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Question
Calculate the mean of the distribution, given below using the short cut method:
| Marks | 11 – 20 | 21 – 30 | 31 – 40 | 41 – 50 | 51 – 60 | 61 – 70 | 71 – 80 |
| No. of students | 2 | 6 | 10 | 12 | 9 | 7 | 4 |
Solution 1
| Marks | f | x | d = x – A = x – 45.5 | fd |
| 11 – 20 | 2 | 15.5 | –30 | –60 |
| 21 – 30 | 6 | 25.5 | –20 | –120 |
| 31 – 40 | 10 | 35..5 | –10 | –100 |
| 41 – 50 | 12 | A = 45.5 | 0 | 0 |
| 51 – 60 | 9 | 55.5 | 10 | 90 |
| 61 – 70 | 7 | 65.5 | 20 | 140 |
| 71 – 80 | 4 | 75.5 | 30 | 120 |
| ∑f = 50 | ∑fd = 70 |
∴ Mean = `A + (sumfd)/(sumf)`
= `45.5 + 70/50`
= `45.5 + 7/5`
=`(227.5 +7)/5`
= `234.5/5`
= 46.9
Solution 2
| Class Interval (Inclusive form) |
Class Interval (Exclusive form) |
No. of Students `bb((f_i))` |
`bb(x_i)` | `bb(A = 45.5)` `bb(d_i = x - 45.5)` |
`bb(f_i d_i)` |
| 11 – 20 | 10.5 – 20.5 | 2 | 15.5 | –30 | `{:(-60),(-120),(-100):}} - 280` |
| 21 – 30 | 20.5 – 30.5 | 6 | 25.5 | –20 | |
| 31 – 40 | 30.5 – 40.5 | 10 | 35.5 | –10 | |
| 41 – 50 | 40.5 – 50.5 | 12 | 45.5 | 0 | 0 |
| 51 – 60 | 50.5 – 60.5 | 9 | 55.5 | 10 | `{:(90),(140),(120):}} 350` |
| 61 – 70 | 60.5 – 70.5 | 7 | 65.5 | 20 | |
| 71 – 80 | 70.5 – 80.5 | 4 | 75.5 | 30 | |
| `sumf_i = 50` | `sumf_i d_i = 70` |
Assumed mean (A) = 45.5
`sumf_i = 50, sumf_i d_i = 70`
Mean = `A + (sumf_i d_i)/(sumf_i)`
= `45.5 + (70)/(50)`
= 45.5 + 1.4
= 46.9
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