Understanding Absolute Value Inequalities

Express it as a compound inequality

Use logarithmic functions

Convert it to a quadratic equation

Graph it directly on a number line

2x + 3 > 7 and 2x + 3 < -7

2x + 3 < 7 and 2x + 3 > -7

2x + 3 < 0 and 2x + 3 > 0

2x + 3 < 7 and 2x + 3 > 7

The union of the intervals

The solution to the inequality

The absolute value of the intervals

The midpoint of the intervals

A quadratic equation

A single inequality

A linear equation

Two inequalities connected by 'or'

3x - 1 = 0 and 3x - 1 = 5

3x - 1 > 5 and 3x - 1 < -5

3x - 1 < 5 and 3x - 1 > -5

3x - 1 = 5 and 3x - 1 = -5

x = 2

x = 4

x = 1

x = 3

[-4/3, ∞)

(-∞, -4/3]

(-4/3, ∞)

(-∞, -4/3)

The intersection of the intervals

The combined solution of the inequalities

The midpoint of the intervals

The absolute value of the intervals

A closed point at 2 with an arrow to the right

An open point at 2 with an arrow to the left

An open point at 2 with an arrow to the right

A closed point at 2 with an arrow to the left

It indicates the interval is open

It denotes the absolute value of the interval

It represents the midpoint of the interval

It shows the interval is closed