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Question
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 |
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Solution
To find the mean let us put the data in the table given below:
| Class | Frequency `(f_i)` | Class mark `(x_i)` | `f_i x_i` |
| 0 – 50 | 2 | 25 | 50 |
| 50 – 100 | 3 | 75 | 225 |
| 100 – 150 | 5 | 125 | 625 |
| 150 – 200 | 6 | 175 | 1050 |
| 200 – 250 | 5 | 225 | 1125 |
| 250 – 300 | 3 | 275 | 825 |
| 300 – 350 | 1 | 325 | 325 |
| Total | `Ʃ f_i `= 25 | `Ʃ f_i x_i` = 4225 |
Mean =`( sum _i f_i x_i )/(sum _ i f_ i)`
=`4225/25`
= 169
Thus, mean of the given data is 169.
Now, to find the median let us put the data in the table given below:
| Class | Frequency `(f_i)` | Cumulative Frequency (cf) |
| 0 – 50 | 2 | 2 |
| 50 – 100 | 3 | 5 |
| 100 – 150 | 5 | 10 |
| 150 – 200 | 6 | 16 |
| 200 – 250 | 5 | 21 |
| 250 – 300 | 3 | 24 |
| 300 – 350 | 1 | 25 |
| Total | `N = Σ f_i = 25` |
Now, N = 25 ⇒`N/2 = 12.5`
The cumulative frequency just greater than 12.5 is 16 and the corresponding class is 150 – 200.
Thus, the median class is 150 – 200.
∴ l = 150, h = 50, N = 25, f = 6 and cf = 10.
Now,
Median = l +`((N/2 - cf)/f) xx h`
= 150`((122.5-10)/6) xx 50`
= 150 + 20.83
= 170.83
Thus, the median is 170.83.
We know that,
Mode = 3(median) – 2(mean)
= 3 × 170.83 – 2 × 169
= 512.49 – 338
= 174.49
Hence, Mean = 169, Median = 170.83 and Mode = 174.49
