Types of Fractions

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Proper &amp; Improper Fractions

Fractions were invented to represent parts of a whole. Hence initial understanding of fractions was that they are less than the whole. Conceptualized as numbers, fractions were always assumed to be less than 1.

As humans became comfortable working with fractions, they realized that the idea could also be applied to quantities which were more than a whole but also contained parts of the whole. These fractions had a value greater than 1. Their numerator is bigger than the denominator i.e a&gt;b.

To differentiate fractions which were greater than 1, they were called &ldquo;Improper Fractions&rdquo;. The &ldquo;normal&rdquo; fractions, which were less than 1 were called &ldquo;Proper Fractions&rdquo;. Teachers should once again clarify that the term improper is just a mathematical term without any value connotations. There is nothing &lsquo;improper&rsquo; about an improper fraction!

Unit Fractions

In the early days of visualizing fractions &amp; operations with them, mathematicians found it easy to imagine fractions as representing &ldquo;a single part out of a whole which has been divided into several parts.&rdquo; In practice this works out to be fractions where the numerator is always 1, regardless of the value of the denominators. Examples are &frac12;, 1/3, 1/7 etc.

They would try and express any other fraction, say &ldquo;3 parts out of a whole divided into 4 equal parts&rdquo; as a sum of fractions where the numerator was always 1. In the above case, it was represented as. Such fractions whose numerator was always 1, were called Unit Fractions

Like &amp; Unlike Fractions

It was also realized that fractions could compared, added or subtracted only if they were parts of the same whole, divided into the same number of parts. I.e their denominators had to be same. Such fractions are called Like Fractions. 3/7, 5/7 &amp; 1/7 are Like Fractions.

All other fractions which did not have the same denominator are called Unlike Fractions.

Mixed Fractions or Mixed Numbers

An improper fraction can be seen in 2 perspectives. Let us think of a transaction event where a pizza parlor &ldquo;only &ldquo;sells pizzas divided into 4 slices and we want to order 7 slices.

We can think of the total order 7/4. I.e 7 slices out of a whole divided into 4. This is a standard way an improper fraction is represented.

We can also think of the entire order as being made of a whole pizza (4 slices) and 3 slices of a whole pizza which is divided into 4 slices. This can be represented as 1 &frac34;. This way of writing an improper fraction is called Mixed Fraction or Mixed Number.

It is written simply as 1. Though it actually means 1 + &frac34;, by convention, the &lsquo;+&rsquo; sign is not written because the whole number part looks quite different from the fraction part. This also saves time.

Such decisions are called Conventions rather than concepts. It is just a convenient way which is adopted by one and all. There is no other logic behind it.

Irrational Numbers

There are some fractions which are called Irrational Numbers. These would be dealt with in chapter 17.10.

Equivalent Fractions

These are alternate ways of expressing the same &ldquo;fraction&rdquo; with a different set of numbers.

Give examples&hellip;.

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