Absolute value inequalities do not have any special rules.

Absolute value inequalities use different symbols.

Absolute value inequalities require considering both positive and negative solutions.

Absolute value inequalities are solved using only addition and subtraction.

The maximum value of K.

The distance from zero on the number line.

The minimum value of K.

The midpoint of the inequality.

K must be exactly 8.

K must be between -8 and 8.

K must be less than -8 or greater than 8.

K can be any number greater than 8.

An 'and' statement.

A 'but' statement.

An 'or' statement.

A 'not' statement.

K must be exactly 8.

K can be any number less than 8.

K must be less than -8 or greater than 8.

K must be between -8 and 8.

-7.6 ≤ X ≤ 7.6

X ≤ -7.6 or X ≥ 7.6

-10.4 ≤ X ≤ 2.8

X ≤ -10.4 or X ≥ 2.8

Multiply both sides by 5 and solve for X.

Divide both sides by 5 and solve for X.

Add 5 to both sides and solve for X.

Subtract 5 from both sides and solve for X.

-2 < X < 22

X < -12 or X > 2

-12 < X < 2

X < -2 or X > 22

The solution is X = -7.

The solution is X = 21.

The solution is all real numbers.

There is no solution.

All real numbers.

No solution.

X = 33.

X = -24.