 Distributing Whole Numbers (400) 10 (x² + 7x + 2)

60g³ + 84g² + 132g Distributing Whole Numbers (500) 12 (5g³ + 7g² + 11g + 16)

-5x² - 3x + 7 Distributing Negatives (200) -1 (5x² + 3x – 7)

-6x² + 33x Distributing Negatives (300) -3x (2x – 11)

48x³ - 84x² + 24x Distributing Negatives (400) -12x (-4x² + 7x – 2)

-32x³ - 32x² + 500x Distributing Negatives (500) -2x (16x² + 16x -250)

5x² - 2x Distributing Fractions (100) ½ x (10x – 4)

10t² + 9t Distributing Fractions (200) ½ t (20t + 18)

75x + 12 Distributing Fractions (300) ¾ (100x + 16)

2x³ - 8x² Distributing Fractions (400) ¼ x ² (8x – 32)

-30x + 35 Distributing Fractions (500) -5/6 (36x – 42)

5x² + 2x Distributing Variables (100) x (5x + 2)

7x³ + 3x² Distributing Variables (200) x (7x² + 3x)

30x² + 20x Distributing Variables (300) 10x (3x + 2)

56m³ + 400m² Distributing Variables (400) 8m² (7m + 50)

26s³ + 117s² Distributing Variables (500) 13s² (2s + 9)

20x² Nearly Impossible! (100) 20 (x² + 8)

21x³y – 24x³ + 3x²y Nearly Impossible! (200) 3x² (7xy – 8x + y)

5x³ - 2x² - 200x Nearly Impossible! (300) -x (-5x² + 2x + 200)

5,000x² + 20,000x – 4,800 Nearly Impossible! (400) 100 (50x² + 200x – 48)

-88x Nearly Impossible! (500) -22/7 (28x – 77)