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Question
The mean of the following distribution is 53. Find the missing frequency p.
| Class Interval: | 0 – 20 | 20 – 40 | 40 – 60 | 60 – 80 | 80 – 100 |
| Frequency: | 12 | 15 | p | 28 | 13 |
Hence, find mode of the distribution.
Sum
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Solution
| Class Interval | Frequency (fi) | Class Mark (xi) | fixi |
| 0 – 20 | 12 | 10 | 120 |
| 20 – 40 | 15 | 30 | 450 |
| 40 – 60 | p | 50 | 50p |
| 60 – 80 | 28 | 70 | 1960 |
| 80 – 100 | 13 | 90 | 1170 |
| Total | 68 + p | 3700 + 50p |
Given Mean = 53.
`53 = (3700 + 50p)/(68 + p)`
53(68 + p) = 3700 + 50p
⇒ 3604 + 53p = 3700 + 50p
3p = 3700 – 3604
3p = 96
⇒ p = 32
Calculating Mode:
Since p = 32, the maximum frequency is 32.
Modal Class: 40 – 60
l = 40, f1 = 32, f0 = 15, f2 = 28, h = 20.
Mode = `40 + ((32 - 15)/(2(32) - 15 - 28)) xx 20`
Mode = `40 + (17/(64 - 43)) xx 20`
= `40 + 17/21 xx 20`
= `40 + 340/21`
= 40 + 16.19
= 56.19
The missing frequency p is 32 and the mode of the distribution is approximately 56.19.
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