Generally, a fraction is used to represent many equal parts. It can be used to describe how many parts of a particular size are present. There are different types of fractions, such as equivalent fractions, mixed fractions, improper fractions, and so on.

There are two parts in some parts, namely the numerator – the number written above the dividing line and the denominator – the number written below the line. It should be noted that a small fraction will never be zero. This is because zero parts will never form completely.

An example of a fractional number is ¾. Where 3 is the fractional numerator given and 4 is the corresponding denominator. Thus, the numerator gives us the details that a fraction represents 3 equal parts, and the denominator tells us that 4 parts are used to make a total.

Table of Contents

**Types of Fractions**

**1.** **Appropriate Fractions**

The fraction in which the numerical value is less than the denominator value is known as the positive fraction. Numerator <DenominatorWhen we simplify the right fraction, its value is always less than 1. ¾ is an example of the correct fraction.

**2.** **Incorrect fraction**

The fraction where the denominator value is less than the numerator value is known as the negative fraction. Numerator> Denominator. If we simplify the wrong fraction, its value will always be greater than or equal to 1. An interesting fact to note is that all natural numbers can be represented in the form of a negative fraction and a denominator equal to 1. 4/3, 8/1 are examples of incorrect fractions.

**3.Mixed Components**

The wrong fraction can be represented as a natural number and a fraction. Such a presentation is called a mixed fraction. Example 2 ½ is a mixed fraction. A mixed fraction can be converted to a negative fraction, and its value will always be greater than 1.

**4.** **Like Fractions**

A group of fractions with the same name is called fractions. Eg, 7/6, 5/6, ⅙ all resemble fractions. Adding functions such as adding, subtracting, separating, and multiplying fractions are very easy when working with them.

**5.** **Unlike Fractions**

A group of fractions that do not have the same number of references is called, in contrast to fractions. 5/7, 8/3, 2/9 are examples of different fractions. The process of applying mathematical variations is complex as it involves installing a denominator and solving problems.

**6.** **Equal Fragments**

If we have two fractions representing the same total value after simplification, they are known as equal fractions. For example, ½ and 2/4 are not equal parts. For simplicity, 2/4 results in ½. This means that the two components are equal.

**The conclusion**

There are many sister titles associated with fractions, such as percentages, decimals, etc. Therefore, it is very important for young minds to have a clear understanding of this topic. Finding the right direction is the best way to ensure that the child has a solid knowledge of the concept of fractions.

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