Practice B. Solving Rational Equations and Inequalities. Solve each equation. .1 x. 6 __ x. 5 .2 15. ___. 4. 6 __ x. 3 .3 x. 3 __ x. 2 .4. 4. ______ x 2. 4. 1.
Skills Practice Solving Rational Equations and Inequalities. NAME. D. A. TE. PERIOD. _____. Lesson 8
Practice. Solving Rational Equations and Inequalities. Solve each equation or inequality. Check your solutions. 1. 12 3. +. 3. 16 x. 4. 2. 3. p + 10. 4 p2. 2. 2
Practice A. Solving Rational Equations and Inequalities. Find the least common denominator (LCD) for each pair. 1. x and. 3 x. 2. -. 3. 6 x and. 4 x. 3. x2 and
PERIOD. NAME. 9-6 Skills Practice. DATE. Mar. Solving Rational Equations and Inequalities. Solve each equation or inequality. Check your solutions.
Rational Equations and Inequalities. A Rational Pastime. Lesson 30-1 Solving Rational Equations LESSON 30-1 PRACTICE. For Items 18-21 solve each equation ...
Nov 2 2016 Practice. Solving Rational Equations and Inequalities. Solve each equation or inequality. Check your solutions. 12 3. 1. + x. = 4. 3/2. 2. X x 1.
list some of the multiple solution strategies available for solving quadratic equations and linear equations. Solving in Grades 4 Through 8 practice guide ...
https://www.math.wsu.edu/faculty/scooper/M106F2011/M106-LS-F2011_Exam1StudyGuide.pdf
Oct 16 2015 3/30/1-. Page 4. C. LESSON Practice B. 5-5. Solving Rational Equations and Inequalities. Solve each equation. 6. = 6. +3. X. 1. x. 5. LCD: X.
Holt Algebra 2. All rights reserved. Name. Date. Class. LESSON. 8-5. Practice B. Solving Rational Equations and Inequalities. Solve each equation.
1. Distribute copies of the attached Solving Rational Equations: Introductory Exercise handout and have students complete it
Skills Practice Multiplying and Dividing Rational Expressions. Chapter 8 Study Guide and Intervention Solving Rational Equations and Inequalities. 8-6.
In addition to solving linear equations we'll use the skills we develop to solve for a specified variable in a formula
Rational Equations and Inequalities. A Rational Pastime. Lesson 30-1 Solving Rational Equations. Learning Targets: Solve rational equations identifying any
Solve rational inequalities. Follow-Up). Follow-Up: Solving Rational Equations by Graphing. Study Guide and Practice Test (pp. 513–517).
Solve each equation. Check your solution. Give exact answers. 1. 2. 3. 4. 5. 6. 7. 8. 9. 10. Solve each inequality. Check your solution. Give exact answers.
Solving Rational Equations and Inequalities. Find the least common denominator (LCD) Solve. 12. List all of the extraneous solutions for the equation.
Solve each inequality. Check your solutions. 12. SOLUTION: The excluded value for this inequality is 0. Solve the related equation.
Solving Rational Equations Date_____ Period____ Solve each equation Remember to check for extraneous solutions 1) 1 6 k2 = 1 3k2 ? 1 k {1 6} 2) 1 n2 + 1 n = 1 2n2 {? 1 2} 3) 1 6b2 + 1 6b = 1 b2 {5} 4) b + 6 4b2 + 3 2b2 = b + 4 2b2 {4} 5) 1 x = 6 5x + 1 {? 1 5} 6) 1 6x2 = 1 2x + 7 6x2 {?2} 7) 1 v + 3v + 12 v2 ? 5v = 7v ? 56 v2 ?
Steps for solving rational equations with the same denominator Step 1 Determine the excluded values of the equation Step 2 Clear denominators by multiplying each term by the lowest common denominator Step 3 Solve the equation Step 4 Verify that the solutions obtained are not an excluded value MEDIA LESSON
Solving Rational Equations and Inequalities To solve a rational equation clear any denominators by multiplying eachterm on both sides of the equation by the least common denominator LCD Solve: x ___12 x 7 Step 1 Step 2 The LCD is x Multiply each term by x x ___12 x Simplify 2x 7x 12 7x
11) Write a rational inequality with the solution: ( )?( ) ©l d2G0O1j6w cKluptian [SRoFfWtUwaaQrOeF aLdLdCZ ^ B rAglolx `r_iCgXhctIsH yrgeqsge_rXvPeQdt W y aMXaCdEe` RwliLt]hr ^IXnifgiynTiOtFeM gPHrXeAcIaElxcdu`lNu`sR
12–6 Solving Inequalities Involving 15–6 Solving Rational Equations 96 Student Edition Pages 4–7 NAME DATE PERIOD 1–1 Practice
7 7 Practice - Solving Rational Equations Solve the following equations for the given variable: 1) 3x ?1 2 ?1 x =0 3) x +20 x ? 4 =5x x?4 ? 2 5) x +6 x ? 3 =2x x? 3 7)2x 3x ? 4 =4x +5 6x ? 1 ?3 3x ? 4 9)3m 2m? 5 ?7 3m+1 =3 2 11)4? x 1 ?x =12 3 ? x 13)7 y? 3 ?1 2 =y? 2 y? 4 15)1 x +2 ?1 2 ? x =3x +8 x2? 4 17)x +1 x ? 1 ?x ? 1 x +1 =5 6 19)3 2x +1