Adding and Subtracting Integers
Adding and Subtracting Integers
Working with positive and negative integers becomes easy once you understand a few simple rules. You can think of positive numbers as having money, and negative numbers as owing money, or you can use a number line to visualize the math.
Adding Integers
When adding integers, look at their signs to decide what to do:
1. Same Signs (Both Positive or Both Negative)
- Rule: Add their absolute values (the numbers without the signs) and keep the original sign.
- Example: 5+4=9
- Example: â3+(â6)=â9
2. Different Signs (One Positive, One Negative)
- Rule: Subtract the smaller absolute value from the larger absolute value. Then, keep the sign of the number that had the larger absolute value.
- Example: â8+5
- Subtract the absolute values: 8â5=3.
- Since â8 has a larger absolute value than 5, the answer is negative.
- Answer: â8+5=â3
- Example: 6+(â11)
- Subtract: 11â6=5.
- Keep the negative sign from the â11.
- Answer: 6+(â11)=â5
Subtracting Integers
Subtracting an integer is the exact same as adding its opposite. The rule is often remembered as "Keep, Change, Change":
- Keep the first number exactly the same.
- Change the subtraction sign to an addition sign.
- Change the sign of the second number to its opposite.
Mathematically, this is written as: aâb=a+(âb)
Let's look at an example:
- Problem: â15â(â8)
- Keep, Change, Change: Keep â15, change â to +, change â8 to 8.
- New Problem: â15+8
- Apply Addition Rules: Since the signs are different, subtract (15â8=7) and keep the sign of the larger absolute value (negative).
- Answer: â15â(â8)=â7
Using a Number Line
You can also solve these problems using a number line:
- Start at the first number.
- When adding a positive number (or subtracting a negative), move to the right.
- When adding a negative number (or subtracting a positive), move to the left.