There are infinitely many different ways to make groups of fractions that sum to 1.
A lot too many to be listed cause one could be 7 and 1/billionth in fact that are an infinite number of fractions between 7 and 8, just like there are an infinite number of numbers, the fractions would just get smaller and smaller.
Two ways. 3 and 1/2 or 7/2. That's proper and improper fractions.
There are infinitely many fractions and decimals between 0 and 1.
Any number that can be expressed as a fraction is rational and there are plenty of fractions from -1 to 0
There are infinitely many different ways to make groups of fractions that sum to 1.
1
An infinite number
There are too many of those to list here. In fact, there are an infinite number of them. So if I listed 16 trillion, there would still be an infinite number more.
The three improper fractions that equal the whole number 3 are 9/3, 6/2, and 3/1. These fractions show different ways to represent the whole number 3 using improper fractions.
Simplified - it is 1/4. There are millions of different equivalent fractions for 1/4 !
A lot too many to be listed cause one could be 7 and 1/billionth in fact that are an infinite number of fractions between 7 and 8, just like there are an infinite number of numbers, the fractions would just get smaller and smaller.
Two ways. 3 and 1/2 or 7/2. That's proper and improper fractions.
Any one of the infinitely many proper fractions is a rational number between 1 and 0.
Since the number scale is continuous, there is an infinite amount.
There an infinite number of fractions between them. 1/4 is one of them.
Fractions and decimals are different ways of notating the same thing: a number that falls between two whole numbers. In its simplest form, think about a distance or a value that is exactly halfway between 3 and 4 of something. As a mixed number, that would be 3 and 1/2 As a fraction, that would be 7/2 As a decimal, that would be 3.5 Some people refer to mixed fractions or decimal fractions to underscore the fact that they're all the same.