Grade-2 : Math-2 : 1 : : Subtraction

Subtraction: Taking Away and Finding Differences

Subtraction is one of the four basic operations in mathematics. It means taking away or finding the difference between two numbers. When we subtract, we start with a bigger number (called the minuend) and take away a smaller number (called the subtrahend). The result we get is called the difference.

Subtraction is used every day in real life. When you spend money from your allowance, eat cookies from a jar, or give away some of your toys, you're using subtraction. Understanding how to subtract helps you solve problems about what's left, how many more you need, or how much difference there is between two amounts.

The Subtraction Symbol

The minus sign − tells us to subtract. It's a horizontal line that looks like a dash. For example, 8 - 3 = 5 means we start with 8 and take away 3, leaving us with 5. We read this as "eight minus three equals five."

In subtraction problems, the first number (8) is what we start with, the second number (3) is what we take away, and the answer (5) is what remains. The equals sign = shows that both sides have the same value.

Visualizing Subtraction

Let's see subtraction with a picture. If you have 8 apples and used 3 apples for making a pie, you will be left with 5 apples:

Visual models help us understand what happens when we subtract. We can cross out or remove the items being taken away, and count what's left. This concrete representation makes abstract numbers easier to understand, especially when learning subtraction for the first time.

Number Line Model

We can also use a number line to subtract. A number line is like a ruler that shows numbers in order. To subtract using a number line, start at the bigger number and jump backward by the amount you're subtracting.

Example: 10 - 4 = ?

We started at 10 and jumped back 4 times (one jump for each number we subtract), landing on 6. So 10 - 4 = 6. Number lines help us see subtraction as moving backward or to the left, which is the opposite direction from addition.

Subtraction Strategies

There are several strategies students can use to solve subtraction problems. Different strategies work better for different problems, and learning multiple approaches builds mathematical flexibility.

1. Counting Back: This is often the first strategy young students learn. Start at the bigger number and count backward, keeping track on your fingers or out loud. - 9 - 2 = ? → Start at 9: "8, 7" → Answer: 7 - 13 - 3 = ? → Start at 13: "12, 11, 10" → Answer: 10

Counting back works best when subtracting small numbers (1, 2, or 3). For larger numbers, other strategies are more efficient.

2. Using Ten Frames: Ten frames are rectangular grids with ten spaces that help students visualize quantities and see relationships between numbers.

Green squares show what we keep, pink squares show what we take away. Ten frames make it easy to see how many remain without counting each one individually.

3. Think Addition: Because addition and subtraction are related operations, you can think of an addition fact to help solve a subtraction problem. This strategy is sometimes called "using fact families." - 11 - 4 = ? → Think: "4 plus what equals 11?" → 4 + 7 = 11, so 11 - 4 = 7

4. Making Ten: For problems that cross ten (like 13 - 5), break the problem into parts that make ten, then subtract the rest. - 13 - 5 = ? → First subtract 3 to get to 10 (13 - 3 = 10), then subtract 2 more (10 - 2 = 8) - Breaking problems into friendlier numbers makes calculations easier

Real-World Applications

Subtraction appears in many everyday situations:

Shopping: You have $10 and spend $6. How much do you have left? (10 - 6 = 4)
Food: There are 12 cookies and you eat 4. How many cookies remain? (12 - 4 = 8)
Games: You score 15 points, but lose 7 points. What's your score now? (15 - 7 = 8)
Time: The movie starts in 20 minutes, and you've already waited 12 minutes. How many more minutes until it starts? (20 - 12 = 8)

Recognizing subtraction situations in real life helps students understand when to use this operation and makes math meaningful beyond paper-and-pencil exercises.

Subtraction Vocabulary

Understanding the words used in subtraction helps students recognize when to subtract:

Take away: "You had 9 stickers and gave away 4"
Difference: "What's the difference between 10 and 6?"
How many more/less: "Jane has 8 marbles and Tom has 5. How many more does Jane have?"
How many are left: "There were 14 birds and 6 flew away. How many are left?"

These key words signal subtraction situations and help students translate word problems into number sentences.

Common Mistakes to Avoid

Subtracting in the wrong order: Always subtract the smaller number from the bigger number (unless working with negative numbers, which comes in later grades)
Wrong: 5 - 9 (can't do this with whole numbers)
Right: 9 - 5 = 4
Forgetting which number comes first: In 12 - 5, the 12 is what you start with, not 5
Not checking the answer: Always verify your subtraction by adding the answer to what you subtracted. If 15 - 8 = 7, then 7 + 8 should equal 15

Building Fluency

Becoming fluent in subtraction takes practice and repeated exposure. Here are ways to build subtraction skills:

Practice subtraction facts within 20 regularly until you can recall them automatically
Use flashcards or math games to make practice engaging
Look for patterns in subtraction (like subtracting 0 leaves the number unchanged, or subtracting 1 gives you the number before)
Connect subtraction to addition facts you already know

Practice Tips

Start with small numbers (subtracting within 10) and work your way up to larger numbers
Use objects like blocks, coins, or buttons to make it concrete and touchable
Draw pictures to represent problems visually before solving
Think of real situations like sharing candy, spending money, or counting down days
Check your work by adding: If 12 - 5 = 7, then 7 + 5 should equal 12! This reverse operation confirms your answer is correct

Looking Ahead

Mastering basic subtraction within 20 prepares students for more advanced subtraction with larger numbers, subtraction with regrouping (borrowing), and eventually working with decimals and fractions. Strong subtraction skills also support algebraic thinking, where students solve for unknown numbers in equations. The strategies learned now will continue to be useful throughout elementary school and beyond.