Warm-up Determine the x-intercept (s) and y-intercept from the graph below. Determine what this viewing rectangle illustrates. 2. [-20, 40, 5] by [-10,

Slides:

Advertisements

Similar presentations

Solve an equation with variables on both sides

Advertisements

2.1 – Linear Equations in One Variable

Linear Equations in One Variable Objective: To find solutions of linear equations.

1.1 Linear Equations A linear equation in one variable is equivalent to an equation of the form To solve an equation means to find all the solutions of.

2.8 - Solving Equations in One Variable. By the end of today you should be able to……. Solve Rational Equations Eliminate Extraneous solutions Solve Polynomial.

© 2010 Pearson Prentice Hall. All rights reserved. CHAPTER 6 Algebra: Equations and Inequalities.

Mathematics for Business and Economics - I

An equation is a mathematical statement that two expressions are equivalent. The solution set of an equation is the value or values of the variable that.

Section 1Chapter 2. 1 Copyright © 2012, 2008, 2004 Pearson Education, Inc. Objectives Linear Equations in One Variable Distinguish between expressions.

( ) EXAMPLE 3 Standardized Test Practice SOLUTION 5 x = – 9 – 9

Solving Rational Equations

Linear Equations in One variable Nonlinear Equations 4x = 8 3x – = –9 2x – 5 = 0.1x +2 Notice that the variable in a linear equation is not under a radical.

EXAMPLE 2 Rationalize denominators of fractions Simplify

Warm-up Given these solutions below: write the equation of the polynomial: 1. {-1, 2, ½)

Warm-up: Thursday 8/17/12 Simplify the rational expression and state excluded values.  Double check factors! HW P6C (#33-40, all)

3-2 Solving Equations by Using Addition and Subtraction Objective: Students will be able to solve equations by using addition and subtraction.

§ 2.8 Solving Linear Inequalities. Martin-Gay, Beginning and Intermediate Algebra, 4ed 22 Linear Inequalities in One Variable A linear inequality in one.

Warm-Up Solve the linear inequality. 1. 2(x+4) > x x+7 ≤ 4x – 2 Homework: WS 1.7B Pg. 175 (63-85 odds) Answers: 1. x > x > 1.

Chapter 12 Final Exam Review. Section 12.4 “Simplify Rational Expressions” A RATIONAL EXPRESSION is an expression that can be written as a ratio (fraction)

1.4 Solving Linear Equations. Blitzer, Algebra for College Students, 6e – Slide #2 Section 1.4 Linear Equations Definition of a Linear Equation A linear.

2-1 Solving Linear Equations and Inequalities Warm Up

10-7 Solving Rational Equations Warm Up Warm Up Lesson Presentation Lesson Presentation California Standards California StandardsPreview.

Complete Solutions to Practice Test What are the solutions to the quadratic equation  A. 3, 6  B. 6, 6  C. 3, 12  D. 4, 9  E. -4, -9 Factor.

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 –

Chapter 2 Copyright © 2015, 2011, 2007 Pearson Education, Inc. Chapter Copyright © 2015, 2011, 2007 Pearson Education, Inc. Chapter 2-1 Solving Linear.

Rational Equations Section 8-6.

Holt Algebra Solving Linear Equations and Inequalities Section 2.1 Solving Linear Equations and Inequalities.

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.

Warm-Up 8/20/12 Add or Subtract the following: 1) 2) Answers: Homework: HW P6C (#41-53 odds)

1.5 Solving Inequalities. Write each inequality using interval notation, and illustrate each inequality using the real number line.

Solve the following equations for x: 1) 2) 3) 4) 5) 6)

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

© 2010 Pearson Prentice Hall. All rights reserved. CHAPTER 6 Algebra: Equations and Inequalities.

1.4 Solving Multi-Step Equations. To isolate the variable, perform the inverse or opposite of every operation in the equation on both sides of the equation.

Chapter 6 Section 6 Solving Rational Equations. A rational equation is one that contains one or more rational (fractional) expressions. Solving Rational.

Solving Rational Equations

Solve Linear Systems by Substitution January 28, 2014 Pages

Lesson 1-5: Solving Equations

1. solve equations with variables on both sides. 2. solve equations with either infinite solutions or no solution Objectives The student will be able to:

Chapter 1 Equations and Inequalities Copyright © 2014, 2010, 2007 Pearson Education, Inc Linear Equations and Rational Equations.

Lesson 11-5 Warm-Up.

9-6 SOLVING RATIONAL EQUATIONS & INEQUALITIES Objectives: 1) The student will be able to solve rational equations. 2) The student will be able to solve.

Graphing Linear Inequalities 6.1 & & 6.2 Students will be able to graph linear inequalities with one variable. Check whether the given number.

Equations with fractions can be simplified by multiplying both sides by a common denominator. 3x + 4 = 2x + 8 3x = 2x + 4 x = 4 Example: Solve

Solving Equations with Variables on Both Sides. Review O Suppose you want to solve -4m m = -3 What would you do as your first step? Explain.

1.2 Linear Equations and Rational Equations. Terms Involving Equations 3x - 1 = 2 An equation consists of two algebraic expressions joined by an equal.

Warm-up #12 ab 1 3x  1814x  x > 32-5x < x  -3 7x > x < x  -24.

Holt Algebra Solving Rational Equations Warm Up 1. Find the LCM of x, 2x 2, and Find the LCM of p 2 – 4p and p 2 – 16. Multiply. Simplify.

Chapter 2 Linear Equations and Inequalities in One Variable.

§ 2.3 Solving Linear Equations. Martin-Gay, Beginning and Intermediate Algebra, 4ed 22 Solving Linear Equations Solving Linear Equations in One Variable.

Objectives The student will be able to:

Solving Equations with the Variable on Each Side

Copyright © 2014, 2010, 2007 Pearson Education, Inc.

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

Solving Equations with Variables on Both Sides

Copyright © 2014, 2010, 2007 Pearson Education, Inc.

EQUATIONS & INEQUALITIES

( ) EXAMPLE 3 Standardized Test Practice SOLUTION 5 x = – 9 – 9

Find the least common multiple for each pair.

Linear Equations and Absolute Value Equations

Lesson 3.1 How do you solve two-step equations?

Find the least common multiple for each pair.

Warmups Simplify 1+ 2

Chapter 2 Section 1.

Copyright © 2014, 2010, 2007 Pearson Education, Inc.

Algebra 1 Section 13.6.

Chapter 2 Section 1.

Algebra: Equations and Inequalities

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 Equations with Fractions

Presentation transcript:

Warm-up Determine the x-intercept (s) and y-intercept from the graph below. Determine what this viewing rectangle illustrates. 2. [-20, 40, 5] by [-10, 30, 2] 3. Solve this equation: 4x + 5 = 29 Homework: pg. 104, (1-45 odds) Problems 10-14 must show checking your answer.

Answers: 1. x-intercepts = (3,0) and (-7,0) y-intercept = (0,21) it’s a reflection 2. The x window’s min is at -20, max at 40 increasing in increments of 5. The y window’s min is at -10, max at 30 increasing in increments of 2. 3. x = 6

Announcements: Ch 1 Learning Goal: The student will be able to understand functions by solving and graphing all types of equations and inequalities. Today’s Objective: Be able to solve a rational equations with variables

Lesson 1.2A Linear Equations and Rational Equations A linear equation in one variable x is an equation that can be written in the form of ax + b = 0, where a and b are real numbers and a 0.

Steps for Solving a Linear Equation: 1. Simplify the algebraic expression on each side by removing grouping symbols and combining like terms. 2. Collect all the variable terms on one side and all the numbers, or constant terms, on the other side. 3. Isolate the variable and solve. 4. Check the proposed solution in the original equation.

Example 1: Solving a Linear Equation Involving Fractions Given. Find LCD. Solve by Distributive Property and combine like terms. 3(x+2)-4(x-1)=24 3x +6-4x+4 = 24 -x = 14 Solve and check. x = -14

You try these: 4(2x +1) = 29 + 3(2x -5) Answers: x = 5, x=1

Example 2: 10 = 2x +15 x = -5/2 You Try: Answer: x = 3

Example 3: Solving Rational Equations Write problem. Objective – try to clear fractions. Multiply both sides by (x-3) to cancel it out on the left side Distribute the (x-3) on the right side Cross out the (x-3) to get rid of them in denominators

Example Continued X = 3 + 9(x-3) X = 3 + 9x – 27 X = 9x – 24 -8x = -24 X = 3 Simplify Distribute the 9 Subtract 3 and -27 Subtract 9x from both sides Divide by -8. Unfortunately not a solution because of the excluded values. The solution is an empty set, 0 .

You Try! Write problem Multiply both sides by 3(x-2) Distribute the 3(x-2) to the right side Cancel out any 3(x-2) Multiply

Distribute the negative Solve for x Distribute the negative Solve for x. Not a solution because of the excluded values. The solution is an empty set, 0

Summary: What is a rational equation Summary: What is a rational equation? Give an example of this type of equation. Homework: WS1.1 pg. 104, (1-45 odd) Problems 10-14 must show checking your answer.