Class 8 Exam  >  Class 8 Notes  >  Mathematics (Maths) Class 8  >  NCERT Solutions: Comparing Quantities (Exercise 7.1, 7.2, 7.3)

NCERT Solutions for Class 8 Maths - Comparing Quantities - 1 (Exercise 7.1)

NCERT Solutions for Class 8 Maths - Comparing Quantities - 1 (Exercise 7.1)

Try These Questions (Page No. 81) 

Q1: In a primary school, the parents were asked about the number of hours they spend per day in helping their children to do homework. There were 90 parents who helped for 1/2 hour to NCERT Solutions for Class 8 Maths - Comparing Quantities - 1 (Exercise 7.1) hours. The distribution of parents according to the time for which, they said they helped is given in the adjoining figure; 20% helped for more than NCERT Solutions for Class 8 Maths - Comparing Quantities - 1 (Exercise 7.1) hours per day; 30% helped for 1/2 hour to NCERT Solutions for Class 8 Maths - Comparing Quantities - 1 (Exercise 7.1) hours; 50% did not help at all.

NCERT Solutions for Class 8 Maths - Comparing Quantities - 1 (Exercise 7.1)

Using this, answer the following:
(i) How many parents were surveyed?
(ii) How many said that they did not help?
(iii) How many said that they helped for more than NCERT Solutions for Class 8 Maths - Comparing Quantities - 1 (Exercise 7.1) hours?
Ans:
(i) Since, 30% of total surveyed parents helped their children for "1/2 hours to  NCERT Solutions for Class 8 Maths - Comparing Quantities - 1 (Exercise 7.1)hours”. And 90
parents helped their children for “ 1/2 hours to NCERT Solutions for Class 8 Maths - Comparing Quantities - 1 (Exercise 7.1) hours”.
∴ 30% [surveyed parents] = 90
or 30/100 * [surveyed parents] = 90
or surveyed parents =  90 *100/30
= 3 * 100
= 300

(ii) Since 50% of surveyed parents did not help their children.
∴ Number of parents who did not help = 50% of surveyed parents
= 50% of 300
= 50/100 * 300 = 150

(iii) Since, 20% of the surveyed parents help their children for more than NCERT Solutions for Class 8 Maths - Comparing Quantities - 1 (Exercise 7.1) hours.
i.e. 20% of surveyed parents help for more than NCERT Solutions for Class 8 Maths - Comparing Quantities - 1 (Exercise 7.1) hours.
∴ Number of parents who helped for more than NCERT Solutions for Class 8 Maths - Comparing Quantities - 1 (Exercise 7.1) hours = 20% of 300
= 20/100 * 300
= 20 * 3 = 60
Note: ‘of’ means multiplication.

Exercise 7.1

Q1: Find the ratio of the following.

(a) Speed of a cycle 15 km per hour to the speed of scooter 30 km per hour.

(b) 5 m to 10 km 

(c) 50 paise to ₹ 5

Sol: (a) Ratio of the speed of the cycle to the speed of the scooter = 15/30 = 1/2 = 1 : 2

(b) Since 1 km = 1000 m

5m/10 km = 5 m/(10 × 1000)m = 5/10000 = 1/2000 = 1 : 2000

The required ratio is 1 : 2000

(c) Since, ₹1 = 100 paise

50 paise/₹5 = 50/(5 × 100) = 50/500 = 1/10 = 1 : 10

The required ratio is 1 : 10

Q2: Convert the following ratios to percentages.
(a) 3 : 4             
(b) 2 : 3
Sol:
(a) 3 : 4 = 3/4 = 3/4 × 100% = 0.75 × 100% = 75%
(b) 2 : 3 = 2/3 = 2/3 × 100% = 0.666 × 100% = 66.66% = 66⅔%

Q3: 72% of 25 students are interested in mathematics. How many are not interested in mathematics?
Sol: It’s given that 72% of 25 students are good in mathematics
So, the percentage of students who are not good in mathematics = (100 – 72)% = 28%
Here, the number of students who are good in mathematics = 72/100 × 25 = 18
Thus, the number of students who are not good in mathematics = 25 – 18 = 7
[Also, 28% of 25 = 28/100 × 25 = 7]
Therefore, 7 students are not good in mathematics.

Q4: A football team won 10 matches out of the total number of matches they played. If their win percentage was 40, then how many matches did they play in all?
Sol: Number of matches won by the team = 10
∵ The team won 40% of total number of match.
∴ 40% of [Total number of match] = 10
or 40/100 * [Total number of match] = 10
Total number of matches =  NCERT Solutions for Class 8 Maths - Comparing Quantities - 1 (Exercise 7.1) = 25
Thus, the total number of match played = 25

Q5: If Chameli had ₹ 600 left after spending 75% of her money, how much did she have in the beginning?
Sol: ∵ Chameli made spending of Rs 75%.
∴ She is left with Rs (100 – 75)% or Rs 25%.
But she is having Rs 600 now.
∴ 25% of total money = Rs 600
or  25/100  of total money = Rs 600
or Total money =  NCERT Solutions for Class 8 Maths - Comparing Quantities - 1 (Exercise 7.1) = Rs 600 × 4
= Rs 2400
Thus, she had Rs 2400 in the beginning.

Q6: If 60% people in a city like cricket, 30% like football and the remaining like other games, then what per cent of the people like other games? If the total number of people is 50 lakh, find the exact number who like each type of game.
Sol: ∵ People who like cricket = 60%
People who like football = 30%
∴ People who like other games = [100 – (60 + 30)]%
= [100 – 90]%
= 10%
Now, Total number of people = 50,00,000
∴ No. of people who like Cricket = 60% of 50,00,000 = 60/100 * 5000000
= 6 × 500000
= 30,00,000
No. of people who like Football = 30% of 5000000 = 30/100 * 5000000
= 3 × 500000
= 15,00,000
No. of people who like Other games = 10% of 5000000 = 10/100 * 5000000
= 1 × 500000
= 5,00,000
Thus, number of people who like
Cricket = 30,00,000
Football = 15,00,000
Other games = 5,00,000

Try These Questions (Page No. 83)

Q1: A shop gives 20% discount. What would the sale price of each of these be?
(a) A dress marked at ₹ 120  
(b) A pair of shoes marked at ₹ 750  
(c) A bag marked at ₹ 250
Ans: (a) Marked price of the dress = Rs 120
Discount rate = 20%
∴ Discount = 20% of Rs 120
= Rs 20/100 × 120
= Rs 2 × 12 = Rs 24
∴ Sale price of the dress = [Marked price] – [Discount]
= Rs 120 – Rs 24
= Rs 96

(b) Marked price of the pair of shoes = Rs 750
Discount rate = 20%
∴ Discount = 20% of Rs 750
= Rs 20/100 × 750
= Rs 2 × 75 = Rs 150
Now,
Sale price of the pair of shoes = [Marked price] – [Discount]
= Rs 750 – Rs 150 = Rs 600

(c) Marked price of the bag = Rs 250
Discount rate = 20%
∴ Discount = 20% of Rs 250
= Rs 20/100 × 250
= Rs 2 × 25 = Rs 50
∴ Sale price of the bag = [Marked price] – [Discount]
= Rs 250 – Rs 50 = Rs 200

Q2: A table marked at ₹ 15,000 is available for ₹ 14,400. Find the discount given and the discount per cent.
Ans: Marked price of the table = ₹ 15000
Sale price of the table = ₹ 14400
∴ Discount = [Marked price] – [Sale price]
= [₹ 15000] – [₹ 14400]
= ₹ 600
Discount per cent = Discount/Marked price × 100
= 600/15000 × 100%
= (2 × 2)%
= 4%

Q3: An almirah is sold at ₹ 5,225 after allowing a discount of 5%. Find its marked price.
Ans: Sale price of the almirah = ₹ 5225
Discount rate = 5%
Since, Discount = 5% of marked price
∴ [Marked price] – Discount = Sale price
or [Marked price] – 5/100 × [Marked price] = Sale price
or Marked price [1 - 5/100] = Sale price
or Marked price 95/100 = Sale price (= ₹ 5225)
or Marked price = ₹ 5225 × 100/95
= ₹ 5500

Think, Discuss, and Write Questions (Page No.84)

Q1: Two times a number is a 100% increase in the number. If we take half the number, what would be the decrease in per cent?
Sol: Let the number be x.
∴ Decrease in the number = 1/2 of x
= 1/2 of x = x/2
NCERT Solutions for Class 8 Maths - Comparing Quantities - 1 (Exercise 7.1)
NCERT Solutions for Class 8 Maths - Comparing Quantities - 1 (Exercise 7.1)
= 1/2 *100 % = 50%

Q2: By what per cent is ₹ 2,000 less than ₹ 2,400? Is it the same as the per cent by which ₹ 2,400 is more than ₹ 2,000?
Sol: Case I
Here 2000 < 2400.
i.e. 2400 is reduced to 2000.
∴ Decrease = 2400 – 2000 = 400
Thus Decrease % = NCERT Solutions for Class 8 Maths - Comparing Quantities - 1 (Exercise 7.1)
Thus, Decrease % = NCERT Solutions for Class 8 Maths - Comparing Quantities - 1 (Exercise 7.1)
Case II
2000 is increased to 2400.
∴ Increase = 2400 – 2000 = 400
∴ Decrease % = 400/2000 x 100% = 20%
Thus, Decrease % = 20%
Obviously, they are not the same.

Exercise 7.2

Q1: During a sale, a shop offered a discount of 10% on the marked prices of all the items. What would a customer have to pay for a pair of jeans marked at ₹ 1450 and two shirts marked at ₹ 850 each?
Sol: Total marked price = ₹ (1,450 + 2 × 850)
= ₹ (1,450 +1,700)
= ₹ 3,150
Given that, the discount percentage = 10%
Discount = ₹ (10/100 x 3150) = ₹ 315
Also, Discount = Marked price − Sale price
₹ 315 = ₹ 3150 − Sale price
∴ Sale price = ₹ (3150 − 315)
= ₹ 2835
Therefore, the customer will have to pay ₹ 2,835.

Q2: The price of a TV is ₹ 13,000. The sales tax charged on it is at the rate of 12%. Find the amount that Vinod will have to pay if he buys it.
Sol: On ₹ 100, the tax to be paid = ₹ 12
Here, on ₹ 13000, the tax to be paid will be = 12/100 × 13000
= ₹ 1560
Required amount = Cost + Sales Tax
= ₹ 13000 + ₹ 1560
= ₹ 14560
Therefore, Vinod will have to pay ₹ 14,560 for the TV.

Q3: Arun bought a pair of skates at a sale where the discount given was 20%. If the amount he pays is ₹ 1,600, find the marked price.
Sol: Let the marked price be x
Discount percent = Discount/Marked Price x 100
20 = Discount/x × 100
Discount = 20/100 × x
= x/5
Also,
Discount = Marked price – Sale price
x/5 = x – ₹ 1600
x – x/5 = 1600
4x/5 = 1600
x = 1600 x 5/4
= 2000
Therefore, the marked price was ₹ 2000.

Q4: I purchased a hair-dryer for ₹ 5,400 including 8% VAT. Find the price before VAT was added.
Sol: The price includes VAT
So, 8% VAT means that if the price without VAT is ₹ 100,
Then, the price including VAT will be ₹ 108
When price including VAT is ₹ 108, original price = ₹ 100
When price including VAT is ₹ 5400, original price = ₹ (100/108 × 5400)
= ₹ 5000
Therefore, the price of the hair dryer before the addition of VAT was ₹ 5,000.

Q5: An article was purchased for ₹ 1239 including GST of 18%. Find the price of the article before GST was added?
Sol: Let the Price of the article before including GST be x
Price of article including GST = ₹ 1239
GST(Goods and Service Tax) = 18 % of x =  (18 × x) = 0.18 × x
∴ Price of article including GST = Price before GST + GST
⇒ x + (0.18x) = 1239
⇒ 1.18x = 1239
∴ x = 1239/1.18 = ₹ 1050
So, the price of article before GST was added = ₹ 1050.

Exercise: 7.3

Q1: The population of a place increased to 54,000 in 2003 at a rate of 5% per annum.
(i) Find the population in 2001.
(ii) What would be its population is 2005?
Sol: Population in 2003 is P = 54000
(i) Let the population in 2001 (i.e. 2 years ago) = P
Since rate of increment in population = 5% p.a.
∴ Present population NCERT Solutions for Class 8 Maths - Comparing Quantities - 1 (Exercise 7.1)
or NCERT Solutions for Class 8 Maths - Comparing Quantities - 1 (Exercise 7.1)
or NCERT Solutions for Class 8 Maths - Comparing Quantities - 1 (Exercise 7.1)
or NCERT Solutions for Class 8 Maths - Comparing Quantities - 1 (Exercise 7.1)
= 48980 (approx.)
Thus, the population in 2001 was about 48980.
(ii) Initial population (in 2003), i.e. P = 54000
Rate of increment in population = 5% p.a.
Time = 2 years ⇒n = 2
NCERT Solutions for Class 8 Maths - Comparing Quantities - 1 (Exercise 7.1)
= 135 * 21 * 21 = 59535.
Thus, the population in 2005 = 59535.

Q2: In a laboratory, the count of bacteria in a certain experiment was increasing at the rate of 2.5% per hour. Find the bacteria at the end of 2 hours if the count was initially 5,06,000.
Sol: Initial count of bacteria (P) = 5,06,000
Increasing rate (R) = 2.5% per hour
Time (T) = 2 hour. ⇒ n = 2
NCERT Solutions for Class 8 Maths - Comparing Quantities - 1 (Exercise 7.1)
NCERT Solutions for Class 8 Maths - Comparing Quantities - 1 (Exercise 7.1)
NCERT Solutions for Class 8 Maths - Comparing Quantities - 1 (Exercise 7.1)
= 531616.25 or 531616 (approx.)
Thus, the count of bacteria after 2 hours will be 531616 (approx.).

Q3: A scooter was bought at ₹ 42,000. Its value depreciated at the rate of 8% per annum. Find its value after one year.
NCERT Solutions for Class 8 Maths - Comparing Quantities - 1 (Exercise 7.1)

Sol: Initial cost (value) of the scooter (P) = Rs 42000
Depreciation rate = 8% p.a.
Time = 1 year ⇒ n = 1
NCERT Solutions for Class 8 Maths - Comparing Quantities - 1 (Exercise 7.1)
NCERT Solutions for Class 8 Maths - Comparing Quantities - 1 (Exercise 7.1)
= ₹ 420 × 92 = ₹ 38640
Thus, the value of the scooter after 1 year will be ₹ 38640.

Try These

Q1: Machinery worth Rs 10,500 depreciated by 5%. Find its value after one year.

Sol: Here, P = Rs 10,500, R = –5% p.a., T = 1 year, n = 1
∵  NCERT Solutions for Class 8 Maths - Comparing Quantities - 1 (Exercise 7.1) [∵ Depreciation is there, ∴ r = –5%]
NCERT Solutions for Class 8 Maths - Comparing Quantities - 1 (Exercise 7.1)
= Rs10500 * 19/20
= Rs 525 * 19 = Rs 9975.
Thus, machinery value after 1 year = Rs 9975

Q2: Find the population of a city after 2 years, which is at present 12 lakh, if the rate of increase is 4%

Sol: Present population, P = 12 lakh
Rate of increase, R = 4% p.a.
Time, T = 2 years
∴ Population after 2 years =  NCERT Solutions for Class 8 Maths - Comparing Quantities - 1 (Exercise 7.1)
NCERT Solutions for Class 8 Maths - Comparing Quantities - 1 (Exercise 7.1)
NCERT Solutions for Class 8 Maths - Comparing Quantities - 1 (Exercise 7.1)
Thus, the population of the town will be 12,97,920 after 2 years.

Note: For depreciation, we use the formula as NCERT Solutions for Class 8 Maths - Comparing Quantities - 1 (Exercise 7.1)

The document NCERT Solutions for Class 8 Maths - Comparing Quantities - 1 (Exercise 7.1) is a part of the Class 8 Course Mathematics (Maths) Class 8.
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FAQs on NCERT Solutions for Class 8 Maths - Comparing Quantities - 1 (Exercise 7.1)

1. What are the key concepts covered in Comparing Quantities (Exercise 7.1)?
Ans. Exercise 7.1 primarily covers the basic principles of comparing quantities, including the concepts of ratios, percentages, and fractions. It involves solving problems related to finding the percentage increase or decrease in quantities, as well as understanding how to express one quantity as a fraction of another.
2. How do you calculate the percentage increase or decrease in a quantity?
Ans. To calculate the percentage increase, use the formula: \[(\text{New Value} - \text{Old Value}) \div \text{Old Value} \times 100\]. For percentage decrease, the formula is similar: \[(\text{Old Value} - \text{New Value}) \div \text{Old Value} \times 100\]. This will give you the percentage change in the quantity.
3. What types of problems can be found in Exercise 7.2 of Comparing Quantities?
Ans. Exercise 7.2 includes problems that require students to apply the concepts of ratio and proportion, as well as real-life applications such as calculating discounts, profit and loss, and simple interest. These problems help reinforce the understanding of how to compare different quantities in various contexts.
4. Why is it important to understand ratios and percentages in daily life?
Ans. Understanding ratios and percentages is crucial in daily life as it helps in making informed decisions related to finances, such as budgeting, shopping, and investing. It allows individuals to evaluate deals, calculate savings, and compare prices effectively, enhancing overall financial literacy.
5. How can I prepare effectively for questions related to Comparing Quantities in exams?
Ans. To prepare effectively, practice a variety of problems from the exercises provided in the textbook. Focus on understanding the formulas and their applications. Additionally, reviewing previous exam papers and taking mock tests can help familiarize you with the types of questions typically asked and improve your problem-solving speed.
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