Operations with Fractions - Seventh Grade
Addition, Subtraction, Multiplication & Division
1. Adding and Subtracting Fractions
Case 1: Same Denominator (Like Fractions)
When denominators are SAME:
Step 1: Add or subtract the NUMERATORS
Step 2: Keep the DENOMINATOR the same
Step 3: Simplify if possible
a/c ± b/c = a±b/c
Example: 5/8 + 2/8
5/8 + 2/8 = (5+2)/8 = 7/8
Answer: 7/8
Case 2: Different Denominators (Unlike Fractions)
When denominators are DIFFERENT:
Step 1: Find the LCD (Least Common Denominator)
Step 2: Convert both fractions to LCD
Step 3: Add or subtract numerators
Step 4: Keep the LCD as denominator
Step 5: Simplify if possible
Example: 1/4 + 1/6
Step 1: LCD of 4 and 6 = 12
Step 2: Convert to LCD
1/4 = 3/12 (multiply by 3/3)
1/6 = 2/12 (multiply by 2/2)
Step 3: Add: 3/12 + 2/12 = 5/12
Answer: 5/12
2. Adding and Subtracting Mixed Numbers
Method 1: Convert to Improper Fractions
Step 1: Convert both mixed numbers to improper fractions
Step 2: Find LCD and convert
Step 3: Add or subtract numerators
Step 4: Convert back to mixed number if needed
Example: 2 1/3 + 1 1/2
Step 1: Convert to improper fractions
2 1/3 = 7/3
1 1/2 = 3/2
Step 2: LCD = 6
7/3 = 14/6
3/2 = 9/6
Step 3: 14/6 + 9/6 = 23/6
Step 4: 23/6 = 3 5/6
Answer: 3 5/6
Method 2: Add/Subtract Separately
Step 1: Add or subtract whole numbers
Step 2: Add or subtract fractions (find LCD if needed)
Step 3: Combine whole number and fraction
Step 4: Simplify if needed
3. Multiplying Fractions
Multiplication Rule
NO need for common denominator!
Step 1: Multiply numerators together
Step 2: Multiply denominators together
Step 3: Simplify the result
a/b × c/d = a×c/b×d
Example: 2/3 × 3/4
Step 1: Multiply numerators: 2 × 3 = 6
Step 2: Multiply denominators: 3 × 4 = 12
Step 3: Result: 6/12
Step 4: Simplify: 6/12 = 1/2
Answer: 1/2
Multiplying Mixed Numbers
Step 1: Convert mixed numbers to improper fractions
Step 2: Multiply as usual
Step 3: Convert back to mixed number if needed
Example: 2 1/2 × 1 1/3
Convert: 2 1/2 = 5/2 and 1 1/3 = 4/3
Multiply: 5/2 × 4/3 = 20/6
Simplify: 20/6 = 10/3 = 3 1/3
Answer: 3 1/3
4. Multiplicative Inverses (Reciprocals)
Definition
The reciprocal of a fraction is found by
FLIPPING the numerator and denominator
• When you multiply a number by its reciprocal, you get 1
Reciprocal of a/b = b/a
a/b × b/a = 1
Examples
| Number | Reciprocal | Product |
|---|---|---|
| 3/4 | 4/3 | 3/4 × 4/3 = 1 |
| 5 | 1/5 | 5 × 1/5 = 1 |
| 2 1/2 = 5/2 | 2/5 | 5/2 × 2/5 = 1 |
5. Dividing Fractions
Keep-Change-Flip Method (KCF)
KEEP - CHANGE - FLIP
KEEP: Keep the first fraction the same
CHANGE: Change ÷ to ×
FLIP: Flip (take reciprocal of) the second fraction
Then multiply!
a/b ÷ c/d = a/b × d/c
Example: 3/4 ÷ 2/5
KEEP: 3/4
CHANGE: ÷ becomes ×
FLIP: 2/5 becomes 5/2
3/4 × 5/2 = 15/8 = 1 7/8
Answer: 1 7/8
Dividing Mixed Numbers
Step 1: Convert mixed numbers to improper fractions
Step 2: Use Keep-Change-Flip
Step 3: Multiply and simplify
Example: 2 1/2 ÷ 1 1/4
Convert: 2 1/2 = 5/2 and 1 1/4 = 5/4
5/2 ÷ 5/4
Keep-Change-Flip: 5/2 × 4/5
Multiply: 20/10 = 2
Answer: 2
6. Estimating with Fractions and Mixed Numbers
Rounding Fractions
Round to 0 if numerator is much smaller than denominator
Round to 1/2 if numerator is about half of denominator
Round to 1 if numerator is close to denominator
Estimating Mixed Numbers
Round the fraction part to 0, 1/2, or 1
Then perform the operation with whole numbers
Example: Estimate 5 3/8 + 2 7/8
Round 5 3/8 ≈ 5 (since 3/8 is close to 1/2, round to 5 1/2)
Round 2 7/8 ≈ 3 (since 7/8 is close to 1)
Estimate: 5 1/2 + 3 = 8 1/2
Estimate: About 8 1/2
7. Evaluating Expressions with Fractions
Order of Operations (PEMDAS)
Remember: PEMDAS
Parentheses
Exponents
Multiplication & Division (left to right)
Addition & Subtraction (left to right)
Example: 1/2 + 1/3 × 2/5
Step 1: Multiply first (1/3 × 2/5 = 2/15)
Expression becomes: 1/2 + 2/15
Step 2: Find LCD (LCD = 30)
1/2 = 15/30
2/15 = 4/30
Step 3: Add: 15/30 + 4/30 = 19/30
Answer: 19/30
Quick Reference: Fraction Operations
| Operation | Key Rule |
|---|---|
| Addition/Subtraction (Same Denominator) | Add/subtract numerators, keep denominator |
| Addition/Subtraction (Different) | Find LCD, convert, then add/subtract |
| Multiplication | Multiply numerators, multiply denominators |
| Division | Keep-Change-Flip (multiply by reciprocal) |
| Mixed Numbers | Convert to improper fractions first |
💡 Important Tips to Remember
✓ Adding/Subtracting: Need SAME denominator (find LCD)
✓ Multiplying: NO need for common denominator - just multiply across
✓ Dividing: ALWAYS use Keep-Change-Flip
✓ Mixed numbers: Convert to improper fractions first
✓ Reciprocal: Flip numerator and denominator
✓ Always simplify your final answer to lowest terms
✓ For word problems: Identify the operation first
✓ Use PEMDAS for order of operations
✓ Estimating: Round fractions to 0, 1/2, or 1
✓ Check your work - does the answer make sense?
🧠 Memory Tricks & Strategies
Adding/Subtracting:
"Different bottoms? Find the LCD - then add or subtract, you see!"
Multiplying:
"Multiply straight across the top and straight across the floor - numerators and denominators, nothing more!"
Dividing (Keep-Change-Flip):
"Dividing fractions, don't ask why - just flip the second and multiply!"
"Keep the first, change to times, flip the last - division is past!"
Mixed Numbers:
"Mixed numbers you must fix - convert to improper to do the tricks!"
Reciprocals:
"Flip it upside down to find - reciprocal every time!"
PEMDAS:
"Please Excuse My Dear Aunt Sally - operations in order, don't be hasty!"
Master Fraction Operations! ➕ ➖ ✖️ ➗
Remember: Different operations, different rules - master them all!