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The Decimal Part: Unlocking the Meaning Behind the Point

What is a Decimal Part?

In our number system, a decimal number is used to represent a number that is not a whole. It consists of a whole number part and a decimal part, separated by a decimal point. The decimal part specifically refers to the sequence of digits that come after the decimal point. For example, in the number 23.75, the digits "75" form the decimal part. This part of the number represents a value less than one.

The decimal system is a base-10 system, meaning each digit's value is determined by its position relative to the decimal point. The place values to the right of the decimal point are powers of one-tenth. The first digit after the decimal point is the tenths place, the second is the hundredths place, the third is the thousandths place, and so on.

Let's break down the number 5.814:

• The digit 5 is in the ones place (whole number part).
• The digit 8 is in the tenths place, so its value is $8 \times \frac{1}{10} = 0.8$.
• The digit 1 is in the hundredths place, so its value is $1 \times \frac{1}{100} = 0.01$.
• The digit 4 is in the thousandths place, so its value is $4 \times \frac{1}{1000} = 0.004$.

Therefore, the entire decimal part "814" represents $0.8 + 0.01 + 0.004 = 0.814$.

Reading and Writing Decimal Parts

Correctly reading and writing numbers with decimal parts is a fundamental skill. The key is to read the decimal part as a whole number and then state the place value of its last digit. For the number 12.045, you would say "twelve and forty-five thousandths." The word "and" signifies the decimal point. Notice that we say "forty-five" (as if it were 45) and then "thousandths" because the last digit (5) is in the thousandths place.

The following table shows more examples of how to read and write decimals correctly.

The Link Between Decimals and Fractions

The decimal part of a number is directly equivalent to a fraction. This is because our decimal system is a way of writing fractions with denominators that are powers of ten^[1]. Converting a decimal to a fraction is a straightforward process.

Example 1: Convert 0.75 to a fraction.

• Numerator: 75
• Denominator: 100 (because there are two digits after the decimal point).
• This gives $\frac{75}{100}$. Simplify by dividing numerator and denominator by 25: $\frac{75 \div 25}{100 \div 25} = \frac{3}{4}$.

Example 2: Convert 2.05 to a mixed number.

• The whole number part is 2.
• The decimal part 0.05 converts to $\frac{5}{100} = \frac{1}{20}$.
• So, 2.05 is $2\frac{1}{20}$.

Converting a fraction to a decimal is simply a matter of performing division. The numerator is divided by the denominator. For example, $\frac{3}{8}$ is $3 \div 8 = 0.375$.

Decimals in the Real World: Money and Measurement

The most common everyday use of decimal parts is in money. If you live in a country that uses dollars, you are already a master of the hundredths place! One dollar is the whole unit, and one cent is one hundredth of a dollar. The price $15.99 means 15 whole dollars and a decimal part of 99/100 of a dollar, or 99 cents.

Decimals are also essential in the metric system^[2] of measurement, which is used in science and most countries around the world. The system is based on powers of ten, making conversions incredibly easy. For instance:

• Length: 1 centimeter = 0.01 meters. A measurement of 1.57 m is 1 meter and 57 centimeters.
• Mass: 1 gram = 0.001 kilograms. A mass of 2.5 kg is 2 kilograms and 500 grams.
• Volume: 1 milliliter = 0.001 liters. A volume of 0.75 L is 750 milliliters.

Imagine you are a carpenter. You need to cut a board that is 2.375 meters long. The decimal part (0.375) tells you the precise fraction of a meter beyond the 2-meter mark. In inches, this might be a cumbersome fraction like $3/8$, but in decimals, it's a clean, easy-to-work-with number.

Types of Decimal Parts: Terminating and Repeating

Not all decimal parts are created equal. When you convert a fraction to a decimal, you will get one of two types:

1. Terminating Decimals: These are decimals that have a finite number of digits after the decimal point. They come to an end, or "terminate." This happens when the fraction's denominator (in its simplest form) has only the prime factors^[3] of 2 and/or 5.

Examples:

• $\frac{1}{2} = 0.5$ (Denominator is 2)
• $\frac{3}{4} = 0.75$ (Denominator is $2^2$)
• $\frac{7}{20} = 0.35$ (Denominator is $2^2 \times 5$)

2. Repeating Decimals (or Recurring Decimals): These are decimals where one or more digits repeat infinitely. A bar is placed over the repeating digit(s) to indicate this. This happens when the denominator (in its simplest form) has a prime factor other than 2 or 5.

Examples:

• $\frac{1}{3} = 0.333... = 0.\overline{3}$
• $\frac{2}{7} = 0.285714285714... = 0.\overline{285714}$
• $\frac{5}{6} = 0.8333... = 0.8\overline{3}$ (A mixed repeating decimal)

Understanding the difference is crucial for precision. In some calculations, you might round a repeating decimal, but it's important to know that the exact value is the fraction, not the rounded decimal.

Common Mistakes and Important Questions

Footnote

^[1] Powers of Ten: A number like 10, 100, or 1000, which can be written as $10^n$ where $n$ is a positive integer. For example, $100 = 10^2$.

^[2] Metric System (SI): The International System of Units, a decimal-based system of measurement used worldwide. It uses meters for length, kilograms for mass, and liters for volume.

^[3] Prime Factors: The prime numbers that multiply together to give the original number. For example, the prime factors of 20 are 2, 2, and 5 (since $2 \times 2 \times 5 = 20$).