Textbook Question
Determine whether each statement is true or false. If the statement is false, make the necessary change(s) to produce a true statement. The ordered pair (2, 5) satisfies 3y - 2x = - 4.
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Ch. 1 - Equations and Inequalities
Blitzer8th EditionCollege AlgebraISBN: 9780136970514
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Table of contents
- Ch. P - Fundamental Concepts of Algebra311
- Ch. 1 - Equations and Inequalities398
- Ch. 2 - Functions and Graphs407
- Ch. 3 - Polynomial and Rational Functions306
- Ch. 4 - Exponential and Logarithmic Functions247
- Ch. 5 - Systems of Equations and Inequalities173
- Ch. 6 - Matrices and Determinants143
- Ch. 7 - Conic Sections124
- Ch. 8 - Sequences, Induction, and Probability251
Chapter 2, Problem 75
In Exercises 59–94, solve each absolute value inequality. |(2x + 2)/4| ≥ 2
Verified step by step guidance1
Start by understanding that the inequality involves an absolute value expression: \(\left| \frac{2x + 2}{4} \right| \geq 2\). The absolute value inequality \(|A| \geq B\) means that either \(A \geq B\) or \(A \leq -B\).
Set up two separate inequalities based on the definition of absolute value:
1) \(\frac{2x + 2}{4} \geq 2\)
2) \(\frac{2x + 2}{4} \leq -2\)
Solve the first inequality: Multiply both sides by 4 to eliminate the denominator, giving \(2x + 2 \geq 8\). Then isolate \(x\) by subtracting 2 from both sides and dividing by 2.
Solve the second inequality similarly: Multiply both sides by 4 to get \(2x + 2 \leq -8\). Then isolate \(x\) by subtracting 2 from both sides and dividing by 2.
Combine the solutions from both inequalities to express the solution set for \(x\). Remember, the solution is all \(x\) values that satisfy either inequality.
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Key Concepts
Here are the essential concepts you must grasp in order to answer the question correctly.
Absolute Value Inequalities
Absolute value inequalities involve expressions where the absolute value of a variable or expression is compared to a number. To solve them, consider the definition of absolute value as distance from zero, leading to two cases: one where the expression inside is greater than or equal to the positive value, and one where it is less than or equal to the negative value.
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Properties of Inequalities
When solving inequalities, it is important to remember that multiplying or dividing both sides by a negative number reverses the inequality sign. Also, inequalities can be split into compound inequalities when dealing with absolute values, requiring careful handling of each case to find the solution set.
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Solving Linear Inequalities
Solving linear inequalities involves isolating the variable on one side using algebraic operations such as addition, subtraction, multiplication, or division. The solution is often expressed as an interval or union of intervals, representing all values that satisfy the inequality.
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Related Practice
Textbook Question
In Exercises 61–76, solve each absolute value equation or indicate that the equation has no solution. |2x - 1| + 3 = 3
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Textbook Question
Solve each equation by the method of your choice.
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Textbook Question
In Exercises 71–78, solve each equation. Then determine whether the equation is an identity, a conditional equation, or an inconsistent equation. 4(x + 5) = 21 + 4x
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Textbook Question
Exercises 73–75 will help you prepare for the material covered in the next section. Simplify: √18 - √8
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Textbook Question
In Exercises 71–78, solve each equation. Then determine whether the equation is an identity, a conditional equation, or an inconsistent equation. 10x + 3 = 8x + 3
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