Title. The easiest way to solve a fraction equation is to first get rid of the fraction !!! Multiply each term by the common denominator!! This will cancel.

Slides:

Advertisements

Similar presentations

SOLVING RATIONAL EQUATIONS Lesson 48. What are rational equations?

Advertisements

Solving Multi-Step Equations with Like Terms and Parentheses.

Topic: EQUATIONS Simple Equations Fractional Equations.

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

EXAMPLE 1 Writing Equivalent Fractions. EXAMPLE 1 Writing Equivalent Fractions Write two fractions that are equivalent to. Writing Equivalent Fractions.

Solving Equations with the Variable on Both Sides Objectives: to solve equations with the variable on both sides.

Solve Multi-step Equations (var. both sides) Students will solve multi-step equations with variables on both sides using distributive property, combining.

Math Journal 9-29

2.4 Solving Equations with Variables on Both Sides

Objective The student will be able to: solve equations using multiplication and division. Designed by Skip Tyler, Varina High School.

Step 1: Simplify Both Sides, if possible Distribute Combine like terms Step 2: Move the variable to one side Add or Subtract Like Term Step 3: Solve for.

Calculations with Percents

Today’s Date: 9/13/ Solving Inequalities in 1 Variable & 2.2 Solving Combined Inequalities.

5.3 Solving Systems using Elimination

Fractions, Decimals, and Percents. Percents as Decimals To write a percent as a decimal, divide by 100 and remove the percent symbol. Example 1: 63% 63.

Sec. 9-4: Rational Expressions. 1.Rational Expressions: Expressions (NOT equations that involve FRACTIONS). We will be reducing these expressions NOT.

Chapter 1 - Fundamentals Equations. Definitions Equation An equation is a statement that two mathematical statements are equal. Solutions The values.

Math 021.  An equation is defined as two algebraic expressions separated by an = sign.  The solution to an equation is a number that when substituted.

Warm Up Find the number to make the equation true 1) ___+ 9 = 14 2) ___+27= 35 3) ___-19 = 124) 11-___= 19 Simplify each expression 5) -2(3x-8)6) 8x –

Linear Equations with Fractions

Section 2.1 Linear Equations in One Variable. Introduction A linear equation can be written in the form ax = b* where a, b, and c are real numbers and.

Unit 4 Day 4. Parts of a Fraction Multiplying Fractions Steps: 1: Simplify first (if possible) 2: Then multiply numerators, and multiply denominators.

Linear Equations  Know your rules for solving equations  If fractions, multiply through by LCD  Distribute values to parentheses  What you do on one.

4.8 – Solving Equations with Fractions

Solving Multi-step Equations by Combining Like Terms and with Variables on Both Sides.

Multiplying Fractions. When we multiply a fraction by an integer we: multiply by the numerator and divide by the denominator For example, × = 54.

Multi-Step Equations We must simplify each expression on the equal sign to look like a one, two, three step equation.

One-Step Equations Using Opposite Operations. When working to get the variable isolated and all alone, use the opposites rule. Opposites Rule – to get.

Algebra 1 Chapter 2 Section : Solving One-Step Equations An equation is a mathematical statement that two expressions are equal. A solution of an.

Solving Rational Equations

Objective The student will be able to: solve equations using multiplication and division.

Lesson 1-5: Solving Equations

Solving Equations with Variables on both sides

Solve Fraction Equations. Designed by Skip Tyler, Varina High School EQ: How do we solve equations of fractions using multiplication and division.

ANSWER is 25% of what number ANSWER 40% 4.What percent of 90 is 36? ANSWER d = 4 ANSWER x = Solve:

October 31 st copyright2009merrydavidson. Simplifying Rational Expressions What is the difference between a factor and a term? TERMS are separated by.

8.8 Solving Multi-Step Equations and Inequalities.

Fractions Just the basics. Fractions This is the easiest operation! 1. Multiply the numerators. 2. Multiply the denominators. 3. Simplify if necessary.

1) Solve. -5t = 60 To get the variable by itself, which number needs to be moved? -5 To move the -5, you have to do the opposite operation. What operation.

Lesson 3.2 Solving Equations with Multiplication and Division

Solving Multi-Step Equations Containing Fractions Title.

Section 1-3: Solving Equations

My Equations Booklet.

Solving Equations with Variables on Both Sides

Multiplying Fractions

9.6 Solving Rational Equations

10 Real Numbers, Equations, and Inequalities.

Objective The student will be able to:

Objective The student will be able to:

Objective Solve equations in one variable that contain more than one operation.

CHAPTER 3 - Percent Section 3.1

Objective The student will be able to:

1.3 Solving Linear Equations

Linear Equations in One Variable

- Finish Unit 1 test - Solving Equations variables on both sides

Objective Solve equations in one variable that contain more than one operation.

Solving Rational Equations

Solving Multiplication Equations

Rational Equations.

Which fraction is the same as ?

How do I solve a proportion?

3.2 Multiplication Property of Equality

Solve equations using multiplication and division.

Objective The student will be able to:

Solving Equations Involving Fractions

Warm-up: Solve for x. Hint, factor first!.

If an equation contains fractions, it may help to multiply both sides of the equation by the least common denominator (LCD) to clear the fractions before.

Solving Multi-Step Equations Containing Fractions Title.

Solving Equations with Fractions

Algebraic Expressions & Solving Equations

Presentation transcript:

Title

The easiest way to solve a fraction equation is to first get rid of the fraction !!! Multiply each term by the common denominator!! This will cancel the denominator, leaving just numerators!! h has a denominator of one, so just multiply 14 times h. Ex. 1

First, multiply each term by the common denominator!! This will cancel the denominator, leaving just numerators!! m has a denominator of one, so just multiply 8 times m. Ex. 2

Even though the problem looks different, follow the same steps. First, multiply each term by the common denominator!! -2 and 8 have a denominator of one, so just multiply (-2)(9) and (8)(9). Ex. 3

First, multiply each term by the common denominator!! -2 and 4 have a denominator of one, so just multiply (-2)(5) and (4)(5). Ex. 4

The problem looks different again but still follow the same steps. First, multiply each term by the common denominator!! What is it? NOW, divide 3 into 12. This will cancel the 3. This will give you 4. Now multiply 4(-2). Ex. 5

First, multiply each term by the common denominator!! What is it? 3 will go into 12, 4 times. (4)(-1) = 2 will go into 12, 6 times. (6)(1) = Ex. 6

Separate the double fraction then use same steps as before!! The x – 8 becomes x + -8 when we separate the fractions. Now multiply by LCD. Fix your signs back. Now solve for “x” Ex. 7

Separate the double fraction AND fix your double sign. Ex. 8

Ex. 9 With this type of problem you will FIRST distribute, THEN separate. Get rid of the LCD. What is it? 5(11) = 55

Ex. 10 USE THESE STEPS First Distribute Separate Multiply by LCD Solve

Ex. 11 USE THESE STEPS Separate Multiply by LCD Solve What happened to the variables? The variables cancelled each other out. The statement left says 1 = 20. IS THAT TRUE OR FALSE? If the statement had been TRUE, the answer would have been ALL REAL NUMBERS