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Fractions are part of a whole. For example, if an object is divided into two equal parts, the value of each part is half or one-half of the total number of objects. Fractions can be expressed in the form:

[tex] \frac{a}{b} [/tex]

a is the numerator
b is the denominator

DISCUSSION

Fractions also have fractions in different forms but have the same value which are called equivalent fractions. Fractions can also be simplified. To find a fraction equal to a fraction, we can multiply (×) or divide (÷) the numerator and denominator of the fraction by the same number. And to simplify fractions, we can divide (÷) the numerator and denominator of the fraction with the same number.

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There are various forms of fractions, including:

Common Fractions are fractions that consist of a numerator and denominator.
Mixed fractions are fractions that consist of whole numbers and fractions. If the numerator of a fraction is greater than the denominator, the fraction can be converted into a mixed number. To get the mixed number form of a common fraction, divide the numerator of the fraction by the denominator.
A decimal fraction is a fraction of tenths, hundredths, thousandths, and so on written using a comma (,).
Percents are another form of fraction with a denominator of one hundred. Percent is written with the symbol %.

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Now from the discussion above, it turns out that ordinary fractions still have two more types, namely =

Pure Fraction

➳ A pure fraction is a fraction whose numerator is smaller than the denominator.

Impure fractions

➳ An impure fraction is a fraction whose numerator is greater than its denominator.

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The arithmetic operations also apply to fractions, including:

Addition (+)
Subtraction (-)
Multiplication (×)
Division (÷)

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Answer Details:

Subject: Mathematics

Grade: 5

Question Code: 2

Material : Chapter 5 - Fractions

Categorization Code : 5.2.5

Keywords: Definition of Fractions, Types of Fractions