full method fraction please
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Answer:
A fraction (from Latin fractus, "broken") represents a part of a whole or, more generally, any number of equal parts.
Step-by-step explanation:
When spoken in everyday English, a fraction describes how many parts of a certain size there are, for example, one-half, eight-fifths, three-quarters.
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Answer:
Fractions are numbers that represent a part of the whole. When an object or a group of objects is divided into equal parts, then each individual part is a fraction. A fraction is usually written as 1/2 or 5/12 or 7/18 and so on. It is divided into a numerator and denominator where the denominator represents the total number of equal parts into which the whole is divided. The numerator is the number of equal parts that are taken out. For e.g. in the fraction 3/4, 3 is the numerator and 4 is the denominator.
Real Life Example of a Fraction
It’s your birthday and mom has ordered pizza for you and your friends. When the pizza arrives, you open the box and find that it is cut into slices. Let’s assume that there are 8 slices and you have 7 friends. So, there are 8 people who are going to eat the 8 slices of the pizza.
fraction
How much does each person get? Well, if we divide the entire pizza into eight equal parts, then each person gets 1/8 or one-eighth of the pizza. The pizza can be cut into a different number of equal slices creating different fractions. (Like a 6-slice pizza or a 4-slice pizza or a 12-slice pizza)
Fractions on a Number Line
Fractions can also be shown on a number line just like whole numbers. Let’s try and plot 1/2 on a number line. Now, we know that 1/2 is greater than 0 but lesser than 1. Hence, it lies between 0 and 1. Further, since the denominator is 2, we divide the distance between 0 and 1 into two equal parts. Refer diagram below:
fraction
Let’s look at one more example. How can we show 2/3 on a number line? Again, we know that 2/3 is greater than 0 but less than 1 (since the numerator is smaller than the denominator). Next, since the denominator is 3, we divide the distance between 0 and 1 into three equal parts. Now, 2/3 is two parts out of these three parts as shown below:JOIN NOW
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Maths > Fractions > Introduction to Fraction
Fractions
Introduction to Fraction
Fractions are numbers that represent a part of the whole. When an object or a group of objects is divided into equal parts, then each individual part is a fraction. A fraction is usually written as 1/2 or 5/12 or 7/18 and so on. It is divided into a numerator and denominator where the denominator represents the total number of equal parts into which the whole is divided. The numerator is the number of equal parts that are taken out. For e.g. in the fraction 3/4, 3 is the numerator and 4 is the denominator.
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Questions
Express each of the following as a fraction in simplest form:
66
2
3
%
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Simplification of the fraction
2
1
3
gives
1 Verified answer
Put the
(
✓
)
,
wherever applicable
Number
Natural Number
Whole Number
Integer
Fraction
Rational Number
−
19
3
4
1 Verified answer
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Real Life Example of a Fraction
It’s your birthday and mom has ordered pizza for you and your friends. When the pizza arrives, you open the box and find that it is cut into slices. Let’s assume that there are 8 slices and you have 7 friends. So, there are 8 people who are going to eat the 8 slices of the pizza.
fraction
How much does each person get? Well, if we divide the entire pizza into eight equal parts, then each person gets 1/8 or one-eighth of the pizza. The pizza can be cut into a different number of equal slices creating different fractions. (Like a 6-slice pizza or a 4-slice pizza or a 12-slice pizza)
Fractions on a Number Line
Fractions can also be shown on a number line just like whole numbers. Let’s try and plot 1/2 on a number line. Now, we know that 1/2 is greater than 0 but lesser than 1. Hence, it lies between 0 and 1. Further, since the denominator is 2, we divide the distance between 0 and 1 into two equal parts. Refer diagram below:
fraction
Let’s look at one more example. How can we show 2/3 on a number line? Again, we know that 2/3 is greater than 0 but less than 1 (since the numerator is smaller than the denominator). Next, since the denominator is 3, we divide the distance between 0 and 1 into three equal parts. Now, 2/3 is two parts out of these three parts as shown below:
fraction
Proper, Improper and Mixed Fractions
In a fraction there are two simple possibilities:
The numerator is smaller than the denominator
The numerator is bigger than the denominato
Proper, Improper and Mixed fractions
Proper Fraction
When the numerator is smaller than the denominator, it is a Proper Fraction. These fractions are less than 1 and none of them lies beyond 1 on the number line. The denominator represents the number of equal parts in which