Advertisements
Advertisements
प्रश्न
The table below shows the daily expenditure on food of 30 households in a locality:
| Daily expenditure (in Rs) | Number of households |
| 100 – 150 | 6 |
| 150 – 200 | 7 |
| 200 – 250 | 12 |
| 250 – 300 | 3 |
| 300 – 350 | 2 |
Find the mean and median daily expenditure on food.
उत्तर
We have the following:
| Daily expenditure (in Rs) | Mid value `(x_i)` | Frequency `(f_i)` | Cumulative frequency | `(f_i × x_i)` |
| 100 – 150 | 125 | 6 | 6 | 750 |
| 150 – 200 | 175 | 7 | 13 | 1225 |
| 200 – 250 | 225 | 12 | 25 | 2700 |
| 250 – 300 | 275 | 3 | 28 | 825 |
| 300 – 350 | 325 | 2 | 30 | 650 |
| `Ʃ f_i = 30` | `Ʃ f_i × x_i = 6150` |
Mean, x = `(Ʃ_i f_i × x_i)/(Ʃ_i f_i)`
=`6150/30`
=205
Now, N = 30
⇒`N/2 = 15`
The cumulative frequency just greater than 15 is 25 and the corresponding class is 200 – 250.
Thus, the median class is 200 – 250.
∴ l = 200, h = 50, f = 12, c = cf of preceding class = 13 and `N/2 = 15`
Now,
Median,` M_e = l + {h× ((N/2−c)/f)}`
`= 200 + {50 × ((15−13)/12)}`
`= (200 + 50 × 2/12)`
= 200 + 8.33
= 208.33
APPEARS IN
संबंधित प्रश्न
What is primary data?
Explain the meaning of the term Class-size.
Find the mean, median and mode of the following data:
| Class | 0 – 10 | 10 – 20 | 20 – 30 | 30 – 40 | 40 – 50 | 50 – 60 | 60 – 70 |
| Frequency | 4 | 4 | 7 | 10 | 12 | 8 | 5 |
Find the mean, median and mode of the following data:
| Class | 0 – 50 | 50 – 100 | 100 – 150 | 150 – 200 | 200 – 250 | 250 – 300 | 300 - 350 |
| Frequency | 2 | 3 | 5 | 6 | 5 | 3 | 1 |
Find the mean, median and mode of the following data:
| Marks obtained | 25 - 35 | 35 – 45 | 45 – 55 | 55 – 65 | 65 – 75 | 75 - 85 |
| No. of students | 7 | 31 | 33 | 17 | 11 | 1 |
A survey regarding the heights (in cm) of 50 girls of a class was conducted and the following data was obtained:
| Height in cm |
120 – 130 | 130 – 140 | 140 – 150 | 150 – 160 | 160 – 170 |
| No. of girls |
2 | 8 | 12 | 20 | 8 |
Find the mean, median and mode of the above data.
For a certain distribution, mode and median were found to be 1000 and 1250 respectively. Find mean for this distribution using an empirical relation.
Find the class marks of classes 10 -25 and 35 – 55.
The median of 19 observations is 30. Two more observation are made and the values of these are 8 and 32. Find the median of the 21 observations taken together.
Hint Since 8 is less than 30 and 32 is more than 30, so the value of median (middle value) remains unchanged.
If the median of `x/5,x/4,x/2,x and x/3`, where x > 0, is 8, find the value of x.
Hint Arranging the observations in ascending order, we have `x/5,x/4,x/3,x/2,x Median= x/3=8.`
In the following data, find the values of p and q. Also, find the median class and modal class.
| Class | Frequency (f) | Cumulative frequency (cf) |
| 100 – 200 | 11 | 11 |
| 200 – 300 | 12 | p |
| 300 – 400 | 10 | 33 |
| 400- 500 | Q | 46 |
| 500 – 600 | 20 | 66 |
| 600 – 700 | 14 | 80 |
Which of the following is not a measure of central tendency?
Explain the meaning of the following terms: Variate
Explain the meaning of the following terms: Frequency
The times, in seconds, taken by 150 athletes to run a 110 m hurdle race are tabulated below:
| Class | Frequency |
| 13.8 - 14 | 3 |
| 14 - 14.2 | 4 |
| 14.2 - 14.4 | 6 |
| 14.4 - 14.6 | 69 |
| 14.6 - 14.8 | 48 |
| 14.8 - 15.0 | 20 |
The number of athletes who completed the race in less than 14.6 seconds is?
Class mark of a class is obtained by using ______.
Can the experimental probability of an event be a negative number? If not, why?
Find the range of given data: 46, 35, 78, 90, 20, 56, 45, 76.
