Formulas and Solved Examples on Ratio Percentage Profit and Loss
An Overview of Comparing Quantities
In this chapter, you will learn more about the practical and daily use of comparing quantities. NCERT solutions for class 7th maths chapter 8 help you understand the benefits of ratios, percentages and interactions between simple numbers to solve the questions that will come in your exams.
The word ‘percent’ comes from a Latin word - per centum. It translates to ‘every hundred’ or ‘per hundred’. You will learn how percentages are measured here.
Another aspect of chapter 8 is comparing quantities using proportion.
In this chapter, we shall practise:
How to convert fractional measures into percentages.
How to change decimal points into percentages.
How to convert any ratio into a percentage.
Once we understand percentages, we will be able to successfully solve questions in comparing quantities class 8.
Important Comparing Quantities for Class 7
Here are some solved examples of questions you are likely to face.
Comparing Quantities Exercise 8.1
Question 1:
Calculate the ratios of the following quantities:
Rs 5 to 50 paise
30 days to 36 hours
9 metres to 27cm
Solutions:
To solve problems related to ratios in currency terms, you must bring both sides down to a common unit.
We know 5 x 100 paise is Rs 5. Re 1 has 100 paise. To calculate the ratio:
500/50= 10 : 1.
Similarly, we will break down time into hours and minutes to calculate ratios.
30 days have 30x24 or 720 hours. The ratio is 720/36=20 : 1.
Again, we will break down these quantities into their lowest denominations.
9 metres equals 9 x 100 or 900 cm. The ratio here is 900/27 or 100/3=30:1.
Here is another example to help you face questions in class 8 maths comparing quantities.
The state of Rajasthan has an area of 3 Lakh km2. It has a population of 570 lakhs. UP has an area of 2 Lakh km2 but it has a population of 1660 lakhs. Solve:
Which state has a higher population density?
How many people live in each square kilometre in these states?
Solution: Comparing quantities helps you solve this easily.
Answers: Population density is calculated based on the number of people living in one square km. Hence, in Rajasthan, it is 570 Lakh/3 lakhs every km2= 190 people every km2.
Using a similar equation, UP’s population density is 1660 lakhs/2 Lakh km2= 830 people in every square kilometre.
Thus, UP has a higher density of population. This is a textbook case of class 7 maths comparing quantities.
Did you know? UP is one of the most densely populated states in India. Take a look at this map based on data obtained via the 2011 Census!
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NCERT Solutions for Class 8 Maths Comparing Quantities
Exercise 8.2
In this section, we will learn how to convert any fractional numbers to percentages.
Question 1: Convert these fractions into percentages:
1/8 B. 5/4 C. 3/40 D. 2/7
Solution: A: 1/8=1/8 x 100%=12.5%
Likewise, B: 5/4=5/4 x 100%=5 x 25%=125%
Again, C: 3/40=3/40x100=3/2x5%=7.5%
Finally, D: 2/7=2/7x100=200/7=28.47%
Task for you: To sharpen your class 7 comparing quantities, solve the following problem:
Question
Here are three circles with coloured parts. You have to calculate the percentage of the coloured bits.
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Solution:
In circle A, the total coloured part is ¼ or 25%.
In circle B, the coloured section is 3 out of 5. Hence, the percentage is 3/5 or 60%.
In circle C, there are 8 divisions. 3 are coloured. Thus, the percentage is 3/8 or 37.5%.
NCERT Maths Solution Class 8 Comparing Quantities
Here, we will learn how to use comparing quantities to convert ratios into percentages.
Question:
Here are four ratios. You must convert them into percentages.
3:1 B. 2:3:5 C: 1:4 D: 1:2:5
Solutions:
A: 3:1
Here, total fractional part is 3+1 or 4.
That means fractional parts are ¾: ¼.
Percentage is derived by multiplying each with 100.
Thus, Percentage of Parts is 75%:25%
B: 2:3:5
Here, total fractional part is 2 + 3 + 5=10.
Fractional parts are 2/10: 3/10: 5/10.
Percentage of Parts is: 20%:30%:50%
C: 1:4
Here, total fractional part is 1 +4=5.
Fractional parts are 1/5: 4/5.
Percentage of Parts is: 20%:80%
D: 1:2:5
Here, total fractional part is 1 + 2 + 5=8.
Fractional parts are: 1/8: 2/8: 5/8.
Percentage of Parts is: 12.5%:25%:62.5%
Tip for advanced students: Form a team where you can collect previous years’ question papers. Set timers and check who finishes comparing quantities class 8 NCERT solutions first. It will give you an idea of how quickly time runs out in such examinations.
As an addition, you will achieve mastery over NCERT solutions class 8 comparing quantities.
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FAQs on Comparing Quantities in Maths with Concepts and Applications
1. What is comparing quantities in maths?
Comparing quantities in maths means finding how one quantity relates to another using ratio, percentage, or difference. It helps us determine how much more, less, greater, or smaller one value is compared to another.
- It can be done using ratios (e.g., 2:3).
- Using percentages (e.g., 20% increase).
- By finding the absolute difference (e.g., 15 − 10 = 5).
2. What is the formula for percentage?
The formula for percentage is (Part ÷ Whole) × 100. It expresses a quantity as a fraction of 100.
- Step 1: Divide the given part by the whole.
- Step 2: Multiply the result by 100.
- Example: If 25 out of 50 students passed, Percentage = (25 ÷ 50) × 100 = 50%.
3. How do you convert a fraction into a percentage?
To convert a fraction into a percentage, multiply the fraction by 100%.
- Formula: Fraction × 100%
- Example: 3/4 × 100% = 0.75 × 100% = 75%.
4. What is the difference between ratio and percentage?
A ratio compares two quantities directly, while a percentage compares a quantity to 100.
- Ratio example: 2:5 (comparison of two numbers).
- Percentage example: 40% (means 40 out of 100).
- Ratios do not require 100 as a base, but percentages always do.
5. How do you calculate percentage increase?
Percentage increase is calculated using the formula ((New Value − Old Value) ÷ Old Value) × 100.
- Step 1: Find the increase (New − Old).
- Step 2: Divide by the old value.
- Step 3: Multiply by 100.
- Example: From 50 to 60 → Increase = 10 → (10 ÷ 50) × 100 = 20%.
6. How do you calculate percentage decrease?
Percentage decrease is calculated using ((Old Value − New Value) ÷ Old Value) × 100.
- Step 1: Find the decrease (Old − New).
- Step 2: Divide by the old value.
- Step 3: Multiply by 100.
- Example: From 80 to 60 → Decrease = 20 → (20 ÷ 80) × 100 = 25%.
7. What is profit and loss in comparing quantities?
Profit and loss compare the Cost Price (CP) and Selling Price (SP) of an item.
- Profit = SP − CP
- Loss = CP − SP
- Profit% = (Profit ÷ CP) × 100
- Loss% = (Loss ÷ CP) × 100
8. How do you calculate discount percentage?
Discount percentage is calculated using (Discount ÷ Marked Price) × 100.
- Step 1: Discount = Marked Price − Selling Price.
- Step 2: Divide discount by Marked Price.
- Step 3: Multiply by 100.
- Example: MP = 500, SP = 400 → Discount = 100 → (100 ÷ 500) × 100 = 20%.
9. What is simple interest formula in comparing quantities?
The formula for simple interest is SI = (P × R × T) ÷ 100.
- P = Principal amount
- R = Rate of interest per year
- T = Time in years
- Example: P = 1000, R = 5%, T = 2 → SI = (1000 × 5 × 2) ÷ 100 = 100.
10. Why are percentages important in comparing quantities?
Percentages are important because they provide a standard way to compare quantities using a base of 100.
- They make comparisons easy across different totals.
- Used in exams, statistics, finance, and business.
- Help measure increase, decrease, profit, loss, and interest.
