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Question
Calculate quartile deviation and its relative measure from the following data:
| X | 0 - 10 | 10 - 20 | 20 - 30 | 30 - 40 | 40 - 50 | 50 - 60 |
| f | 5 | 10 | 13 | 18 | 14 | 8 |
Solution
| X | f | cf |
| 0 - 10 | 5 | 5 |
| 10 - 20 | 10 | 15 |
| 20 - 30 | 13 | 28 |
| 30 - 40 | 18 | 46 |
| 40 - 50 | 14 | 60 |
| 50 - 60 | 8 | 68 |
| N = 68 |
Q1 = Size of `("N"/4)^"th"` value
= Size of `(68/4)^"th"` value
= Size of 17th value
Thus Q1 lies in the class 20 - 30 and corresponding values are L = 20, `"N"/4` = 17, pcf = 15, f = 13, C = 10.
Q1 = `"L" + (("N"/4 - "pcf"))/"f" xx "C"`
= `20 + ((17 - 15)/13) xx 10`
= `20 + 2/13 xx 10`
= `20 + 20/13`
= 20 + 1.53846
= 20 + 1.5385
= 21.5385
Q3 = Size of `("3N"/4)^"th"` value
= Size of `(3 xx 68/4)^"th"` value
= Size of (3 × 17)th value
= Size of 51th value
Thus Q3 lies in the class 40 - 50 and corresponding values are L = 40, `"3N"/4` = 51, pcf = 46, f = 14, C = 10
Q3 = `"L" + (("3N"/4 - "pcf"))/"f" xx "C"`
= `40 + ((51 - 46)/14) xx 10`
= `40 + 5/14 xx 10`
= `40 + 50/14`
= 40 + 3.5714
= 43.5714
QD = `1/2 ("Q"_3 - "Q"_1)`
= `1/2 (43.5714 - 21.5385)`
= `1/2 (22.0329)`
= 11.01645
QD = 11.02
Relative measure, coefficient of QD = `("Q"_3 - "Q"_1)/("Q"_3 + "Q"_1)`
= `(43.5714 - 21.5385)/(43.5714 + 21.5385)`
= `22.0329/65.1099`
= 0.33839
= 0.3384
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