Linear Inequalities
Linear Inequalities
Solving a linear inequality is similar to solving a linear equation. The only difference is that when you multiply or divide both sides by a negative number, you must change the direction of the inequality.
6 > 4
-1(6) < -1(4)
-6 < -4
To graph an inequality, mark its position and direction on a number line.
x < 3
The open circle indicates that the value of 3 is not part of the inequality.
x ≤ 3
The closed circle now indicates that the value of 3 is part of the inequality.
To express an inequality in interval notation:
- Include the span of numbers included in the group from left to right, separated by a comma.
- Use parenthesis next to a number that is excluded from the group. Use a bracket when the number is included in the group.
- Use the infinity or negative infinity symbols to denote when the group goes on indefinitely. Always use round parentheses symbols with infinity.
x < 3
(-∞, 3)
x ≤ 3
(-∞, 3]
Example
7 − 4x ≤ -13
As you would with an equation, add or subtract terms to get all variables on one side and all constants on the other.
7 − 4x − 7 ≤ -13 − 7
-4x ≤ -20
Now divide both sides by the coefficient of x. (Careful, the coefficient in this example is negative!)
-4x ÷ -4 ≥ -20 ÷ -4
