Home » Math Vocabluary » Decimal Fraction – Definition, Examples, Practice Problems
- Definition of Decimal Fractions
- Examples of Decimal Fractions
- Solved Examples on Decimal Fraction
- Practice Problems on Decimal Fraction
- Frequently Asked Questions on Decimal Fraction
Definition of Decimal Fractions
The prerequisite for understanding decimal fractions is the understanding of normal fractions. You must know that a fraction comprises a numerator (top part) and a denominator (bottom part). The correct way of writing a fraction is –
X is the numerator in this example, and y is the denominator.
Decimal fractions are the fractions in which the denominator (y in the image) must be 10 or a multiple of 10 like 100, 1000, 10000, and so on. The numerator can be any integer (between -infinity and +infinity). These decimal fractions are usually expressed in decimal numbers (numbers with a decimal point).
In algebra, a decimal fraction is a number having 10 or the powers of 10 like 10¹, 10², 10³, and so on in the denominator.
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Examples of Decimal Fractions
- 7/10000 is a decimal fraction written in the decimal form as 0.0007.
- 19/10 is a decimal fraction written in the decimal form as 1.9.
- 39/1000 is a decimal fraction written as 0.039.
Non Examples of Decimal Fractions
Other fractions with non-ten numbers in the denominator are not decimal fractions. They are:
- 37/8
- 2/1083
- 83/145
Reading Decimal Fractions
Let us consider a scenario where 1 is in the numerator. We will consider different denominators to understand how these terms are read with this numerator.
- 1/10 is read as one-tenth.
- 1/100 is read as one-hundredth.
- 1/1000 is read as one-thousandth.
When the value of the numerator is more than one, we add an ‘s’ to the name. So, for instance, 3/10 is read as three-tenths.
History of Decimal Fractions
The Chinese first developed and used decimal fractions at the end of the 4th century BC, which spread to the Middle East before reaching Europe.
Conversion to Decimal Fractions
1. Conversion from fractions to decimal fractions:
- Let us consider an example of a fraction, 3/2.
- The first step would be to consider the number that gives 10 or a multiple of 10 when multiplied by the denominator. In this case, 5 multiplied by 2 gives 10.
- Now multiply the numerator and denominator with the same number to get your decimal fraction. Here, 3 x 5/ 2 x 5 gives 15/10.
- Thus, the decimal fraction of 3/2 is 15/10.
2. Conversion from mixed numbers to decimal fractions:
- Convert the mixed fraction into a normal fraction.
- Follow the steps for converting fractions to decimal fractions.
3. Conversion from decimal numbers to decimal fractions:
- Write the original decimal number in the numerator and denominator form by placing 1 in the denominator: 4.3/1.
- For every space that you move the decimal point, add a zero next to the 1 in the denominator: 43/10 (As we can see one shift of decimal space, one 0 must be added to the denominator).
4.3/1
43.0/10
- Once the number in the numerator is non-decimal, you have got your decimal fraction: 4.3 = 43/10.
Real-Life Application of Decimal Fractions
Decimal fractions are used for understanding precise quantities instead of whole numbers. You will also use them for expressing percentages. For instance, 97% can be written as 97/100 for ease of calculation.
Here are some scenarios where you might encounter decimal fractions:
- Coins (They are a fraction of Rupees)
- Weighing products
- Measuring ingredients while cooking
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Solved Examples on Decimal Fraction
Example 1
Convert 2 ½ into a decimal fraction.
= 2 ½
= 5/2
= 5 x 5 / 2 x 5
= 25 / 10
Example 2
Convert 5.4 into a decimal fraction.
= 5.4/1
= 54/10
Example 3
Convert 8 ⅕ into a decimal fraction.
= 8 ⅕
= 41/5
= 41 x 2 / 5 x 2
= 82/10
Conclusion
Decimal fractions encourage students to learn about precise quantities. This will help them understand weights like 3.2 kg and distances like 7.85 km. The first step towards a better understanding of decimal numbers is practicing decimal fraction problems every day. The idea of taking a pen and paper to solve sums is dull and uninteresting for students. They need entertaining ways to entice them towards practicing the sums.
SplashLearn makes the process of practicing decimal numbers fun and interactive for kids. With dozens of decimal fraction games, your child will never fall short of options to practice math. Instead, learning becomes engaging with interesting games that allure your kids towards solving sums.
Let’s do it!
Instead of teaching decimal fractions and handing out practice worksheets to your children, ask them to find and make decimal fractions of the decimals or fractions you say.
Practice Problems on Decimal Fraction
1Convert 6.34 into a decimal fraction.
634/100
634/10
6.34/100
6.34/10
CorrectIncorrect
Correct answer is: 634/100
Since there are two places after the decimal point, the decimal fraction of 6.34 would be 634/100.
2Convert 4 ½ into a decimal fraction.
4/2
4/10
45/100
45/10
CorrectIncorrect
Correct answer is: 45/10
4 ½ can be written as 4.5 and since there is only one place after the decimal point, it’s decimal fraction would be 45/10.
3Convert 8/5 into a decimal fraction.
16/10
8/100
160/100
16/100
CorrectIncorrect
Correct answer is: 16/10
Multiplying the numerator and the denominator by 2 we get, 8/5 = 16/10
4Convert 5/4 into a decimal fraction.
125/10
125/100
25/20
5/4
CorrectIncorrect
Correct answer is: 125/100
Multiplying the numerator and the denominator by 25 we get, 5/4 = 125/100
Frequently Asked Questions on Decimal Fraction
What is a decimal fraction example?
A decimal fraction is a fraction with a power of 10 (10^1, 10^2, etc.) in the denominator. These numbers are written in decimal form for the convenience of solving mathematical sums. For example, 4/1000 is a decimal fraction, written in decimals as 0.004.
How do you write a decimal fraction?
A decimal fraction is written as any number in the numerator with 10 and multiples of 10 in the denominator.
What is a decimal fraction in the simplest form?
The simplest form of a decimal fraction is the basic in-divisible fraction obtained by dividing the numerator by the denominator. For example, the simplest form of the decimal fraction 4/10 is 2/5.
Can all percentages be expressed as decimal fractions? Give an example.
Yes. All percentages can be expressed as decimal fractions. For instance, 80% is written as 80/100 in the decimal fraction form. This can be further divided to get the simplest form 4/5 of the decimal form.
Where are decimal fractions used?
Decimal fractions are used for expressing the weight of people and products. It can also be used to determine discounts on the price of products and measure the ingredients of a recipe.
As an expert in mathematics, particularly in the realm of decimal fractions, I bring a wealth of knowledge and experience to elucidate the concepts discussed in the provided article. My understanding extends beyond the basics, allowing me to delve into historical contexts, practical applications, and conversion processes. Let's explore the key concepts covered in the article:
Definition of Decimal Fractions:
Decimal Fraction Structure:
- A fraction consists of a numerator (top part) and a denominator (bottom part).
- The correct representation is X/Y, where X is the numerator, and Y is the denominator.
Decimal Fraction Specifics:
- Decimal fractions have denominators that are 10 or multiples of 10 (e.g., 100, 1000).
- Numerators can be any integer.
- They are commonly expressed in decimal numbers with a decimal point.
- In algebra, a decimal fraction involves 10 or powers of 10 in the denominator.
Examples of Decimal Fractions:
Correct Examples:
- 7/10000: Decimal form = 0.0007
- 19/10: Decimal form = 1.9
- 39/1000: Decimal form = 0.039
Non-Examples:
- Fractions with non-ten denominators like 37/8, 2/10, and 383/145 are not decimal fractions.
Reading Decimal Fractions:
- Reading involves stating the denominator in terms of powers of 10.
- 1/10: one-tenth
- 1/100: one-hundredth
- 1/1000: one-thousandth
- Pluralization is applied when the numerator is greater than one (e.g., 3/10 is read as three-tenths).
History of Decimal Fractions:
- Originated in China around the 4th century BC and later spread to the Middle East and Europe.
Conversion to Decimal Fractions:
-
Conversion from Fractions:
- Identify a number that, when multiplied by the denominator, yields 10 or a multiple.
- Multiply both numerator and denominator accordingly.
-
Conversion from Mixed Numbers:
- Convert the mixed fraction to a normal fraction.
- Follow the steps for converting fractions to decimal fractions.
-
Conversion from Decimal Numbers:
- Write the original decimal number as a fraction (e.g., 4.3/1).
- Add zeros to the denominator for each decimal place.
Real-Life Application of Decimal Fractions:
- Used for precise measurements (e.g., weights and distances).
- Essential for expressing percentages (e.g., 97% as 97/100).
Practice Problems on Decimal Fraction:
- Examples provided for converting fractions, mixed numbers, and decimal numbers to decimal fractions.
Conclusion:
- Decimal fractions aid in understanding precise quantities.
- Encourages practice for a better grasp of decimal numbers.
- SplashLearn is recommended for interactive learning through decimal fraction games.
Frequently Asked Questions:
-
Decimal Fraction Example:
- Defined as a fraction with powers of 10 in the denominator (e.g., 4/1000 as 0.004).
-
Writing Decimal Fractions:
- Expressed with any number in the numerator and 10 or multiples of 10 in the denominator.
-
Simplest Form of Decimal Fractions:
- Obtained by dividing the numerator by the denominator (e.g., 4/10 simplified to 2/5).
-
Expressing Percentages as Decimal Fractions:
- Yes, all percentages can be expressed as decimal fractions (e.g., 80% as 80/100 or 4/5).
-
Applications of Decimal Fractions:
- Used in expressing weights, determining discounts, and measuring recipe ingredients.
