Fractions and Decimals - Sixth Grade
Complete Notes & Formulas
1. Write Fractions in Lowest Terms
What Does "Lowest Terms" Mean?
A fraction is in lowest terms (or simplified form) when the numerator and denominator have no common factors except 1.
To Simplify: Divide numerator and denominator by their GCF
a/b ÷ GCF(a,b) = simplified fraction
Method: Using GCF
Example: Simplify 24/36
Step 1: Find GCF of 24 and 36
GCF(24, 36) = 12
Step 2: Divide both by GCF
24 ÷ 12 = 2
36 ÷ 12 = 3
Answer: 2/3
2. Least Common Denominator (LCD)
What is LCD?
LCD is the Least Common Multiple (LCM) of the denominators
LCD = LCM(denominators)
Example: Find LCD
Problem: Find LCD of 1/4 and 3/6
Denominators: 4 and 6
LCM(4, 6) = 12
LCD = 12
Convert fractions:
1/4 = 3/12 (multiply by 3/3)
3/6 = 6/12 (multiply by 2/2)
3. Improper Fractions ↔ Mixed Numbers
Definitions
Improper Fraction: Numerator ≥ Denominator (e.g., 7/3)
Mixed Number: Whole number + fraction (e.g., 2⅓)
Convert Improper → Mixed
Steps:
1. Divide numerator by denominator
2. Quotient = whole number
3. Remainder = new numerator
4. Keep same denominator
Example: Convert 17/5 to mixed number
17 ÷ 5 = 3 remainder 2
Whole number: 3
Fraction part: 2/5
Answer: 3⅖
Convert Mixed → Improper
Formula:
(Whole × Denominator + Numerator) / Denominator
Example: Convert 4⅔ to improper fraction
Step 1: Multiply: 4 × 3 = 12
Step 2: Add: 12 + 2 = 14
Step 3: Write over denominator: 14/3
Answer: 14/3
4. Convert Fractions to Decimals
Method
Divide the numerator by the denominator
a/b = a ÷ b
Types of Decimals
| Type | Example Fraction | Decimal |
|---|---|---|
| Terminating | 3/4 | 0.75 |
| Repeating | 1/3 | 0.333... or 0.3̄ |
Examples
Example 1: Convert 3/8 to decimal
3 ÷ 8 = 0.375
Answer: 0.375 (terminating)
Example 2: Convert 5/6 to decimal
5 ÷ 6 = 0.8333...
Answer: 0.83̄ (repeating)
5. Convert Decimals to Fractions
Steps for Terminating Decimals
Step 1: Write decimal as fraction over 1
Step 2: Multiply by 10, 100, or 1000 to remove decimal
Step 3: Simplify to lowest terms
Place Value Chart
0.5 = 5/10 = 1/2
0.25 = 25/100 = 1/4
0.125 = 125/1000 = 1/8
Example
Problem: Convert 0.36 to a fraction
Step 1: 0.36 = 36/100 (2 decimal places = hundredths)
Step 2: Find GCF(36, 100) = 4
Step 3: Simplify: 36÷4 / 100÷4 = 9/25
Answer: 9/25
6. Repeating Decimals ↔ Fractions
Notation
Bar notation: 0.333... = 0.3̄
Multiple digits: 0.272727... = 0.2̄7̄
Common Repeating Decimals
| Fraction | Decimal |
|---|---|
| 1/3 | 0.3̄ |
| 2/3 | 0.6̄ |
| 1/9 | 0.1̄ |
| 5/9 | 0.5̄ |
| 1/6 | 0.16̄ |
Pattern for Ninths
When denominator is 9: The numerator repeats!
4/9 = 0.4̄, 7/9 = 0.7̄, 8/9 = 0.8̄
7. Decimals ↔ Mixed Numbers
Decimal → Mixed Number
Example: Convert 3.75 to mixed number
Step 1: Whole number = 3
Step 2: Decimal part: 0.75 = 75/100 = 3/4
Answer: 3¾
Mixed Number → Decimal
Example: Convert 5⅖ to decimal
Step 1: Whole number = 5
Step 2: Convert fraction: 2/5 = 2 ÷ 5 = 0.4
Step 3: Combine: 5 + 0.4 = 5.4
Answer: 5.4
8. Put Fractions, Decimals & Mixed Numbers in Order
Strategy 1: Convert All to Decimals
Example: Order from least to greatest: 0.6, 5/8, 2/3
Convert to decimals:
0.6 = 0.6
5/8 = 5 ÷ 8 = 0.625
2/3 = 2 ÷ 3 = 0.666...
Compare: 0.6 < 0.625 < 0.666...
Answer: 0.6, 5/8, 2/3
Strategy 2: Convert All to Fractions
Example: Order: 1.5, 1⅓, 7/4
Convert to fractions with common denominator:
1.5 = 3/2 = 18/12
1⅓ = 4/3 = 16/12
7/4 = 21/12
Compare: 16/12 < 18/12 < 21/12
Answer: 1⅓, 1.5, 7/4
9. Understand Fractions as Division
Key Concept
a/b = a ÷ b
The fraction bar means division!
Word Problem Example 1
Problem: 6 pizzas are shared equally among 8 people. How much pizza does each person get?
Think: 6 divided by 8
6 ÷ 8 = 6/8 = 3/4
Answer: Each person gets 3/4 of a pizza
Word Problem Example 2
Problem: A ribbon is 15 meters long. It is cut into 4 equal pieces. How long is each piece?
15 ÷ 4 = 15/4 = 3¾
Answer: Each piece is 3¾ meters or 3.75 meters
Quick Reference: Conversions
| Conversion | Method |
|---|---|
| Fraction → Decimal | Divide numerator by denominator |
| Decimal → Fraction | Place over power of 10, simplify |
| Improper → Mixed | Divide, quotient = whole, remainder = numerator |
| Mixed → Improper | (Whole × Denom) + Num / Denom |
| Simplify Fraction | Divide by GCF |
💡 Important Tips to Remember
✓ Simplify fractions by dividing by GCF
✓ LCD = LCM of the denominators
✓ The fraction bar means division
✓ Improper fractions have numerator ≥ denominator
✓ To compare: Convert to same form (all decimals or all fractions)
✓ Repeating decimals: Use bar notation (0.3̄)
✓ Terminating decimals end; repeating decimals go forever
✓ For ninths: Numerator repeats (4/9 = 0.4̄)
✓ Check your work by converting back
✓ Always simplify final answers
🧠 Memory Tricks & Strategies
Simplifying Fractions:
"GCF is the key to simplicity!"
Improper to Mixed:
"Divide and Conquer: Quotient is whole, remainder on top!"
Mixed to Improper:
"MAD: Multiply, Add, Denominator"
(Multiply whole × denom, Add numerator, over Denominator)
Fraction to Decimal:
"Top divided by bottom!"
Decimal to Fraction:
"Say it, write it, simplify it!"
(0.25 = "25 hundredths" = 25/100 = 1/4)
Comparing:
"Same form, easy compare!"
Repeating Decimals:
"Put a bar over what repeats!"
Master Fractions & Decimals! 🔢 ➗ 📊
Practice conversions daily - they're essential for all future math!