Scaling by Fractions | Fifth Grade
Complete Notes & Formulas
1. Scaling Whole Numbers by Fractions: Justify Your Answer
Definition: Understand and explain whether multiplying a whole number by a fraction will make it larger, smaller, or stay the same WITHOUT calculating the actual answer.
🔑 The Golden Rules of Scaling:
Rule 1: Fraction < 1
When you multiply by a fraction LESS THAN 1:
→ The product will be SMALLER than the original number (scaled down)
Rule 2: Fraction = 1
When you multiply by a fraction EQUAL TO 1:
→ The product will be EQUAL to the original number (stays the same)
Rule 3: Fraction > 1
When you multiply by a fraction GREATER THAN 1:
→ The product will be LARGER than the original number (scaled up)
✏️ Example 1: Is 8 × 3/4 greater than, less than, or equal to 8?
Step 1: Compare 3/4 to 1 whole
3/4 < 1 (numerator is less than denominator)
Step 2: Apply the rule
Since 3/4 < 1, the product will be smaller than 8
Answer: 8 × 3/4 < 8 (less than 8)
Justification: Multiplying by 3/4 means taking "three-fourths of 8," which must be less than all of 8.
✏️ Example 2: Is 5 × 7/3 greater than, less than, or equal to 5?
Compare: 7/3 > 1 (numerator is greater than denominator)
Since 7/3 > 1, the product will be larger than 5
Answer: 5 × 7/3 > 5 (greater than 5)
Justification: 7/3 equals 2 1/3, which is more than 1 whole, so it will scale up the value.
2. Scaling Whole Numbers by Fractions
Definition: Calculate the actual product when multiplying a whole number by a fraction to scale it up or down.
📐 Formula:
Whole Number × a/b = (Whole Number × a)/b
Multiply the whole number by the numerator, then divide by the denominator
📝 Steps:
- Write the whole number as a fraction (n/1)
- Multiply numerators: n × a
- Multiply denominators: 1 × b = b
- Simplify the resulting fraction
✏️ Example 1: Calculate 12 × 2/3
Method 1: Convert whole to fraction
12/1 × 2/3 = (12 × 2)/(1 × 3) = 24/3 = 8
Method 2: Direct multiplication
(12 × 2)/3 = 24/3 = 8
Answer: 8
Note: 8 < 12 because we multiplied by 2/3, which is less than 1
✏️ Example 2: Calculate 6 × 5/4
6 × 5/4 = (6 × 5)/4 = 30/4 = 15/2 = 7 1/2
Answer: 7 1/2
Note: 7 1/2 > 6 because we multiplied by 5/4, which is greater than 1
3. Scaling Fractions by Fractions
Definition: Multiply one fraction by another fraction to scale it. The same scaling rules apply: compare the scaling fraction to 1.
📐 Formula:
a/b × c/d = (a × c)/(b × d)
🔑 Scaling Rules for Fractions:
- If scaling fraction < 1 → product is smaller than original fraction
- If scaling fraction = 1 → product equals original fraction
- If scaling fraction > 1 → product is larger than original fraction
✏️ Example 1: 3/4 × 2/5 (Scaling Down)
Predict: Since 2/5 < 1, the product will be less than 3/4
Calculate:
(3 × 2)/(4 × 5) = 6/20 = 3/10
Answer: 3/10
Verify: 3/10 (0.3) < 3/4 (0.75) ✓
✏️ Example 2: 2/3 × 5/4 (Scaling Up)
Predict: Since 5/4 > 1, the product will be greater than 2/3
Calculate:
(2 × 5)/(3 × 4) = 10/12 = 5/6
Answer: 5/6
Verify: 5/6 (0.83) > 2/3 (0.67) ✓
4. Scaling Mixed Numbers by Fractions
Definition: Multiply a mixed number by a fraction. Convert the mixed number to an improper fraction first, then apply scaling rules.
📐 Formula:
W a/b × c/d = [(W × b + a)/b] × c/d
📝 Steps:
- Convert mixed number to improper fraction
- Determine if scaling fraction is <, =, or > 1
- Multiply the two fractions
- Simplify and convert back to mixed number if needed
✏️ Example 1: 2 1/2 × 3/5
Predict: Since 3/5 < 1, product will be less than 2 1/2
Convert: 2 1/2 = 5/2
Multiply: 5/2 × 3/5 = 15/10 = 3/2 = 1 1/2
Answer: 1 1/2
Verify: 1 1/2 < 2 1/2 ✓
✏️ Example 2: 1 1/3 × 6/5
Predict: Since 6/5 > 1, product will be greater than 1 1/3
Convert: 1 1/3 = 4/3
Multiply: 4/3 × 6/5 = 24/15 = 8/5 = 1 3/5
Answer: 1 3/5
Verify: 1 3/5 > 1 1/3 ✓
5. Scaling by Fractions and Mixed Numbers
Definition: Comprehensive scaling problems that combine all types: whole numbers, fractions, and mixed numbers as both the number being scaled and the scaling factor.
🔑 Key Comparison Rules:
| Scaling Factor | Effect on Original | Example |
|---|---|---|
| < 1 | Makes smaller (scales down) | 10 × 1/2 = 5 |
| = 1 | Stays the same | 10 × 4/4 = 10 |
| > 1 | Makes larger (scales up) | 10 × 1 1/2 = 15 |
✏️ Example 1: Mixed × Mixed - 2 1/4 × 1 1/3
Predict: 1 1/3 > 1, so product will be greater than 2 1/4
Convert both: 2 1/4 = 9/4, 1 1/3 = 4/3
Multiply: 9/4 × 4/3 = 36/12 = 3
Answer: 3
Verify: 3 > 2 1/4 ✓
✏️ Example 2: Whole × Mixed - 8 × 2 3/4
Predict: 2 3/4 > 1, so product will be greater than 8
Convert: 2 3/4 = 11/4
Multiply: 8 × 11/4 = 88/4 = 22
Answer: 22
Verify: 22 > 8 ✓
✏️ Example 3: Fraction × Mixed - 3/5 × 1 2/3
Predict: 3/5 < 1, so product will be less than 1 2/3
Convert: 1 2/3 = 5/3
Multiply: 3/5 × 5/3 = 15/15 = 1
Answer: 1
Verify: 1 < 1 2/3 ✓
Quick Reference Chart
| Scaling Type | Formula | Example |
|---|---|---|
| Whole × Fraction | n × a/b = (n × a)/b | 12 × 2/3 = 24/3 = 8 |
| Fraction × Fraction | a/b × c/d = (a×c)/(b×d) | 3/4 × 2/5 = 6/20 = 3/10 |
| Mixed × Fraction | Convert to improper, then multiply | 2 1/2 × 3/5 = 5/2 × 3/5 = 3/2 |
| Any × Mixed | Convert mixed to improper first | 8 × 2 3/4 = 8 × 11/4 = 22 |
💡 Scaling Decision Chart:
Scaling Factor < 1
Product SMALLER
Scale DOWN ⬇
Scaling Factor = 1
Product EQUAL
No Change ↔
Scaling Factor > 1
Product LARGER
Scale UP ⬆
🔑 Key Tips for Success:
- Always compare the scaling fraction to 1 to predict if the product will be larger or smaller
- To check if a fraction is greater than 1: numerator > denominator
- To check if a fraction equals 1: numerator = denominator
- To check if a fraction is less than 1: numerator < denominator
- For mixed numbers, they are always greater than 1 (unless the whole part is 0)
- When scaling down (multiplying by fraction < 1), you're taking "part of" the original
- When scaling up (multiplying by fraction > 1), you're taking "more than all of" the original
- Convert all mixed numbers to improper fractions before multiplying
- After calculating, verify your answer matches your prediction
- Simplify final answers and convert back to mixed numbers when appropriate
📚 Fifth Grade Scaling by Fractions - Complete Study Guide
Master these concepts for math excellence! ✨