ML Aggarwal Solutions for Chapter 20 Statistics Class 9 Maths ICSE

Here, we are providing the solutions for Chapter 20 Statistics from ML Aggarwal Textbook for Class 9 ICSE Mathematics. Solutions of the twenty chapter has been provided in detail. This will help the students in understanding the chapter more clearly. Class 9 Chapter 20 Statistics ML Aggarwal Solutions for ICSE is one of the most important chapter for the board exams which is based on .

Exercise 20.1

1. Find the mean of 8, 6, 10, 12, 1, 3, 4, 4.

Solution

Given data,

8, 6, 10, 12, 1, 3, 4, 4

Here, n = 8

∴ Mean (x̄) = Ʃ x_i/n

= (8 + 6 + 10 + 12 + 1+ 3 + 4 + 4)/8

= 48/8 = 6

Therefore, mean of the given data is 6.

2. 5 people were asked about the time in a week they spend in doing social work in their community. They replied 10, 7, 13, 20 and 15 hours, respectively. Find the mean time in a week devoted by them for social work.

Solution

Given data,

10, 7, 13, 20, 15

Here, n = 5

∴ Mean (x̄) = Ʃ x_i/n

= (10 + 7 + 13 + 20 + 15)/5

= 65/5 = 13

Therefore, the mean time in a week devoted by them for social work is 13 hours.

3. The enrollment of a school during six consecutive years was as follows:

1620, 2060, 2540, 3250, 3500, 3710.
Find the mean enrollment.

Solution

Given data,

1620, 2060, 2540, 3250, 3500, 3710

Here, n = 6

∴ Mean (x̄) = Ʃ x_i/n

= (1620 + 2060 + 2540 + 3250 + 3500 + 3710)/5

= 16680/6 = 2780

Therefore, the mean enrollment is 2780.

4. Find the mean of the first twelve natural numbers.

Solution

The first twelve natural numbers are: 1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12

Here, n = 12

∴ Mean (x̄) = Ʃ x_i/n

= (1 + 2 + 3 + 4 + 5 + 6 + 7 + 8 + 9 + 10 + 11 + 12)/12

= 78/12 = 6.5

Therefore, the mean of the first twelve natural numbers is 6.5

5. (i) Find the mean of the first six prime numbers.

(ii) Find the mean of the first seven odd prime numbers.

Solution

(i) First 6 prime numbers are 2, 3, 5, 7, 11, 13

Here, n = 6

∴ Mean (x̄) = Ʃ x_i/n

= (2 + 3 + 5 + 7 + 11 + 13)/6

= 41/6

Therefore, the mean of the first six prime numbers is 41/6.

(ii) First seven odd prime numbers are 3, 5, 7, 11, 13, 17, 19

Here, n = 7

∴ Mean (x̄) = Ʃ x_i/n

= (3 + 5 + 7 + 11 + 13 + 17 + 19)/7

= 75/7

Therefore, the mean of the first six prime numbers is 75/7.

6. (i)The marks (out of 100) obtained by a group of students in a Mathematics test are 81, 72, 90, 90, 85, 86, 70, 93 and 71. Find the mean marks obtained by the group of students.
(ii) The mean of the age of three students Vijay, Rahul and Rakhi is 15 years. If their ages are in the ratio 4 : 5 : 6 respectively, then find their ages.

Solution

(i) The marks obtained by the group of students are:

81, 72, 90, 90, 85, 86, 70, 93, 71

Here, n = 9

∴ Mean (x̄) = Ʃ x_i/n

= (81 + 72 + 90 + 90 + 85 + 86 + 70 + 93 + 71)/9

= 738/9 = 82

Therefore, the mean marks obtained by the group of students is 82.

(ii) Given, the mean of the age of three students Vijay, Rahul and Rakhi is 15 years.

So, n = 3

Now, the sum of ages of the 3 students = 15×3 = 45

Also given, ratio of their ages is 4 : 5 : 6

Sum of ratios = 4 + 5 + 6 = 15

Hence,

Vijay’s age = (45/15)×4 = 12 years

Rahul’s age = (45/15)×5 = 15 years

Rakhi’s age = (45/15)×6 = 18 years

7. The mean of 5 numbers is 20. If one number is excluded, mean of the remaining numbers becomes 23. Find the excluded number.

Solution

Given,

The mean of 5 numbers = 20

So, the total sum of the numbers = 20×5 = 100

After excluding one number,

The mean of the remaining 4 numbers = 23

So, the total sum of these numbers = 23×4 = 92

Hence, the excluded number is = 100 – 92 = 8.

8. The mean of 25 observations is 27. If one observation is included, the mean still remains 27. Find the included observation.

Solution

Given,

The mean of 25 observations is 27.

So, the total sum of all the 25 observations = 27×25 = 675

After one observation is included,

Now the mean of 26 (25 + 1) numbers = 27

So, the total sum of all the 26 observations = 27×26 = 702

Hence, the included observation = 702 – 675 = 27

9. The mean of 5 observations is 15. If the mean of first three observations is 14 and that of the last three is 17, find the third observation.

Solution

Given,

The mean of 5 observations = 15

So, total sum of the 5 observations = 15×5 = 75

Also given,

Mean of first 3 observations = 14

So, the sum of the 3 observations = 14×3 = 42

And, the mean of last 3 observations = 17

So, the sum of last 3 observations = 17×3 = 51

Thus, the total of 3 + 3 observations = 42 + 51 = 93

Hence, The third observation = 93 – 75 = 18.

10. The mean of 8 variate is 10.5. If seven of them are 3, 15, 7, 19, 2, 17 and 8, then find the 8^th variate.

Solution

Given,

Seven out of eight variates are: 3, 15, 7, 19, 2, 17 and 8

Mean of 8 variates = 10.5

So, the total of 8 variates = 10.5×8 = 84

Now,

Sum of seven variates = (3 + 15 + 7 + 19 + 2 + 17 + 8) = 71

Hence, the 8^th variate = 84 - 71 = 13.

11. The mean weight of 8 students is 45.5 kg. Two more students having weights 41.7 kg and 53.3 kg join the group. What is the new mean weight?

Solution

Given,

The mean weight of 8 students = 45.5 kg

So, the total weight of 8 students = 45.5 x 8 = 364 kg

Weight of two more students are 41.7 kg and 53.3 kg

Now,

The total weight of 10 (8 + 2) students = 364 + 41.7 + 53.3

= 364 + 95

= 459 kg

Hence, the new mean weight of all the 10 students = 459/10 = 45.9 kg

12. Mean of 9 observations was found to be 35. Later on, it was detected that an observation 81 was misread as 18. Find the correct mean of the observations.

Solution

Given,

Mean of 9 observations = 35

So, the sum of all 9 observations = 35×9 = 315

Now, the difference due to misread = 81 – 18 = 63

Thus, the actual sum = 315 + 63 = 378

Hence, the actual mean = 378/ 9 = 42.

13. A student scored the following marks in 11 questions of a question paper:

7, 3, 4, 1, 5, 8, 2, 2, 5, 7, 6.
Find the median marks.

Solution

Given,

Marks scored in 11 questions of a question paper by the student are:

7, 3, 4, 1, 5, 8, 2, 2, 5, 7, 6

Arranging it in descending order, we have

1, 2, 2, 3, 4, 5, 5, 6, 7, 7, 8

Here, n = 11 which is odd

∴ Median = (n + 1)/2^th term

= (11 + 1)/2 = 12/2 = 6^th term i.e 5

Hence, the median mark is 5.

14. Calculate the mean and the median of the numbers:

2, 3, 4, 3, 0, 5, 1, 1, 3, 2.

Solution

First arrange the number in descending order

0, 1, 1, 2, 2, 3, 3, 3, 4, 5

So n = 10 which is even

Mean (x̄) = Ʃ x_i/n

Substituting the values

= (0 + 1 + 1 + 2 + 2 + 3 + 3 + 3 + 4 + 5)/10

By further calculation

= 24/10

= 2.4

Median = ½ [10/2th + (10/2 + 1)th terms]

It can be written as

= ½ (5^th + 6^th) term

Substituting the values

= ½ (2 + 3)

= 5/2

= 2.5

15. A group of students was given a special test in Mathematics. The test was completed by the various students in the following time in (minutes):

24, 30, 28, 17, 22, 36, 30, 19, 32, 18, 20, 24.

Find the mean time and median time taken by the students to complete the test.

Solution

First arrange the data in descending order

17, 18, 19, 20, 22, 24, 24, 28, 30, 30, 32, 36

So n = 12 which is even

Mean (x̄) = Ʃ x_i/n

Substituting the values

= (17 + 18 + 19 + 20 + 22 + 24 + 24 + 28 + 30 + 30 + 32 + 36)/2

So we get

= 300/12

= 25

Median = ½ [12/2th + (12/2 + 1)th terms]

It can be written as

= ½ (6^th + 7^th) terms

Substituting the values

= ½ (24 + 24)

= ½ (48)

= 24

16. In a Science test given to a group of students, the marks scored by them (out of 100) are

41, 39, 52, 48, 54, 62, 46, 52, 40, 96, 42, 40, 98, 60, 52.
Find the mean and median of this data.

Solution

On arranging the marks obtained by the students, we have

39, 40, 40, 41, 42, 46, 48, 52, 52, 52, 54, 60, 62, 96, 98

Here, n = 15 which is odd

∴ Mean (x̄)

Ʃ x_i/n = (39 + 40 + 40 + 41 + 42 + 46 + 48 + 52 + 52 + 52 + 54 + 60 + 62 + 96 + 98)/15

= 822/15 = 54.8

And,

Median = (15 + 1)/2^th term

= 16/2 = 8^th term i.e. 52

Therefore, for the given data mean = 54.8 and median = 52.

17. The points scored by a Kabaddi team in a series of matches are as follows:

7, 17, 2, 5, 27, 15, 8, 14, 10, 48, 10, 7, 24, 8, 28, 18.

Find the mean and the median of the points scored by the Kabaddi team.

Solution

Let’s arrange the given data in descending order:

2, 5, 7, 7, 8, 8, 10, 10, 14, 15, 17, 18, 24, 27, 28, 48

Here, n = 16 when is even

∴ Mean (x̄)

Ʃ x_i/ n = (2 + 5 + 7 + 7 + 8 + 8 + 10 + 10 + 14 + 15 + 17 + 18 + 24 + 27 + 28 + 48)/15

= 248/16 = 15.5 points

And,

Median = ½ [(16/2)^th term + (16/2 + 1)^th term]

= ½ (8^th term + 9^th term)

= ½ (10 + 14)

= ½ x 24 = 12 points

Therefore, the mean and the median of the points scored by the Kabaddi team are 15.5 and 12 respectively.

18. The following observations have been arranged in ascending order. If the median

the data is 47.5, find the value of x.
17, 21, 23, 29, 39, 40, x, 50, 51, 54, 59, 67, 91, 93.

Solution

Given data,

17, 21, 23, 29, 39, 40, x, 50, 51, 54, 59, 67, 91, 93

Here, n = 14 which is even

As the given data is arranged in descending order

Median = ½ [(14/2)^th term + (14/2 + 1)^th term]

= ½ (7^th term + 8^th term)

⇒ 47.5 = ½ (x + 50)

95 = x + 50

x = 95 – 50 = 45

Hence, the value of x is 45.

19. The following observations have been arranged in ascending order. If the median

the data is 13, find the value of x.
3, 6, 7, 10, x, x + 4, 19, 20, 25, 28.

Solution

Given observations in ascending order,

3, 6, 7, 10, x, x + 4, 19, 20, 25, 28

Here, n = 10 which is even and median = 13

So, Median = ½ [(10/2)^th term + (10/2 + 1)^th term]

= ½ (5^th term + 6^th term)

= ½ (x + x + 4)

= (2x + 4)/2

= x + 2

⇒ x + 2 = 13

x = 13 – 2 = 11

Hence, the value of x is 11.

Exercise 20.2

1. State which of the following variables are continuous and which are discrete:

(i) marks scored (out of 50) in a test.
(ii) daily temperature of your city.
(iii) sizes of shoes.
(iv) distance travelled by a man.
(v) time.

Solution

(i) Discrete

(ii) Continuous

(iii) Discrete

(iv) Continuous

(v) Continuous

2. Using class intervals 0 – 4, 5 – 9, 10 – 14, …… construct the frequency distribution for the following data:

13, 6, 10, 5, 11, 14, 2, 8, 15, 16, 9, 13, 17, 11, 19, 5, 7, 12, 20, 21, 18, 1, 8, 12, 18.

Solution

The frequency distribution for the following data is

Class	Tally marks	Frequency
0-4	II	2
5-9	~~IIII~~ II	7
10-14	~~IIII~~ III	8
15-19	~~IIII~~ I	6
20-24	II	2

3. Given below are the marks obtained by 27 students in a test:

21, 3, 28, 38, 6, 40, 20, 26, 9, 8, 14, 18, 20, 16, 17, 10, 8, 5, 22, 27, 34, 2, 35, 31, 16, 28, 37.

(i) Using the class intervals 1-10, 11-20 etc. construct a frequency table.

(ii) State the range of these marks.

(iii) State the class mark of the third class of your frequency table.

Solution

(i) The frequency table of the given data is

Class	Tally marks	Frequency
1-10	~~IIII~~ II	7
11-20	~~IIII~~ III	8
21-30	~~IIII~~ I	6
31-40	~~IIII~~ I	6

(ii) Range of these marks is 38.

(iii) The class mark of the third class of your frequency table = (21 + 30)/ 2 = 25.5

4. Explain the meaning of the following terms:

(i) variate

(ii) class size

(iii) class mark

(iv) class limits

(v) true class limits

(vi) frequency of a class

(vii) cumulative frequency of a class.

Solution

(i) Variant: A particular value of a variable is called variate.

(ii) Class size: The difference between the actual upper limit and the actual lower limit of a class is called its class size.

(iii) Class mark: The class mark of a class is the value midway between its actual lower limit and actual upper limit.

(iv) Class limits: In the frequency table the class interval is called class limits.

(v) True class limits: In a continuous distribution, the class limits are called true or actual class limits.

(vi) Frequency of a class: The number of tally marks opposite to a variate is its frequency and it is written in the next column opposite to tally marks of the variate.

(vii) Cumulative frequency of a class: The sum of frequency of all previous classes and that particular class is called the cumulative frequency of the class.

5. Fill in the blanks:
(i) The number of observations in a particular class is called …… of the class.
(ii) The difference between the class marks of two consecutive classes is the ….. of the class.
(iii) The range of the data 16, 19, 23, 13, 11, 25, 18 is …
(iv) The mid-point of the class interval is called its …
(v) The class mark of the class 4 – 9 is ….

Solution

(i) The number of observations in a particular class is called frequency of the class.

(ii) The difference between the class marks of two consecutive classes is the size of the class.

(iii) The range of the data 16, 19, 23, 13, 11, 25, 18 is 14.

(iv) The mid-point of the class interval is called its class marks.

(v) The class mark of the class 4 – 9 is 6.5. [Class mark = (4 + 9)/2 = 13/2 = 6.5]

6. The marks obtained (out of 50) by 40 students in a test are given below:
28, 31, 45, 03, 05, 18, 35, 46, 49, 17, 10, 28, 31, 36, 40, 44, 47, 13, 19, 25, 24, 31, 38, 32,
27, 19, 25, 28, 48, 15, 18, 31, 37, 46, 06, 01, 20, 10, 45, 02.

(i) Taking class intervals 1- 10, 11 – 20, .., construct a tally chart and a frequency
distribution table.
(ii) Convert the above distribution to continuous distribution.
(iii) State the true class limits of the third class.
(iv) State the class mark of the fourth class.

Solution

(i) A tally chart and a frequency distribution of given data is

(ii) Converting the above distribution to continuous distribution.

(iii) The true class limits of the third class=lower limit = 20.5 and upper limit = 30.5

(iv) The class mark of the fourth class (31 + 40)/2 = 71/2 = 35.5

7. Use the adjoining table to find:

(i) upper and lower limits of fifth class.

(ii) true class limits of the fifth class.

(iii) class boundaries of the third class.

(iv) class mark of the fourth class.

(v) width of sixth class.

Class	Frequency
28-32	5
33-37	8
38-42	13
43-47	9
48-52	7
53-57	5
58-62	2

Solution

(i) Upper and lower limits of fifth class are as follows.

Upper limit = 52 and lower limit = 48

(ii) True class limits of the fifth class

Upper limit = 52.5 and lower limit = 47.5

(iii) Class boundaries of the third class is 37.5 and 42.5.

(iv) Class mark of the fourth class = (43 + 47)/2 = 90/2 = 45

(v) Width of sixth class=57.5 – 52.5 = 5

8. The marks of 200 students in a test were recorded as follows:

Marks %	10-19	20-29	30-39	40-49	50-59	60-69	70-79	80-89
No. of students	7	11	20	46	57	37	15	7

Draw the cumulative frequency table.

Solution

The cumulative frequency table is as follows:

Marks % (Class)	Frequency	Cumulative Frequency
10-19	7	7
20-29	11	18
30-39	20	38
40-49	46	84
50-59	57	141
60-69	37	178
70-79	15	193
80-89	7	200

9. Given below are the marks secured by 35 students in a test:

41, 32, 35, 21, 11, 47, 42, 00, 05, 18, 25, 24, 29, 38, 30, 04, 14, 24, 34, 44, 48, 33, 36, 38, 41, 46, 08, 34, 39, 11, 13, 27, 26, 43, 03.

Taking class intervals 0-10, 10-20, 20-30 …., construct frequency as well as cumulative frequency distribution table. Find the number of students obtaining below 20 marks.

Solution

The cumulative frequency distribution table is given below:

Class	Tally Marks	Frequency	Cumulative Frequency
0-10	~~IIII~~	5	5
10-20	~~IIII~~	5	10
20-30	~~IIII~~ II	7	17
30-40	~~IIII~~ ~~IIII~~	10	27
40-50	~~IIII~~ III	8	35

The number of students obtaining below 20 marks is 10.

10. The marks out of 100 of 50 students in a test are given below:

5 35 6 35 18 36 12 36 85 32

20 36 22 38 24 50 22 39 74 31

25 54 25 64 25 70 28 66 58 25

29 72 31 82 31 84 31 82 37 21

32 84 32 92 35 95 34 92 35 5

(i) Taking a class interval of size 10, construct a frequency as well as cumulative frequency table for the given data.

(ii) Which class has the largest frequency?

(iii) How many students score less than 40 marks?

(iv) How many students score first division (60% or more) marks?

Solution

(i) The cumulative frequency table for the given data

Class	Tally marks	Frequency	Cumulative frequency
0-10	III	3	3
10-20	II	2	5
20-30	~~IIII~~ ~~IIII~~ I	11	16
30-40	~~IIII~~ ~~IIII~~ ~~IIII~~ III	18	34
40-50	~~IIII~~ ~~IIII~~ ~~IIII~~ III	18	34
50-60	III	3	37
60-70	II	2	39
70-80	III	3	42
80-90	~~IIII~~	5	47
90-100	III	3	50

(ii) 30-40 is the class which has the largest frequency.

(iii) 34 students score less than 40 marks.

(iv) 13 students score first division (60% or more) marks.

11. Construct the frequency distribution table from the following data:

Ages (in years)	Below 4	Below 7	Below 10	Below 13	Below 16
No. of children	7	38	175	248	300

State the number of children in the age group 10-13.

Solution

The frequency distribution table from the given data:

Class	Frequency
0-4	7
4-7	31
7-10	137
10-13	73
13-16	52

Hence, the number of children in the age group 10-13 is 73.

12. Rewrite the following cumulative frequency distribution into frequency distribution:

Less than or equal to 10 2

Less than or equal to 20 7

Less than or equal to 30 18

Less than or equal to 40 32

Less than or equal to 50 43

Less than or equal to 60 50

Solution

The given cumulative frequency distribution is rewritten into frequency distribution below:

Class	Frequency
0-10	2
11-20	5
21-30	11
31-40	14
41-50	11
51-60	7

13. The water bills (in rupees) of 32 houses in a locality are given below. Construct a
frequency distribution table with a class size of 10.

80, 48, 52, 78, 103, 85, 37, 94, 72, 73, 66, 52, 92, 85, 78, 81, 64, 60, 75, 78, 108, 63, 71, 54,
59, 75, 100, 103, 35, 89, 95, 73.

Solution

A frequency distribution with a class size of 10 is follows:

14. The maximum temperatures (in degree Celsius) for Delhi for the month of April, 2014, as reported by the Meteorological Department, are given below:

27.4, 28.3, 23.9, 23.6, 25.4, 27.5, 28.1, 28.4, 30.5, 29.7, 30.6, 31.7, 32.2, 32.6, 33.4, 35.7, 36.1, 37.2, 38.4, 40.1, 40.2, 40.5, 41.1, 42.0, 42.1, 42.3, 42.4, 42.9, 43.1, 43.2.

Construct a frequency distribution table.

Solution

The frequency distribution table of the given data is as follows:

Class	Tally marks	Frequency
23.5-27.5	IIII	4
27.5-31.5	~~IIII~~ II	7
31.5-35.5	IIII	4
35.5-39.5	IIII	4
39.5-43.5	~~IIII~~ ~~IIII~~ I	11

15. (i) The class marks of a distribution are 94, 104, 114, 124, 134, 144 and 154. Determine the class size and the class limits of the fourth class.

(ii) The class marks of a distribution are 9.5, 16.5, 23.5, 30.5, 37.5 and 44.5. Determine the class size and the class limits of the third class.

Solution

(i) We know that

Class size is the difference between two successive class marks

Class size = 104 – 94 = 10

Class limits of the fourth class

Lower limit = 119 and upper limit = 129

(ii) We know that

Class size is the difference between two successive class marks

Class size = 16.5 – 9.5 = 7

Class limits of the third class

Lower limit = 20 and upper limit = 27.

Exercise 20.3

1. The area under wheat cultivation last year in the following states, correct to the nearest lacs hectares was:

State	Punjab	Haryana	U.P.	M.P.	Maharashtra	Rajasthan
Cultivated area	220	120	100	40	80	30

Represent the above information by a bar graph.

Solution