Two-Step Expressions
Understanding Two-Step Expressions and Order of Operations
When you see a math problem with more than one operationâlike addition and multiplication togetherâhow do you know which one to do first? To get the right answer, mathematicians use a special set of rules called the Order of Operations.
The Rules for Order of Operations
When solving two-step expressions, always follow this order:
- Parentheses
( ): Always solve whatever is inside the parentheses first. - Multiplication
\timesand Division\div: Do these next. - Addition
+and Subtraction-: Do these last.
If you have operations of the same level (like addition and subtraction), just work from left to right.
Step-by-Step Examples
Let's look at a few examples to see how this works in action.
Example 1: Multiplication Before Addition
Evaluate: 3+4Ã2
- Step 1: Look for multiplication or division. We have 4Ã2.
- Step 2: Multiply first: 4Ã2=8.
- Step 3: Rewrite the expression with the new number: 3+8.
- Step 4: Add: 3+8=11.
Warning: If you added 3+4 first to get 7, and then multiplied by 2, you would get 14. That is incorrect! Always multiply before you add.
Example 2: Parentheses Always Go First
Evaluate: 5Ã(6â2)
- Step 1: Look for parentheses. We have (6â2).
- Step 2: Subtract inside the parentheses first: 6â2=4.
- Step 3: Rewrite the expression: 5Ã4.
- Step 4: Multiply: 5Ã4=20.
Even though multiplication usually comes before subtraction, parentheses have the highest priority!
Example 3: Multiplication Before Subtraction
Evaluate: 20â3Ã5
- Step 1: Look for multiplication. We see 3Ã5.
- Step 2: Multiply first: 3Ã5=15.
- Step 3: Rewrite the expression: 20â15.
- Step 4: Subtract: 20â15=5.
Quick Summary
To solve two-step expressions perfectly every time, just remember: Parentheses first, then Multiply/Divide, then Add/Subtract.