✖️ Multiply Decimals by Powers of Ten
Grade 5 Math - Complete Notes & Formulae
Key Concepts
- Multiplying a decimal by a power of ten moves the decimal point to the right.
- Powers of ten: \(10, 100, 1000, 10^n\), etc.
- Multiplying by 0.1, 0.01: Moves the decimal point to the left.
- Exponents: \(10^n\) means multiplying by 10, \(n\) times.
1️⃣ Multiplying by Powers of Ten (\(10, 100, 1000\), etc.)
Rule: For each zero in the power of ten, move the decimal point one place to the right.
- Number of zeros = number of places to move.
- \(a.bc \times 10 = ab.c\)
- \(a.bc \times 100 = abc.\)
- \(a.bc \times 1000 = abcd.\)
- \(a.bc \times 10^n\) → move the decimal \(n\) places to the right.
- If there are not enough digits, add zeros.
Examples:
- \(2.3 \times 10 = 23\)
- \(0.67 \times 100 = 67\)
- \(5.429 \times 1000 = 5429\)
- \(0.51 \times 10^2 = 0.51 \times 100 = 51\)
Shortcut: Just move the decimal point!
Main Formula
\(x.yz \times 10^n = xy.z\) (move decimal point \(n\) places right)
2️⃣ Multiplying by 0.1, 0.01, or Other Fractional Powers
Rule: For each zero after the decimal point, move the decimal point one place to the left.
- \(a.bc \times 0.1 = 0.abc\)
- \(a.bc \times 0.01 = 0.0abc\)
- \(a.bc \times 0.001 = 0.00abc\)
Examples:
- \(9.3 \times 0.1 = 0.93\)
- \(0.67 \times 0.1 = 0.067\)
- \(5.429 \times 0.01 = 0.05429\)
- \(0.51 \times 0.01 = 0.0051\)
Shortcut: Just move the decimal point left for each decimal place.
Main Formula
\(x.yz \times 0.1^n = 0.xy...z\) (move decimal \(n\) places left)
3️⃣ Using Exponents
- Exponential form: \(10^n\) is a shortcut for multiplying by 10, several times.
- Examples: \(10^2=100\), \(10^3=1000\)
- Multiply as before: move decimal \(n\) places to the right for \(10^n\).
Example (with exponents):
- \(0.437 \times 10^3 = 437\)
- \(0.59 \times 10^2 = 59\)
- \(1.93 \times 10^1 = 19.3\)
Exponent Rule
\(x.yz \times 10^n = xy.z\) (move decimal \(n\) places right)
4️⃣ Find the Missing Number
- If \(x \times 10 = 123.4\), what is \(x\)?
Move decimal one place left: \(x = 12.34\) - If \(x \times 1000 = 7.14\), what is \(x\)?
Move decimal three places left: \(x = 0.00714\) - If \(54.9 = x \times 0.1\), what is \(x\)?
Move decimal one place right: \(x = 549\)
5️⃣ Visual Explanation
Decimal Place Value Table
| Thousands | Hundreds | Tens | Ones | Decimal | Tenths | Hundredths | Thousandths |
|---|---|---|---|---|---|---|---|
| 1,000 | 100 | 10 | 1 | . | 0.1 | 0.01 | 0.001 |
6️⃣ Practice Problems
- \(4.73 \times 100\) = ______
- \(0.56 \times 10^2\) = ______
- \(8.12 \times 0.1\) = ______
- \(0.763 \times 10^3\) = ______
- \(5.09 \times 0.01\) = ______
- \(x \times 10 = 52.4\). What is \(x\)?
Answers:
1) 473
2) 56
3) 0.812
4) 763
5) 0.0509
6) 5.24
1) 473
2) 56
3) 0.812
4) 763
5) 0.0509
6) 5.24