Homework Answers (1-2 Worksheet)

Slides:

Advertisements

Similar presentations

Unit 3 Day 3 - Rational Exponents and Radicals

Advertisements

Multiplying Monomials and Raising Monomials to Powers

Algebra 1 Glencoe McGraw-Hill JoAnn Evans

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.

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.

Simplifying Radicals.

1)Be able to apply the quotient of powers property. 2)Be able to apply the power of a quotient property. 3)Be able to apply the multiplication properties.

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

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

Warm Up I can simplify expressions with exponents. 1. What is the value of 3x 3 +2 when x=10? 2. You put $500 in an account that doubles every year. 

1.3 Complex Number System.

Algebraic Expressions

Exponents Properties. Warm Up Solve the following equations: 3 = 3x + 1 6x + 7 = 61 5a – 34 = -9.

Big Ideas Ch 3 Expression and Equations

Warm Up Simplify (10²)³

EXPONENTS. EXPONENTIAL NOTATION X IS THE BASE 2 IS THE EXPONENT OR POWER.

 The Distributive Property states that multiplying a sum by a number gives the same result as multiplying each addend by the number and then adding the.

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.

Monomials Multiplying Monomials and Raising Monomials to Powers.

Exponent Rules Essential Question: How can I simplify and evaluate algebraic equations involving integer exponents?

R8 Radicals and Rational Exponent s. Radical Notation n is called the index number a is called the radicand.

Simplifying Algebraic Expressions: A review of coefficients, constants, and Like Terms and Applying the Distributive Property so you can simplify.

Notes October 8, 2012 Unit 3 Linear Expressions and Equations Expressions Linear Expressions and Equations.

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

Unit 0 Lessons 1-3 Evaluating expressions using order of operations By R. Portteus and By Miss Klien modified by LHope.

Radicals Simplify radical expressions using the properties of radicals

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

Combining Like Terms and the Distributive Property.

1-2: Evaluate and Simplify Algebraic Expressions Numeric expression = numbers, operations and grouping symbols Variable = LETTER used to represent a number.

5-1 Monomials Objectives Multiply and divide monomials

Simplifying Algebraic Expressions. 1. Evaluate each expression using the given values of the variables (similar to p.72 #37-49)

Combining Like Terms, Add/Sub Polynomials and Distributing Tammy Wallace Varina High.

1.5 The Distributive Property For any numbers a, b, and c, a(b + c) = ab + ac (b + c)a = ba + ca a(b – c)=ab – ac (b – c)a = ba – ca For example: 3(2 +

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

ALGEBRA 1 Lesson 1-7 Warm-Up. ALGEBRA 1 Lesson 1-7 Warm-Up.

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

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.

Distributive Property. Mix Problems Homework Distributive Property.

Unit 7 - Exponents.

The Distributive Property

My Equations Booklet.

Looking Back at Exponents

Distributive Property Multiply and Divide polynomials by a constant worksheet.

2 Understanding Variables and Solving Equations.

1-4 The Distributive Property

Apply Exponent Properties Involving Quotients

The Order of Operations

So, to simplify an expression using order of operations, you should:

Distributive Property Section 2.6

Solve for variable 3x = 6 7x = -21

2 Understanding Variables and Solving Equations.

Goal: Simplify expressions with like terms

Simplifying Algebraic Expressions

Evaluating Expressions

or write out factors in expanded form.

 Warm-up: n HW: Pg. 10 (40) Pg. 12 (75, 79, 84, 85, 8996, 110)

Equations Containing Decimals

Combining Like Terms and Distributive Property

Multiplying monomial with binomial

2.7 The Distributive Property

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

1.3 Algebraic Expressions

Evaluating Expressions

Ch 1-2 Order of Operations

Warm Up 1. 3 ( x + 2 ) – 8x 3. = x 9 – ) 6p – 5p 2 ( 4 = p 4. 5 ( )2 –

Warm Up Simplify      20  2 3.

Presentation transcript:

Homework Answers (1-2 Worksheet)

Combining Like Terms Term: Part of the expression or equation separated by + and - Variable: Letter that represents a number, or a set of numbers. Coefficient: A number in front of a variable. Tells us what to multiply the variable by. Constant: A term with no variables (number by itself).

Combining like terms allows us to simplify an expression Combining like terms allows us to simplify an expression. To combine like terms ADD or SUBTRACT (look at the signs) the Coefficients. The variables and their exponents will remain the same. Examples:

Try:

The Distributive Property Objective: You will be able to use the distributive property to evaluate and simplify expressions

The Distributive Property

The Distributive Property

Example 1: Rewrite each expression using the distributive property Example 1: Rewrite each expression using the distributive property. Then evaluate.

Example 2: Rewrite each product using the distributive property Example 2: Rewrite each product using the distributive property. Then simplify. a) b) c) d)

Try:

e) g) f)

When expressions require us to use the distributive property and combine like terms to simplify, distribute first, then combine like terms. Example 3

2-4 Dividing Real Numbers When multiplying using the distributive property, the term on the outside of the parenthesis multiplies all terms on the inside of parenthesis. When simplifying fractions with one term in the denominator, a similar process is used. Every term in the numerator is divided by the term in the denominator.

Example 3: Simplify each fraction.

You try. Simplify the fraction.