Improper Fractions - Definition, Conversion, Examples - Cuemath

Improper Fractions

Fractions were first used in Ancient Egypt around 1600 BC, which makes the concept quite old. Fractions are of different types. When the numerator is smaller than the denominator i.e. 1/2, it is a proper fraction. However, when the denominator is smaller than or equal to the numerator, then it is an improper fraction. An example of this is 16/15.

An improper fraction is one type of fraction in which the numerator is equal to or greater than the denominator. Its value is always one or greater than one. Improper fractions are usually written in mixed number form in a simplified manner, as mixed fractions are easier to comprehend.

1.	What is an Improper Fraction?
2.	Improper Fraction and Mixed Fraction
3.	Converting Improper Fractions to Decimals
4.	Converting Improper Fraction to Mixed Numbers
5.	How to Solve Improper Fractions?
6.	FAQs on Improper Fractions

What is an Improper Fraction?

An improper fraction is a type of fraction where the numerator is greater than or equal to the denominator. For example, 5/2 and 8/5, are improper fractions. Every fraction has two parts, numerator, and denominator. In mathematics, there are two main types of fractions based on the values of numerator and denominator, and those are proper fractions and improper fractions.

Improper Fraction Definition

A fraction whose numerator is greater than or larger than the denominator is defined as an improper fraction such as 7/3 and 12/5. Improper fractions are easier to solve using addition and subtraction compared to the type of fractions such as mixed fractions.

Improper Fraction and Mixed Fraction

An improper fraction is a fraction whose numerator is greater than or equal to its denominator. For example, 9/4, 4/3 are improper fractions. Numerically, they are always equal to or greater than 1. On the other hand, a mixed fraction is a fraction that is written as a combination of a natural number and a proper fraction. It is a simplified form of an improper fraction. For example, \( 21\dfrac{4}{5}, 16\dfrac{2}{3}\) are mixed fractions. Numerically, a mixed fraction is always greater than 1. Also, any mixed fraction can be written as an improper fraction.

Generally, in real life, mixed fractions are easier to interpret and compare, as compared to improper fractions. We can easily convert any improper fraction to a mixed number or mixed fraction to an improper fraction by following some basic steps that you will study in later sections on this page.

Converting Improper Fractions to Decimals

Fractions and decimals are two ways to represent numbers. Improper fractions can be converted to decimals easily by dividing the numerator with the denominator. Let’s look at a quick and easy example of how we can convert improper fractions to decimals. Let’s consider the following example.

Example: Convert the given improper fraction to a decimal: 10/4.

The first step is to divide 10 by 4. When we do so, we will get 10 ÷ 4 = 2.5.

Here, 10/4 is an improper fraction and 2.5 is a decimal. Similarly, the value of 3/2 is 1.5 in decimals and 5/2 is 2.5 in decimals. When we convert an improper fraction to a decimal, the decimal value is always greater than 1.

Converting Improper Fractions to Mixed Numbers

The denominator of the mixed fraction form of an improper fraction is always the same as that of the original fraction. Mixed numbers are considered as the simplified form of improper fractions, that is why it is important to learn this conversion. For converting an improper fraction to a mixed number, we have to follow the below-listed steps:

• Step 1- Divide the numerator with the denominator.
• Step 2- You will get values of quotient and remainder.
• Step 3- Arrange those values of the quotient, remainder, and divisor in the following manner to express a fraction as a mixed number: \(Quotient\dfrac{Remainder}{Divisor}\).

Let’s look at a quick and easy example of how we can convert improper fractions to mixed numbers. Let’s say you have an improper fraction, 13/4. The first step is to divide 13 by 4. We get 3 as the quotient with a remainder of 1. Next, we will place 1 as the numerator, 4 as the denominator, and 3 as the whole number. Thus, we get the mixed fraction: \( 3\dfrac{1}{4}\).

Similarly, let’s solve another example. Here, we have an improper fraction: 9/2. On dividing 9 by 2, we get 4 as the quotient with a remainder of 1. Again, we will repeat the same process. We will place 1 as the numerator, 2 as the denominator, and 4 as the whole number. Thus, we get the mixed fraction: \(4\dfrac{1}{2}\).

How to Solve Improper Fractions?

Solving improper fractions mean performing arithmetic operations on them and simplifying the value of the answer so obtained. There are mainly four arithmetic operators in mathematics and those are addition, subtraction, multiplication, and division. Solving an improper fraction is the same as solving any other proper fraction, the only difference is that, here, we have to simplify the answer and write it in mixed numbers.

Let's solve the improper fraction: 4/3 + 7/3.

Step 1: We have the same denominator for both the fractions. Therefore, we will directly add the numerators 4 and 7. We get 11. Thus, on adding improper fractions, we get 11/3.

Step 2: Simplifying the improper fraction (dividing 11 by 3), we will get 3 as a whole, 2 as a numerator, and 3 as the denominator.

The answer is \(3\dfrac{2}{3}\).

Related Articles on Improper Fractions

Check the following topics related to the concept of improper fractions.

• Improper Fraction to Mixed Number
• Mixed Number to Improper Fraction
• Improper Fraction to Mixed Number Calculator
• Types of Fractions