NCERT Solutions Class 10th Maths Chapter – 13 Statistics Exercise – 13.1

NCERT Solutions Class 10th Maths Chapter - 13 Statistics Exercise - 13.1
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NCERT Solutions Class 10th Maths Chapter – 13 Statistics

TextbookNCERT
class10th
SubjectMathematics
Chapter13th
Chapter NameStatistics
CategoryClass 10th Mathematics
Medium English
Sourcelast doubt

NCERT Solutions Class 10th Maths Chapter – 13 Statistics

Chapter – 13

Statistics

Exercise – 13.1

1. A survey was conducted by a group of students as a part of their environment awareness program, in which they collected the following data regarding the number of plants in 20 houses in a locality. Find the mean number of plants per house.

Number of Plants0-22-44-66-88-1010-1212-14
Number of Houses1215623

Which method did you use for finding the mean, and why?

Solution: In order to find the mean value, we will use the direct method because the numerical value of fi and xi are small.
Find the midpoint of the given interval using the formula.
Midpoint (xi) = (upper limit + lower limit)/2

No. of plants(Class interval)No. of housesFrequency (fi)Mid-point (xi)fixi
0-2111
2-4236
4-6155
6-85735
8-106954
10-1221122
12-1431339
 Sum f= 20 Sum fixi = 162

The formula to find the mean is:
Mean = x̄ = ∑fxi /∑f
= 162/20
= 8.1
Therefore, the mean number of plants per house is 8.1

2. Consider the following distribution of daily wages of 50 workers of a factory.

Daily wages (in Rs.)100-120120-140140-160160-180180-200
Number of workers12148610

Find the mean daily wages of the workers of the factory by using an appropriate method.

Solution: Find the midpoint of the given interval using the formula.
Midpoint (xi) = (upper limit + lower limit)/2
In this case, the value of the mid-point (xi) is very large, so let us assume the mean value, A = 150, and the class interval is h = 20.
So, u= (xi – A)/h = ui  = (xi – 150)/20
Substitute and find the values as follows:

Daily wages(Class interval)Number of workersfrequency (fi)Mid-point (xi)u= (xi – 150)/20fiui
100-12012110-2-24
120-14014130-1-14
140-160815000
160-180617016
180-20010190220
TotalSum f= 50  Sum fiui = -12

So, the formula to find out the mean is:
Mean = x̄ = A + h∑fiui /∑f=150 + (20 × -12/50) = 150 – 4.8 = 145.20
Thus, mean daily wage of the workers = Rs. 145.20

3. The following distribution shows the daily pocket allowance of children of a locality. The mean pocket allowance is Rs 18. Find the missing frequency f.

Daily Pocket Allowance(in c)11-1313-1515-1717-1919-2121-2323-35
Number of children76913f54

Solution: To find out the missing frequency, use the mean formula.
Here, the value of mid-point (xi)  mean x̄ = 18

Class intervalNumber of children (fi)Mid-point (xi)    fixi    
11-1371284
13-1561484
15-17916144
17-191318 = A234
19-21f2020f
21-23522110
23-2542496
Totalfi = 44+f Sum fixi = 752+20f

The mean formula is Mean = x̄ = ∑fixi /∑f= (752+20f)/(44+f)
Now substitute the values and equate to find the missing frequency (f)
⇒ 18 = (752+20f)/(44+f)
⇒ 18(44+f) = (752+20f)
⇒ 792+18f = 752+20f
⇒ 792+18f = 752+20f
⇒ 792 – 752 = 20f – 18f
⇒ 40 = 2f
⇒ f = 20
So, the missing frequency, f = 20.

4. Thirty women were examined in a hospital by a doctor and the number of heartbeats per minute was recorded and summarized as follows. Find the mean heartbeats per minute for these women, choosing a suitable method.

Number of heartbeats per minute65-6868-7171-7474-7777-8080-8383-86
Number of women2438742

Solution: From the given data, let us assume the mean as A = 75.5

x= (Upper limit + Lower limit)/2

Class size (h) = 3

Now, find the uand fiui as follows:

Class IntervalNumber of women (fi)Mid-point (xi)ui = (xi – 75.5)/hfiui
65-68266.5-3-6
68-71469.5-2-8
71-74372.5-1-3
74-77875.500
77-80778.517
80-83481.538
83-86284.536
 Sum fi= 30  Sum fiu= 4

Mean = x̄ = A + h∑fiui /∑f
= 75.5 + 3×(4/30)
= 75.5 + 4/10
= 75.5 + 0.4
= 75.9

Therefore, the mean heart beats per minute for these women is 75.9

5. In a retail market, fruit vendors were selling mangoes kept in packing boxes. These boxes contained a varying number of mangoes. The following was the distribution of mangoes according to the number of boxes.

Number of mangoes50-5253-5556-5859-6162-64
Number of boxes1511013511525

Find the mean number of mangoes kept in a packing box. Which method of finding the mean did you choose?

Solution: Since the given data is not continuous so we add 0.5 to the upper limit and subtract 0.45 from the lower limit as the gap between the two intervals is 1
Here, assumed mean (A) = 57
Class size (h) = 3
Here, the step deviation is used because the frequency values are big.

Class IntervalNumber of boxes (fi)Mid-point (xi)di = xi – Afidi
49.5-52.51551-690
52.5-55.511054-3-330
55.5-58.513557 = A00
58.5-61.5115603345
61.5-64.525636150
 Sum fi = 400  Sum fidi = 75

The formula to find out the Mean is: Mean = x̄ = A +h ∑fidi /∑f

= 57 + 3(75/400)
= 57 + 0.1875
= 57.19
Therefore, the mean number of mangoes kept in a packing box is 57.19

6. The table below shows the daily expenditure on the food of 25 households in a locality. Find the mean daily expenditure on food by a suitable method.

Daily expenditure (in c)100-150150-200200-250250-300300-350
Number of households451222

Solution: Find the midpoint of the given interval using the formula.
Midpoint (xi) = (upper limit + lower limit)/2
Let is assume the mean (A) = 225
Class size (h) = 50

Class IntervalNumber of households (fi)Mid-point (xi)di = xi – Au= di/50fiui
100-1504125-100-2-8
150-2005175-50-1-5
200-25012225000
250-30022755012
300-350232510024
 Sum fi = 25   Sum fiui = -7

Mean = x̄ = A +h∑fiui /∑fi

= 225+50(-7/25)
= 225-14
= 211
Therefore, the mean daily expenditure on food is 211

7. To find out the concentration of SO2 in the air (in parts per million, i.e., ppm), the data was collected for 30 localities in a certain city and is presented below:

The concentration of SO2 ( in ppm)Frequency
0.00 – 0.044
0.04 – 0.089
0.08 – 0.129
0.12 – 0.162
0.16 – 0.204
0.20 – 0.242

Find the mean concentration of SO2 in the air.

Solution: To find out the mean, first find the midpoint of the given frequencies as follows:

The concentration of SO(in ppm)Frequency (fi)Mid-point (xi)fixi
0.00-0.0440.020.08
0.04-0.0890.060.54
0.08-0.1290.100.90
0.12-0.1620.140.28
0.16-0.2040.180.72
0.20-0.2420.200.40
TotalSum fi = 30 Sum (fixi) = 2.96

The formula to find out the mean is Mean = x̄ = ∑fixi /∑fi

= 2.96/30
= 0.099 ppm
Therefore, the mean concentration of SO2 in the air is 0.099 ppm.

8. A class teacher has the following absentee record of 40 students of a class for the whole
term. Find the mean number of days a student was absent.

Number of days0-66-1010-1414-2020-2828-3838-40
Number of students111074431

Solution: Find the midpoint of the given interval using the formula.

Midpoint (xi) = (upper limit + lower limit)/2

Class intervalFrequency (fi)Mid-point (xi)fixi
0-611333
6-1010880
10-1471284
14-2041768
20-2842496
28-3833399
38-4013939
 Sum fi = 40 Sum fixi = 499

The mean formula is, Mean = x̄ = ∑fixi /∑fi

= 499/40
= 12.48 days
Therefore, the mean number of days a student was absent = 12.48.

9. The following table gives the literacy rate (in percentage) of 35 cities. Find the mean
literacy rate.

Literacy rate (in %)45-5555-6565-7575-8585-98
Number of cities3101183

Solution: Find the midpoint of the given interval using the formula.

Midpoint (xi) = (upper limit + lower limit)/2

In this case, the value of the mid-point (xi) is very large, so let us assume the mean value, A = 70, and the class interval is h = 10.

So, u= (xi-A)/h = u= (xi-70)/10

Substitute and find the values as follows:

Class IntervalFrequency (fi)(xi)di = xi – aui = di/hfiui
45-55350-20-2-6
55-651060-10-1-10
65-751170000
75-858801018
85-953902026
 Sum fi  = 35   Sum fiui  = -2

So, Mean = x̄ = A+(∑fiui /∑fi)×h

= 70+(-2/35)×10 = 69.42

Therefore, the mean literacy part = 69.42

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