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# DIFFERENT TYPES OF FRACTIONS- GUIDANCE

In this day and age, arithmetic is the key behind each advancement. From space to the middle of the earth, everything incorporates science. Arithmetic is like a gigantic sea where you can track down fundamental valuable minerals if you dive deep inside it. This subject includes bunches of tools that can bring the explanation for each conceivable thing.

Each part of science incorporates proficient devices like division, fractions, and so forth.  This apparatus is the premise behind each complex math. Even fraction is further divided into equivalent fraction, proper fraction, and a few more.

What is the understanding behind fractions?

Fraction is a part of our daily talk. For example, you go to the market and ask for 1 kg wheat, then mathematics states that you are asking for a fraction of wheat. In easy words, you are asking for a portion of wheat from the whole quantity of wheat.

A fraction is a mathematic tool that talks about a specific portion of the object from the whole quantity. Fraction shown in mathematics consists of two parts. The upper part of the fraction is called the numerator. The lower part is called the denominator.  The numerator of the fraction represents the portion you are referring to. The denominator represents the entire quantity.

For example,

• If you take 3 slices of cake out of 8 slices. Then fraction will be represented as 3/8, where 3 is the numerator.8 is the denominator.
• If you divide the pizza into four parts. Take one portion from the four-part then the fraction can be expressed as 1/4, where 1 is the numerator. 4 is the denominator.
• If you take 5 red balls from the collection of 30 red balls. Then the fraction will be represented as 5/30, where 5 represents the number of ball you took. 30 represents the total number of ball in the collection.

The different variety of fractions.

Like all other mathematic tools fractions too have subparts that make the understanding of fractions more lucid.

• Unit fraction:- Unit fraction can be expressed in the form where the value of the numerator is one. For example, 1/7,1/8,1/9.
• Proper fraction:- Proper fraction can be expressed in the form where the value of the denominator exceeds the value of the numerator. For example, 8/10,5/9,6/8
• Improper fraction:Improper fraction can be expressed in the form where the value of the numerator exceeds the value of the denominator. For example,15/9,17/8,5/3
• Mixed fraction:- Mixed fraction can be expressed as the mixture of a whole number and proper frac tion. For example,  9 ⅖, 8⅘,7⅚.
• Like fractions:- Two fraction can be stated as like fractions when two fractions have an equal denominator. For example, 5/7,6/7. Here the two fractions have 7 as a denominator, so 5/7 and 6/7 are like fractions.
• Unlike fractions:- Two fractions can be said as unlike frac tions when two fractions have a distinguishable denominator. For example, 4/9,5/8. Here the denominator is not the same, so 4/9 and 5/8 are unlike fractions.
• Equivalent fraction:-  Equivalent fraction can be expressed when two fractions land on a similar result. For example, 4/2 and 6/3. Here, 2 is the result of both the fraction (4/2=2, 6/3=2). Hence, 4/2 and 6/3 are equivalent fractions.

Conclusions

The word fractions might sound complex yet in an actual circumstance, it is incredibly simple to execute the number of components. Assuming you want the direction of specialists, you can choose to pick Cuemath because they have specialists who can give you a point-by-point picture about any part of arithmetic. These specialists can address every one of your questions with legitimate clarification so you can tackle the issue precisely from the following time.

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