# Fractions are an essential part of mathematics In mathematics, there are various types of quantities. All of those numbers are significant. It is critical to understand all of these quantities and their formations. Whole numbers are the first type of quantity. They are used to represent a specific and fixed amount. They can be used in a variety of problems where the subject needs to be represented by a definite quantity. It has been observed that dealing with problems involving whole numbers is relatively simple. A fraction is the other type of quantity. It can be used in a variety of questions involving partial values. Fractions are used in many important areas of mathematics. Other subjects, such as physics and chemistry, make extensive use of them. Many numerical problems in these critical subjects are solved using fractions. There are many different types of fractions, including equivalent fractions, mixed fractions, proper fractions, and many more. An equivalent fraction is one in which the numerator and denominator of two different fractions can be divided by common terms to yield a common value. It is critical to have adequate information about all of these quantities. This is because questions can only be answered once you have a thorough understanding of the various types of fractions. Fractions are also important in calculating the percentage of a given quantity.

A definite percentage of a specific quantity can be easily computed using the proper fractional operations.

This article discusses the various types of fractions and their importance in answering various types of questions. It is critical to developing clarity in this topic because it is a fundamental component of basic mathematics.

Different types of functions and their significance:

• A mixed fraction is a type of fraction. When the value of the numerator greatly exceeds the value of the denominator, the mixed fraction is formed using division. The quotient is at the beginning, and the remainder is at the end with the denominator. To convert the mixed fraction to a normal fraction, multiply the denominator by the quotient and then add the remainder to the result.
• Proper fraction: A fraction in which the numerator value is less than the denominator value. It has been discovered that performing all operations on proper fractions is relatively easier. When this fraction is converted to decimal, the value obtained is less than one, which is a common way to identify the proper fractions.
• Improper fraction: Improper fractions are fractions in which the value of the denominator is less than the value of the numerator. Converting improper fractions to decimals identifies them. There will always be more than one result.
• Like fractions: This term refers to the relationship between two common fractions. When the denominators of two fractions have the same value, the fractions are said to be like fractions. It is very simple to compare fractions and perform addition and subtraction operations on them.
• Unlike fractions: Two fractions with distinct denominators are referred to as, unlike fractions. By taking the lcm of the denominators and then multiplying the numerator and denominator of the two fractions by a common term in both fractions until the value equals the lcm, two, unlike fractions, can be converted into like fractions. After converting the unlike fractions to like fractions, the two fractions can be easily added and subtracted from or compared.

This article discusses the various types of fractions number Fractions are used extensively in chapters such as percentage, simple interest, compound interest, and many others. This is one of the reasons why it is critical to understand fractions. Students can use Cuemath to clarify any questions they have about this chapter. It is an effective online platform for students to clear their doubts about Mathematics and Coding. 