Percents - Seventh Grade
Conversions, Calculations, Percent of Change & Error
1. Understanding Percents
Definition
A percent is a ratio that compares a number to 100
%
The symbol % means "per hundred" or "out of 100"
Example: 50% means 50 out of 100
Visual Understanding
• 100% = whole or all
• 50% = half
• 25% = quarter (one-fourth)
• 75% = three-quarters
2. Converting Between Percents, Fractions, and Decimals
Percent to Decimal
Percent ÷ 100 = Decimal
Move decimal point 2 places LEFT
Example: 75% = 75 ÷ 100 = 0.75
Decimal to Percent
Decimal × 100 = Percent
Move decimal point 2 places RIGHT
Example: 0.65 = 0.65 × 100 = 65%
Percent to Fraction
Percent/100 = Fraction
Then simplify
Example: 25% = 25/100 = 1/4
Fraction to Percent
(Fraction × 100)%
or divide numerator by denominator, then × 100
Example: 3/4 = 0.75 = 0.75 × 100 = 75%
Conversion Examples
| Percent | Decimal | Fraction |
|---|---|---|
| 10% | 0.10 | 1/10 |
| 25% | 0.25 | 1/4 |
| 50% | 0.50 | 1/2 |
| 75% | 0.75 | 3/4 |
| 100% | 1.00 | 1/1 |
3. Comparing Percents to Fractions and Decimals
Method
Step 1: Convert all values to the same form (all decimals OR all percents)
Step 2: Compare the values
Example: Compare 0.6, 55%, and 3/5
Convert all to percents:
0.6 = 60%
55% = 55%
3/5 = 0.6 = 60%
Compare:
55% < 60% = 60%
Order: 55% < 0.6 = 3/5
4. Percents of Numbers and Money
Formula
Percent of Number = (Percent/100) × Number
or
Decimal × Number
Examples
Example 1: Find 30% of 80
Method 1: Using formula
(30/100) × 80 = 0.30 × 80 = 24
Method 2: Using decimal
30% = 0.30
0.30 × 80 = 24
Answer: 24
Example 2: Find 15% of $60
15% = 0.15
0.15 × $60 = $9
Answer: $9
Estimating Percents
Use benchmark percents:
• 10% = divide by 10
• 25% = divide by 4
• 50% = divide by 2
• 1% = divide by 100
5. Solving Percent Equations
Three Types of Problems
Type 1: Find the percent
What percent of 50 is 15?
Formula: (Part/Whole) × 100 = Percent
Type 2: Find the part
What is 30% of 80?
Formula: (Percent/100) × Whole = Part
Type 3: Find the whole
20 is 25% of what number?
Formula: Part ÷ (Percent/100) = Whole
General Equation
Part/Whole = Percent/100
Examples
Example 1: What percent of 50 is 15?
Part = 15, Whole = 50
(15/50) × 100 = Percent
0.3 × 100 = 30%
Answer: 30%
Example 2: 20 is 25% of what number?
Part = 20, Percent = 25%
20/Whole = 25/100
20/Whole = 0.25
Whole = 20 ÷ 0.25 = 80
Answer: 80
6. Percent of Change
Formula
Percent of Change = (New - Old)/Old × 100
or
Change/Original × 100
Types of Change
Percent Increase: If result is POSITIVE (+)
New value is greater than old value
Percent Decrease: If result is NEGATIVE (−)
New value is less than old value
Steps
Step 1: Find the change (New − Old)
Step 2: Divide by original value
Step 3: Multiply by 100
Step 4: Determine if increase or decrease
Example: Percent Increase
Problem: A shirt cost $40. Now it costs $50. Find the percent of change.
Step 1: Change = New − Old = 50 − 40 = 10
Step 2: Divide by original: 10 ÷ 40 = 0.25
Step 3: Multiply by 100: 0.25 × 100 = 25%
Step 4: Positive result = Increase
Answer: 25% increase
Example: Percent Decrease
Problem: A population decreased from 200 to 150. Find the percent of change.
Change = 150 − 200 = −50
Percent = (−50/200) × 100 = −25%
Negative result = Decrease
Answer: 25% decrease
Finding Original Amount
If you know the new amount and percent change:
For increase: Original = New ÷ (1 + rate)
For decrease: Original = New ÷ (1 − rate)
7. Percent Error
Definition
Percent error measures the accuracy of an
estimated or measured value compared to the exact value
Formula
Percent Error = |Approximate − Exact|/Exact × 100
Always use ABSOLUTE VALUE (positive)
Steps
Step 1: Find difference (Approximate − Exact)
Step 2: Take absolute value |difference|
Step 3: Divide by exact value
Step 4: Multiply by 100
Example
Problem: You estimated the distance as 45 miles. The actual distance is 50 miles. Find the percent error.
Approximate = 45, Exact = 50
Step 1: Difference = 45 − 50 = −5
Step 2: Absolute value = |−5| = 5
Step 3: Divide: 5 ÷ 50 = 0.1
Step 4: Multiply: 0.1 × 100 = 10%
Percent Error: 10%
Quick Reference: Percent Formulas
| Concept | Formula |
|---|---|
| Percent to Decimal | Percent ÷ 100 |
| Decimal to Percent | Decimal × 100 |
| Percent of a Number | (Percent/100) × Number |
| Find What Percent | (Part/Whole) × 100 |
| Percent of Change | (New − Old)/Old × 100 |
| Percent Error | |Approximate − Exact|/Exact × 100 |
💡 Important Tips to Remember
✓ Percent means "per hundred" or "out of 100"
✓ To convert percent to decimal: move decimal 2 places left
✓ To convert decimal to percent: move decimal 2 places right
✓ 100% = 1 whole; more than 100% means more than one whole
✓ Percent of a number: multiply by the decimal form
✓ Part/Whole = Percent/100 is the key relationship
✓ Percent increase: result is positive
✓ Percent decrease: result is negative (report as positive)
✓ Percent error: ALWAYS use absolute value (positive)
✓ Always use the ORIGINAL value as denominator in percent change
🧠 Memory Tricks & Strategies
Converting Percents:
"Percent to decimal? Divide by 100, it's quite simple! Decimal to percent? Multiply by 100, don't be resentful!"
Finding Percent of Number:
"Of means multiply, so take the decimal and multiply!"
Percent Equation:
"Part over Whole equals Percent over 100 - remember this rule!"
Percent of Change:
"New minus old, divide by old, times 100 - percent change is told!"
"Positive means increase, negative means decrease!"
Percent Error:
"Error is absolute - always positive, don't debate!"
"Approximate minus exact, absolute it, divide by exact!"
Benchmark Percents:
"50% is half, 25% is quarter, 10% is tenth - use them for order!"
Master Percents! 📊 %
Remember: Percents are everywhere - master them to succeed!