Skip to main content
Ch. 1 - Equations and Inequalities
Lial - College Algebra 13th Edition
Lial13th EditionCollege AlgebraISBN: 9780136881063Not the one you use?Change textbook
All textbooksLial 13th EditionCh. 1 - Equations and InequalitiesProblem 62
Chapter 2, Problem 62

Solve each equation or inequality.
1.5x14<0 | 1.5x - 14| < 0

Verified step by step guidance
1
Understand the inequality \( |1.5x - 14| < 0 \). The absolute value \( |A| \) represents the distance of \( A \) from zero, which is always \( \geq 0 \).
Recall that the absolute value of any real number is never negative, so \( |1.5x - 14| < 0 \) means we are looking for values of \( x \) where the absolute value is less than zero.
Since absolute values cannot be negative, there are no real numbers \( x \) that satisfy \( |1.5x - 14| < 0 \).
Therefore, the solution set is empty, meaning no solution exists for this inequality.
In summary, inequalities of the form \( |expression| < 0 \) have no solutions because absolute values are always \( \geq 0 \).

Verified video answer for a similar problem:

This video solution was recommended by our tutors as helpful for the problem above.
Video duration:
39s
Was this helpful?

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 within absolute value bars, representing distance from zero. For inequalities like |A| < B, the solution requires B to be positive, and the expression A must lie between -B and B. Understanding how to interpret and manipulate these inequalities is essential for solving them.
Recommended video:
06:07
Linear Inequalities

Properties of Absolute Value

The absolute value of a number is always non-negative, meaning |x| ≥ 0 for any real x. This property implies that an absolute value expression cannot be less than zero, which is crucial when determining if an inequality has solutions or not.
Recommended video:
5:36
Change of Base Property

Solving Linear Inequalities

Solving linear inequalities involves isolating the variable on one side using algebraic operations while maintaining inequality direction. When combined with absolute value expressions, it requires careful consideration of the inequality's conditions to find valid solution sets or conclude no solution exists.
Recommended video:
06:07
Linear Inequalities
Related Practice
Textbook Question

In the metric system of weights and measures, temperature is measured in degrees Celsius (°C) instead of degrees Fahrenheit (°F). To convert between the two systems, we use the equations. C =5/9 (F-32) and F = 9/5C+32. In each exercise, convert to the other system. Round answers to the nearest tenth of a degree if necessary. 50°F

618
views
Textbook Question

Solve each equation. √(2x-5)=2+√(x-2)

514
views
Textbook Question

In the metric system of weights and measures, temperature is measured in degrees Celsius (°C) instead of degrees Fahrenheit (°F). To convert between the two systems, we use the equations. C =5/9 (F-32) and F = 9/5C+32. In each exercise, convert to the other system. Round answers to the nearest tenth of a degree if necessary. 20°C

686
views
Textbook Question

Solve each rational inequality. Give the solution set in interval notation. (6-x)/(x+2)>1

452
views
Textbook Question

Find each product. Write answers in standard form. (3+i)(3-i)

807
views
Textbook Question

Solve each equation. 4x⁴+3x²-1 = 0

669
views