Inequalities Involving Absolute Value Video Tutorial
video, absolute value video, absolute value inequalities video, inequalities video, solving absolute value inequalities video, solving inequalities video.
Watch Our Video Tutorials At Full Length
At TuLyn, we have over 2000 math video clips. While our guests can view a short preview of each video clip, our members enjoy watching them at full length.
Become a member to gain access to all of our video tutorials, worksheets and word problems.
Inequalities Involving Absolute Value
This math video tutorial gives a step by step explanation to a math problem on "Inequalities Involving Absolute Value".
Inequalities involving absolute value video involves , absolute value, absolute value inequalities, inequalities, solving absolute value inequalities, solving inequalities.
The video tutorial is recommended for 6th Grade, 7th Grade, 8th Grade, 9th Grade, and/or 10th Grade Math students studying Algebra, Pre-Algebra, and/or Pre-Calculus.
The absolute value of a real number is its numerical value without regard to its sign. So, for example, 3 is the absolute value of both 3 and −3.
The absolute value is closely related to the notions of magnitude, distance, and norm in various mathematical and physical contexts.
Absolute value of a number is the distance from the number on the number line to zero
|-7| = 7
| 7 | = 7
In mathematics, an inequality is a statement about the relative size or order of two objects, or about whether they are the same or not.
The notation a < b means that a is less than b.
The notation a > b means that a is greater than b.
The notation a ≠ b means that a is not equal to b, but does not say that one is greater than the other or even that they can be compared in size.
In each statement above, a is not equal to b. These relations are known as strict inequalities. The notation a < b may also be read as "a is strictly less than b". In contrast to strict inequalities, there are two types of inequality statements that are not strict:
The notation a ≤ b means that a is less than or equal to b (or, equivalently, not greater than b)
The notation a ≥ b means that a is greater than or equal to b (or, equivalently, not smaller than b)