Combine Like Terms and Distributive Property

Slides:

Advertisements

Similar presentations

Distributive Property

Advertisements

Bell Work Simplify the expression: 1. 2(x +4) 2. 4x + 3y – x + 2y 3. 3(x – 6) x Answers: 2x+ 8 3x + 5y 11x – 14.

Warm Up Add Multiply (8) (22)

Homework Read Pages 327, , , , , Page 335: 17, 18, 57, 93 – 97 Page 344: 7, 12, 14, 39, 40, 43 Page 353: 5, 6, 10,

Math 009 Unit 5 Lesson 2. Constants, Variables and Terms A variable is represented by a letterx is a variable A number is often called a constant-9 is.

In this lesson, you will be shown how to combine like terms along with using the distributive property.

The Distributive Property

The Distributive Property

Simplifying Expressions and Combining Like Terms

Big Ideas Ch 3 Expression and Equations

Lesson 8.4 Multiplication Properties of Exponents

The Distributive Property allows you to multiply each number inside a set of parenthesis by a factor outside the parenthesis and find the sum or difference.

Simplifying Algebraic Expressions Distribution and Like Terms Section 5.5.

 A coefficient is the number part of a term that includes a variable.  Example: 2x  2 is the coefficient  x is the variable.

Bell Work – November 3, Simplify: – What is the y-intercept of the line represented by y = ½ x + 4? 3. Divide: ½ ÷ ¾.

Multiplying Polynomials.  To multiply exponential forms that have the same base, we can add the exponents and keep the same base.

Section 9.6 What we are Learning:

Lesson 3: More with Combining Like Terms

Warm Up Simplify. 1 3 Course (2x + 6) 3. 6 (x + 2)  8x + 4   + 3x.

1.7 The Distributive Property. You can use the distributive property to simplify algebraic expressions We can use the distributive property to re-write.

Simplifying Algebraic Expressions 7-1 Learn to combine like terms in an expression.

Combining Like Terms and the Distributive Property.

Distributive Property and combining like terms.. Use the Distributive Property to simplify each expression. 1. 8(m + 5) = (3x + 9) = –2(4.

Simplifying Algebraic Expressions 11-1 Warm Up Warm Up Lesson Presentation Lesson Presentation Problem of the Day Problem of the Day Lesson Quizzes Lesson.

Equivalent Expressions 6.7. Term When addition or subtraction signs separate an algebraic expression in to parts, each part is called a term.

Simplifying Algebraic Expressions 11-1 Warm Up Simplify  20     

1-5 Simplifying Algebraic Expressions Do Now Evaluate each algebraic expression for y = y + y2. 7y 3. 10y – 4y4. 5y 2 + y

Choctaw High School Algebra I EOI Review 1 Simplifying Expressions To simplify an algebraic expressions, you need to combine the like terms. Like terms.

1.7 Simplifying Expressions Essential Questions: 1)What is the distributive property? 2)How do you simplify expressions?

Combining Like Terms and the Distributive Property Objectives: Students will be able to explain the difference between algebraic equations and expressions.

MTH 091 Sections 3.1 and 9.2 Simplifying Algebraic Expressions.

Combine Like Terms and Distributive Property. IN THIS LESSON, YOU WILL BE SHOWN HOW TO COMBINE LIKE TERMS ALONG WITH USING THE DISTRIBUTIVE PROPERTY.

Combine Like Terms and Distributive Property Mrs. Lovelace January 2016 Edited from… mrstallingsmath.edublogs.org.

Simplifying Algebraic Expressions Adapted by Mrs. Garay.

The Distributive Property

Simplify and Evaluate algebraic expressions

Combine Like Terms and Distributive Property

Algebra 1 Notes: Lesson 1-5: The Distributive Property

Slots A B C D E. Solve the 2 step equation: -2x + 8 = 50.

You can use algebra tiles to model algebraic expressions.

Distributive Property Section 2.6

Combining Like-Terms with Distributive Property

1.4 Basic Rules of Algebra.

1-6 Combining Like Terms Learn to combine like terms in an expression.

THE DISTRIBUTIVE PROPERTY: Factoring the Expression

Goal: Simplify expressions with like terms

The Distributive Property

Using The Distributive Property With Variables

Simplifying Algebraic Expressions

SIMPLIFY THE EXPRESSION

The Distributive Property

Objectives Combining like terms..

Objectives Combining like terms..

Warm Up Problem of the Day Lesson Presentation Lesson Quizzes.

Multiplying and Factoring

Combining Like Terms and Distributive Property

The Distributive Property

Title of Notes: Combining Like Terms & Distributive Property

Multiplying monomial with binomial

Learn to combine like terms in an expression.

Simplifying Expressions

Learn to combine like terms in an expression.

2.7 The Distributive Property

Algebra 1 Section 2.3.

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

Combine Like Terms Notes Page 23

Warm Up Simplify      20  2 3.

Simplify the following

Using the Distributive Property to Simplify Algebraic Expressions

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:

Combine Like Terms and Distributive Property Dr. Livingston CHMS Team 6B

Combine Like Terms and Distributive Property In this lesson, you will be shown how to combine like terms along with using the distributive property.

Terms in an algebraic expression are separated by addition or subtraction signs. How many terms are in this expression? So, what are like terms? Like terms are terms that look alike.

More specifically, Like Terms are terms that have the same variable raised to the same power (exponent). Now, let’s give this a try.

Combine like terms. A. 14a – 5a 9a B. 7y + 8 – 3y – 1 + y 5y + 7 Identify like terms. 9a Combine coefficients: 14 – 5 = 9 Identify like terms ; the coefficient of y is 1, because 1y = y. B. 7y + 8 – 3y – 1 + y 5y + 7 Combine coefficients: 7 – 3 + 1 = 5 and 8 – 1 = 7

Combine like terms. C. 4q – q 3q D. 5c + 8 – 4c – 2 – c 6 Identify like terms; the coefficient of q is 1, because 1q = q. C. 4q – q 3q Combine coefficients: 4 – 1 = 3 Identify like terms; the coefficient of c is 1, because 1c = c. D. 5c + 8 – 4c – 2 – c 6 Combine coefficients: 5 – 4 – 1 = 0 and 8 – 2 = 6

Combine like terms. E. 4m + 9n – 2 4m + 9n – 2 F. 5m – 7m – 8 + 4 No like terms. F. 5m – 7m – 8 + 4 -2m – 4

Remember, to simplify an expression means to perform all possible operations, including combining like terms. In other words, simplify means solve!

For any numbers a, b, and c, a(b + c) = a(b) + a(c) and a(b – c) = The Distributive Property is an algebra property which is used to multiply a single term and two or more terms inside a set of parentheses. For any numbers a, b, and c, a(b + c) = a(b) + a(c) and a(b – c) = a(b) – a(c)

Distribute A. 6(x - 3) B. -2(y + 1) C. -3(a - 1) 6x - 18 -2y + (-2)

Now we will use the distributive property first, then combine like terms second.

1. Simplify 6(5 + n) – 2n. 6(5 + n) – 2n 6(5) + 6(n) – 2n Distributive Property. 30 + 6n – 2n Multiply. 30 + 4n Combine coefficients 6 – 2 = 4.

2. Simplify 3(c + 7) – c. 3(c + 7) – c 3(c) + 3(7) – c Distributive Property. 3c + 21 – c Multiply. 2c + 21 Combine coefficients 3 – 1 = 2.

Simplify. 3. 4(3x + 6)  7x 4. 6(x + 5) + 3x

4. 5(2x - 3) + 4x 10x – 15 + 4x 14x - 15