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Ratio & Proportion Class 6 PPT

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 Page 1


Chapter-XII
Ratios and Proportions
Page 2


Chapter-XII
Ratios and Proportions
Introduction
? We normally compare two quantities by taking the 
difference between them.
? But most often this does not work out well.
? For such cases we use what is called a ratio.
Page 3


Chapter-XII
Ratios and Proportions
Introduction
? We normally compare two quantities by taking the 
difference between them.
? But most often this does not work out well.
? For such cases we use what is called a ratio.
What is a Ratio ?
? A ratio is a comparison between similar quantities using 
division.
? Note that for using ratio, the quantities need to be 
similar.
? We represent a ratio of two quantities say ‘a’ and ‘b’ by         
a : b = a / b . 
Page 4


Chapter-XII
Ratios and Proportions
Introduction
? We normally compare two quantities by taking the 
difference between them.
? But most often this does not work out well.
? For such cases we use what is called a ratio.
What is a Ratio ?
? A ratio is a comparison between similar quantities using 
division.
? Note that for using ratio, the quantities need to be 
similar.
? We represent a ratio of two quantities say ‘a’ and ‘b’ by         
a : b = a / b . 
Example 
? For example, if Ramesh scores 80 marks in an exam and 
Suresh scores 60 marks, then the ratio of their marks is 
80:60=80/60=4/3=4:3.
? Thus we see that two different ratios can be equal, for 
example in the above 80:60=4:3 . Hence they can be taken 
as a sort of equal measures . 
? In a ratio, the ordering is important. Thus 3:4 is different 
from 4:3. Compare these to division. Is ¾ = 4/3 ? No. And 
hence the same in case of ratios. 
Page 5


Chapter-XII
Ratios and Proportions
Introduction
? We normally compare two quantities by taking the 
difference between them.
? But most often this does not work out well.
? For such cases we use what is called a ratio.
What is a Ratio ?
? A ratio is a comparison between similar quantities using 
division.
? Note that for using ratio, the quantities need to be 
similar.
? We represent a ratio of two quantities say ‘a’ and ‘b’ by         
a : b = a / b . 
Example 
? For example, if Ramesh scores 80 marks in an exam and 
Suresh scores 60 marks, then the ratio of their marks is 
80:60=80/60=4/3=4:3.
? Thus we see that two different ratios can be equal, for 
example in the above 80:60=4:3 . Hence they can be taken 
as a sort of equal measures . 
? In a ratio, the ordering is important. Thus 3:4 is different 
from 4:3. Compare these to division. Is ¾ = 4/3 ? No. And 
hence the same in case of ratios. 
Proportions 
? We can also compare two ratios. We do so by using 
proportions.
? If two ratios are the same then we say that they are in 
proportion.
? We denote a proportion by ::. Thus if ‘a : b = c : d’ , then    
‘a : b :: c : d’ . 
? As in a ratio, so also in a proportion the ordering of the 
numbers is important.
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FAQs on Ratio & Proportion Class 6 PPT

1. What is the difference between a ratio and a proportion?
Ans. A ratio compares two quantities or numbers, while a proportion compares two ratios. In a ratio, the quantities being compared may or may not be related, whereas in a proportion, the ratios being compared are equivalent.
2. How can ratios be expressed?
Ans. Ratios can be expressed in different ways. They can be written using the word "to" or a colon (":"). For example, a ratio of 2:3 means that the first quantity is 2 and the second quantity is 3. Ratios can also be written as fractions, such as 2/3.
3. What are some real-life examples of ratio and proportion?
Ans. Ratios and proportions can be found in various aspects of daily life. For example, a recipe that calls for 2 cups of flour and 3 cups of sugar has a ratio of 2:3. Similarly, if a car travels 60 miles in 2 hours, the ratio of miles to hours is 60:2, which can be simplified to 30:1.
4. How can ratios and proportions be used in problem-solving?
Ans. Ratios and proportions are commonly used in problem-solving to find unknown quantities. By setting up and solving proportions, we can determine missing values. For example, if we know that the ratio of boys to girls in a class is 3:5 and there are 24 girls, we can use a proportion to find the number of boys.
5. Can ratios and proportions be applied to financial situations?
Ans. Yes, ratios and proportions are applicable in financial situations. For instance, the concept of interest rates can be expressed as a ratio or proportion when calculating the amount of interest earned or paid on a loan or investment. Ratios and proportions can also be used in analyzing financial statements and comparing financial data between different periods or companies.
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