Powers of Ten
Fifth Grade Mathematics - Complete Guide
🔢 Understanding Powers of Ten
What are Powers of Ten?
Powers of ten are numbers where 10 is multiplied by itself a certain number of times[web:65][web:66]. They are written using exponential notation[web:68].
Exponential Notation[web:65][web:66]:
\( 10^n \) where \( n \) is the exponent
Read as: "10 to the power of \( n \)" or "10 to the \( n \)th power"
Parts of Exponential Form:
\( 10^5 \)
↓
Base
(The number being multiplied)
↓
Exponent
(How many times to multiply)
Three Forms of Numbers[web:65]:
| Exponential Form | Expanded Form | Standard Form | Word Form |
|---|---|---|---|
| \( 10^0 \) | 1 | 1 | One |
| \( 10^1 \) | 10 | 10 | Ten |
| \( 10^2 \) | \( 10 \times 10 \) | 100 | One Hundred |
| \( 10^3 \) | \( 10 \times 10 \times 10 \) | 1,000 | One Thousand |
| \( 10^4 \) | \( 10 \times 10 \times 10 \times 10 \) | 10,000 | Ten Thousand |
| \( 10^5 \) | \( 10 \times 10 \times 10 \times 10 \times 10 \) | 100,000 | One Hundred Thousand |
| \( 10^6 \) | \( 10 \times 10 \times 10 \times 10 \times 10 \times 10 \) | 1,000,000 | One Million |
Key Pattern Discovery[web:66][web:67]:
The exponent tells you how many ZEROS come after the 1
Formula: \( 10^n = \) 1 followed by \( n \) zeros[web:66]
🧮 Evaluate Powers of Ten
What Does "Evaluate" Mean?
To evaluate a power of ten means to find its value in standard form (the actual number)[web:65][web:67].
Method 1: Counting Zeros[web:66][web:67]:
Quick Method:
Write 1, then add as many zeros as the exponent
Examples:
- \( 10^2 = 100 \) (1 with 2 zeros)
- \( 10^3 = 1{,}000 \) (1 with 3 zeros)
- \( 10^4 = 10{,}000 \) (1 with 4 zeros)
- \( 10^5 = 100{,}000 \) (1 with 5 zeros)
- \( 10^6 = 1{,}000{,}000 \) (1 with 6 zeros)
Method 2: Repeated Multiplication[web:65]:
Step-by-Step Method:
Multiply 10 by itself the number of times shown by the exponent
Example: Evaluate \( 10^4 \)
Step 1: The exponent is 4, so multiply 10 four times
Step 2: \( 10 \times 10 \times 10 \times 10 \)
Step 3: \( 10 \times 10 = 100 \)
Step 4: \( 100 \times 10 = 1{,}000 \)
Step 5: \( 1{,}000 \times 10 = 10{,}000 \)
Answer: \( 10^4 = 10{,}000 \)
Special Cases[web:66]:
Case 1: Zero Exponent
\( 10^0 = 1 \)
Rule: Any number (except 0) raised to the power of 0 equals 1[web:66]
Case 2: Exponent of One
\( 10^1 = 10 \)
Rule: Any number raised to the power of 1 equals itself[web:66]
Practice Problems:
\( 10^7 = \) ?
Answer: 10,000,000
\( 10^8 = \) ?
Answer: 100,000,000
\( 10^9 = \) ?
Answer: 1,000,000,000
\( 10^{10} = \) ?
Answer: 10,000,000,000
✍️ Write Powers of Ten with Exponents
Converting to Exponential Form[web:65][web:66]:
When you see a standard number (like 1,000), you can write it as a power of ten by counting the zeros.
Method 1: Count the Zeros[web:67]:
Steps:
- Look at the number in standard form
- Count how many zeros come after the 1
- Write 10 with the number of zeros as the exponent
Examples:
100 has 2 zeros → \( 10^2 \)
1,000 has 3 zeros → \( 10^3 \)
10,000 has 4 zeros → \( 10^4 \)
100,000 has 5 zeros → \( 10^5 \)
1,000,000 has 6 zeros → \( 10^6 \)
Method 2: Writing Large Numbers as Powers of Ten[web:65][web:66]:
For numbers with other digits (not just 1 and zeros):
Number = Coefficient × \( 10^n \)
Example 1: Write 45,000 using a power of ten[web:65]
Step 1: Identify the non-zero digits: 45
Step 2: Count the trailing zeros: 3 zeros
Step 3: Write as: \( 45 \times 10^3 \)
Example 2: Write 7,000,000 using a power of ten
Step 1: Identify the non-zero digits: 7
Step 2: Count the trailing zeros: 6 zeros
Step 3: Write as: \( 7 \times 10^6 \)
Quick Conversion Table:
| Standard Form | Number of Zeros | Exponential Form |
|---|---|---|
| 10 | 1 | \( 10^1 \) |
| 100 | 2 | \( 10^2 \) |
| 1,000 | 3 | \( 10^3 \) |
| 10,000 | 4 | \( 10^4 \) |
| 100,000 | 5 | \( 10^5 \) |
| 1,000,000 | 6 | \( 10^6 \) |
| 10,000,000 | 7 | \( 10^7 \) |
| 100,000,000 | 8 | \( 10^8 \) |
| 1,000,000,000 | 9 | \( 10^9 \) |
🔄 Patterns with Powers of Ten
Multiplying by Powers of Ten[web:65]:
Pattern Discovery:
When multiplying by \( 10^n \), move the decimal point \( n \) places to the RIGHT
Examples:
- \( 67 \times 10^1 = 670 \) (move 1 place right)
- \( 67 \times 10^2 = 6{,}700 \) (move 2 places right)
- \( 67 \times 10^3 = 67{,}000 \) (move 3 places right)
Dividing by Powers of Ten[web:65]:
Pattern Discovery:
When dividing by \( 10^n \), move the decimal point \( n \) places to the LEFT
Examples:
- \( 702{,}000 \div 10^1 = 70{,}200 \) (move 1 place left)
- \( 702{,}000 \div 10^2 = 7{,}020 \) (move 2 places left)
- \( 702{,}000 \div 10^3 = 702 \) (move 3 places left)[web:65]
Place Value Connection[web:65]:
Each place value position is 10 times greater than the position to its right:
- Ones place = \( 10^0 = 1 \)
- Tens place = \( 10^1 = 10 \)
- Hundreds place = \( 10^2 = 100 \)
- Thousands place = \( 10^3 = 1{,}000 \)
- Ten Thousands place = \( 10^4 = 10{,}000 \)
- Hundred Thousands place = \( 10^5 = 100{,}000 \)
- Millions place = \( 10^6 = 1{,}000{,}000 \)
📐 Essential Formulas for Powers of Ten
Formula 1: Basic Power of Ten
\( 10^n = \underbrace{10 \times 10 \times 10 \times \ldots \times 10}_{n \text{ times}} \)
Formula 2: Counting Zeros Rule
\( 10^n = 1 \) followed by \( n \) zeros
Formula 3: Standard to Exponential
If standard form has \( n \) zeros, then exponential form is \( 10^n \)
Formula 4: Multiplication Pattern
\( a \times 10^n = a \) with \( n \) zeros added
Formula 5: Special Exponents
\( 10^0 = 1 \)
\( 10^1 = 10 \)
Formula 6: Product of Powers of Ten
\( 10^a \times 10^b = 10^{a+b} \)
Example: \( 10^2 \times 10^3 = 10^5 = 100{,}000 \)
📖 Word Problems with Powers of Ten
Real-World Applications[web:68]:
Example 1: Distance Problem
Problem: The distance from Earth to the Moon is approximately \( 3.84 \times 10^5 \) kilometers. What is this distance in standard form?
Solution:
Step 1: Evaluate \( 10^5 = 100{,}000 \)
Step 2: Multiply: \( 3.84 \times 100{,}000 = 384{,}000 \)
Answer: 384,000 kilometers
Example 2: Population Problem
Problem: A city has a population of 5,000,000. Write this using a power of ten.
Solution:
Step 1: Identify non-zero digits: 5
Step 2: Count trailing zeros: 6 zeros
Step 3: Write as: \( 5 \times 10^6 \)
Answer: \( 5 \times 10^6 \)
Example 3: Comparison Problem
Problem: Which is greater: \( 10^4 \) or \( 10^3 \)?
Solution:
\( 10^4 = 10{,}000 \)
\( 10^3 = 1{,}000 \)
Since \( 10{,}000 > 1{,}000 \)
Answer: \( 10^4 \) is greater
📋 Quick Reference Chart
| Exponential Form | Standard Form | Word Form | Number of Zeros |
|---|---|---|---|
| \( 10^0 \) | 1 | One | 0 |
| \( 10^1 \) | 10 | Ten | 1 |
| \( 10^2 \) | 100 | Hundred | 2 |
| \( 10^3 \) | 1,000 | Thousand | 3 |
| \( 10^4 \) | 10,000 | Ten Thousand | 4 |
| \( 10^5 \) | 100,000 | Hundred Thousand | 5 |
| \( 10^6 \) | 1,000,000 | Million | 6 |
| \( 10^9 \) | 1,000,000,000 | Billion | 9 |
🌟 Key Takeaways
- Powers of ten use base 10 with an exponent: \( 10^n \)[web:65][web:66]
- The exponent tells how many zeros follow the 1[web:66][web:67]
- To evaluate \( 10^n \), write 1 followed by \( n \) zeros[web:67]
- Count zeros in standard form to write exponential form[web:65]
- Multiplying by \( 10^n \) moves decimal \( n \) places right[web:65]
- Dividing by \( 10^n \) moves decimal \( n \) places left[web:65]
- Powers of ten help express very large numbers efficiently[web:68]