Multi-Step and Compound Inequalities
Multi-Step and Compound Inequalities
Solving multi-step inequalities is very similar to solving multi-step equations. You will use the exact same algebraic techniques: distributing, combining like terms, and moving variables to isolate your unknown. However, there is one critical rule you must always remember when dealing with inequalities.
The Golden Rule of Inequalities
Whenever you multiply or divide both sides of an inequality by a negative number, you must flip the inequality sign.
- < becomes >
- โค becomes โฅ
If you are just adding or subtracting, or if you multiply/divide by a positive number, the sign stays exactly the same.
Steps to Solve Multi-Step Inequalities
- Distribute to remove any parentheses.
- Combine like terms on each side of the inequality.
- Move all variables to one side (usually the left) by adding or subtracting.
- Isolate the variable using addition, subtraction, multiplication, or division. (Remember the Golden Rule!)
Example Problems
Example 1: Variables on Both Sides with Distribution
Solve: 3(xโ2)>x+4
Step 1: Distribute the 3. 3xโ6>x+4
Step 2: Subtract x from both sides to group the variables. 2xโ6>4
Step 3: Add 6 to both sides. 2x>10
Step 4: Divide by 2. Since 2 is positive, keep the sign the same. x>5
Example 2: Flipping the Inequality Sign
Solve: โ2x+5โค3xโ10
Step 1: Subtract 3x from both sides. โ5x+5โคโ10
Step 2: Subtract 5 from both sides. โ5xโคโ15
Step 3: Divide by โ5. Since we are dividing by a negative number, flip the sign! xโฅ3
Example 3: Combining Like Terms
Solve: 2(x+3)โxโฅ7
Step 1: Distribute the 2. 2x+6โxโฅ7
Step 2: Combine like terms (2xโx). x+6โฅ7
Step 3: Subtract 6 from both sides. xโฅ1
A Note on Compound Inequalities
A compound inequality consists of two separate inequalities joined by the words "and" or "or".
- AND inequalities (e.g., โ2<xโค5) mean the solution must satisfy both conditions. The solution is the overlapping region between the two.
- OR inequalities (e.g., x<โ1 or x>3) mean the solution satisfies at least one condition. The graph typically points outward in opposite directions.
You solve compound inequalities using the exact same multi-step rules, just applied to multiple parts simultaneously!