Multiplication And Division By Powers Of 10

Multiplication and division by powers of 10 are fundamental skills that simplify calculations, enhance number sense, and lay the groundwork for scientific notation, metric conversions, and many real‑world applications. Understanding how shifting the decimal point works when you multiply or divide by 10, 100, 1000, and beyond allows students to perform mental math quickly and avoid common errors in arithmetic and algebra.

Understanding Powers of 10

A power of 10 is any number that can be written as 10 raised to an integer exponent. In notation, this looks like (10^n), where n is a whole number. When n is positive, the value is a 1 followed by n zeros; when n is negative, the value is a decimal fraction with n places after the decimal point.

• (10^1 = 10)
• (10^2 = 100)
• (10^3 = 1{,}000)
• (10^0 = 1) (any number to the zero power equals one)
• (10^{-1} = 0.1) - (10^{-2} = 0.01)
• (10^{-3} = 0.001)

These numbers form the backbone of our base‑10 place‑value system, which is why multiplying or dividing by them merely shifts digits relative to the decimal point.

Multiplying by Powers of 10

Shifting the Decimal Point

When you multiply a number by (10^n) (with n > 0), you move the decimal point n places to the right. If the number is an integer, you can think of an invisible decimal point at the end; moving it right adds zeros.

Example 1: Multiply 47 by (10^2) (100).

• Start with 47. → imagine 47.
• Move the decimal two places right: 4700.
• Result: (47 \times 100 = 4{,}700).

Example 2: Multiply 3.56 by (10^3) (1000).

• Move the decimal three places right: 3560.
• Result: (3.56 \times 1{,}000 = 3{,}560).

If the move runs past the existing digits, you fill the gaps with zeros.

Multiplying Decimals

The same rule applies to decimal numbers. The decimal point simply slides; the digits themselves do not change order.

Example 3: (0.042 \times 10^4)

• Move the decimal four places right: 420.
• Result: (0.042 \times 10{,}000 = 420).

Example 4: (5.789 \times 10^1)

• Move one place right: 57.89.
• Result: (5.789 \times 10 = 57.89).

Quick Reference List

• Multiply by 10 → shift decimal 1 place right.
• Multiply by 100 → shift 2 places right.
• Multiply by 1000 → shift 3 places right.
• Multiply by (10^n) → shift n places right.

Dividing by Powers of 10

Moving the Decimal Left

Division by a power of 10 works in the opposite direction: you move the decimal point n places to the left when dividing by (10^n). If needed, you prepend zeros to the left of the number.

Example 5: Divide 5 600 by (10^2) (100).

• Move decimal two places left: 56.00 → 56.
• Result: (5{,}600 \div 100 = 56).

Example 6: Divide 0.0048 by (10^3) (1000).

• Move decimal three places left: 0.0000048.
• Result: (0.0048 \div 1{,}000 = 0.0000048).

Dividing Whole Numbers

When the dividend is a whole number, the invisible decimal point sits at the end. Moving it left may create a decimal result.

Example 7: (85 \div 10)

• Move decimal one place left: 8.5.
• Result: (85 \div 10 = 8.5).

Example 8: (7 \div 100)

• Move decimal two places left: 0.07.
• Result: (7 \div 100 = 0.07).

Quick Reference List

• Divide by 10 → shift decimal 1 place left. - Divide by 100 → shift 2 places left.
• Divide by 1000 → shift 3 places left.
• Divide by (10^n) → shift n places left.

Why It Works: Place‑Value Explanation

Our number system groups digits in powers of ten: units, tens, hundreds, thousands, and so on. Multiplying by 10 effectively promotes each digit to the next higher place value (units → tens, tens → hundreds, etc.). Conversely, dividing by 10 demotes each digit to the next lower place value. Because the decimal point marks the boundary between whole‑number places and fractional places, shifting it accomplishes the same promotion or demotion without altering the digits themselves. This principle extends uniformly to negative powers