Absolute Value Inequalities

An absolute value inequality is an inequality that involves the absolute value of a variable, expressing a range of values that a variable can take based on its distance from a certain point.

If a variable x is within a distance d from a point a, it can be expressed as |x - a| < d.

It represents that x is within d units of a, including the endpoints, meaning a - d ≤ x ≤ a + d.

To solve |x - 6| ≤ 0.1, you set up the compound inequality: 6 - 0.1 ≤ x ≤ 6 + 0.1, which simplifies to 5.9 ≤ x ≤ 6.1.

The solution is x ≤ 5.9 or x ≥ 6.1, meaning x is either less than or equal to 5.9 or greater than or equal to 6.1.

The solution indicates the range of values that satisfy the inequality, showing how far a variable can deviate from a central value.

|x - a| < d means x is strictly within d units of a, while |x - a| ≤ d includes the endpoints, meaning x can be exactly d units away from a.

You graph the solution by marking the critical points on a number line and shading the appropriate region based on the inequality.

It implies that p is either less than or equal to -19 or greater than or equal to 7, as it represents values that are at least 13 units away from -6.

This compound inequality indicates that r can take any value between -1 and 9, not including -1 and 9.