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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.Read More
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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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