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The following table, construct the frequency distribution of the percentage of marks obtained by 2300 students in a competitive examination.
| Marks obtained (in percent) | 11 – 20 | 21 – 30 | 31 – 40 | 41 – 50 | 51 – 60 | 61 – 70 | 71 – 80 |
| Number of Students | 141 | 221 | 439 | 529 | 495 | 322 | 153 |
(a) Convert the given frequency distribution into the continuous form.
(b) Find the median class and write its class mark.
(c) Find the modal class and write its cumulative frequency.
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(a) The frequency distribution into the continuous form is as follows:
| Marks obtained (in per cent) | Number of students (f) |
| 10.5-20.5 | 141 |
| 20.5-30.5 | 221 |
| 30.5-40.5 | 439 |
| 40.5-50.5 | 529 |
| 50.5-60.5 | 495 |
| 60.5-70.5 | 322 |
| 70.5-80.5 | 153 |
(b)Now, to find the median class let us put the data in the tale given below:
| Marks obtained (in per cent) | Number of students (f) | Cumulative frequency (cf) |
| 10.5-20.5 | 141 | 141 |
| 20.5-30.5 | 221 | 362 |
| 30.5-40.5 | 439 | 801 |
| 40.5-50.5 | 529 | 1330 |
| 50.5-60.5 | 495 | 1825 |
| 60.5-70.5 | 322 | 2147 |
| 70.5-80.5 | 153 | 2300 |
Now, ЁЭСБ = 2300
тЯ╣`N/2 = 1150`
The cumulative frequency just greater than 1150 is 1330, and the corresponding class is 40.5-50.5.
Thus, the median class is 40.5-50.5
Now, class mark =`( "Upper class limit + Lower class lilit")/2`
`(40.5 + 50.5 )/2 = 91/2 = 45.5`
Thus, class mark of the median class is 45.5
(c)Here the maximum class frequency is 529, and the class corresponding to this frequency is 40.5-50.5
.So, the modal class is 40.5-50.5 and its cumulative frequency is 1330.
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The monthly profits (in Rs.) of 100 shops are distributed as follows:
| Profits per shop: | 0 - 50 | 50 - 100 | 100 - 150 | 150 - 200 | 200 - 250 | 250 - 300 |
| No. of shops: | 12 | 18 | 27 | 20 | 17 | 6 |
Draw the frequency polygon for it.
Find the median of the following data by making a ‘less than ogive’.
| Marks | 0 - 10 | 10-20 | 20 - 30 | 30 - 40 | 40 - 50 | 50 - 60 | 60 - 70 | 70 - 80 | 80-90 | 90-100 |
| Number of Students | 5 | 3 | 4 | 3 | 3 | 4 | 7 | 9 | 7 | 8 |
The monthly consumption of electricity (in units) of some families of a locality is given in the following frequency distribution:
| Monthly Consumption (in units) | 140 – 160 | 160 – 180 | 180 – 200 | 200 – 220 | 220 – 240 | 240 – 260 | 260 - 280 |
| Number of Families | 3 | 8 | 15 | 40 | 50 | 30 | 10 |
Prepare a ‘more than type’ ogive for the given frequency distribution.
The table given below shows the weekly expenditures on food of some households in a locality
| Weekly expenditure (in Rs) | Number of house holds |
| 100 – 200 | 5 |
| 200- 300 | 6 |
| 300 – 400 | 11 |
| 400 – 500 | 13 |
| 500 – 600 | 5 |
| 600 – 700 | 4 |
| 700 – 800 | 3 |
| 800 – 900 | 2 |
Draw a ‘less than type ogive’ and a ‘more than type ogive’ for this distribution.
Write the median class of the following distribution:
| Class | 0 – 10 | 10 -20 | 20- 30 | 30- 40 | 40-50 | 50- 60 | 60- 70 |
| Frequency | 4 | 4 | 8 | 10 | 12 | 8 | 4 |
Write the median class for the following frequency distribution:
| Class-interval: | 0−10 | 10−20 | 20−30 | 30−40 | 40−50 | 50−60 | 60−70 | 70−80 |
| Frequency: | 5 | 8 | 7 | 12 | 28 | 20 | 10 | 10 |
For a frequency distribution, mean, median and mode are connected by the relation
Calculate the mean of the following frequency distribution :
| Class: | 10-30 | 30-50 | 50-70 | 70-90 | 90-110 | 110-130 |
| Frequency: | 5 | 8 | 12 | 20 | 3 | 2 |
For the following distribution:
| C.I. | 0 - 5 | 6 - 11 | 12 - 17 | 18 - 23 | 24 - 29 |
| f | 13 | 10 | 15 | 8 | 11 |
the upper limit of the median class is?
Consider the following distribution:
| Marks obtained | Number of students |
| More than or equal to 0 | 63 |
| More than or equal to 10 | 58 |
| More than or equal to 20 | 55 |
| More than or equal to 30 | 51 |
| More than or equal to 40 | 48 |
| More than or equal to 50 | 42 |
The frequency of the class 30 – 40 is:
