Advertisements
Advertisements
प्रश्न
Find lower quartile, upper quartile, 7th decile, 5th decile and 60th percentile for the following frequency distribution.
| Wages | 10 - 20 | 20 - 30 | 30 - 40 | 40 - 50 | 50 - 60 | 60 - 70 | 70 - 80 |
| Frequency | 1 | 3 | 11 | 21 | 43 | 32 | 9 |
Advertisements
उत्तर
| Wages | Frequency | Cumulative Frequency |
| 10 - 20 | 1 | 1 |
| 20 - 30 | 3 | 4 |
| 30 - 40 | 11 | 15 |
| 40 - 50 | 21 | 36 |
| 50 - 60 | 43 | 79 |
| 60 - 70 | 32 | 111 |
| 70 - 80 | 9 | 120 |
| N = 120 |
Lower quartile, Q1 = size of `("N"/4)^"th"` value
= size of `(120/4)^"th"` value
= size of 30th value
Q1 lies in the class (40 - 50) and its corresponding values are L = 40, `"N"/4` = 30, pcf = 15, f = 21 and C = 10
Q1 = `"L" +[("N"/4 - "pcf")/"f"] xx "C"`
= `40 + ((30 - 15)/21) xx 10`
= `40 + 15/21 xx 10`
= 40 + 7.14
= 47.4
Q3 = size of `("3N"/4)^"th"` value
= size of `((3 xx 120)/4)^"th"` value
= size of 90th value
Q3 lies in the class (60 - 70) and its corresponding values are L = 60, `"3N"/4` = 90, pcf = 79, f = 32 and C = 10.
Q3 = `"L" +[("3N"/4 - "pcf")/"f"] xx "C"`
= `60 + ((90 - 79)/32) xx 10`
= `60 + 11/32 xx 10`
= 60 + 3.4375
= 63.4375
= 63.44
7th decile = D7 = size of `("7N"/10)^"th"` value
= size of `((7 xx 120)/10)^"th"` value
= size of 84th value
Thus D7 lies in the class (60 - 70) and its corresponding values are L = 60, `"7N"/10` = 84, pcf = 79, f = 32 and C = 10.
D7 = `"L" +[("7N"/10 - "pcf")/"f"] xx "C"`
= `60 + ((84 - 79)/32) xx 10`
= `60 + 5/32 xx 10`
= `60 + 50/32`
= 60 + 1.5625
= 60 + 1.56
= 61.56
5th decile = D5 = size of `("5N"/10)^"th"` value
= size of `((5 xx 120)/10)^"th"` value
= size of 60th value
Thus D5 lies in the class (50 - 60) and its corresponding values are L = 50, `"5N"/10` = 60, pcf = 36, f = 43 and C = 10.
D5 = `"L" +[("5N"/10 - "pcf")/"f"] xx "C"`
= `50 + ((60 - 36)/43) xx 10`
= `50 + 24/43 xx 10`
= `50 + 240/43`
= 50 + 5.581
= 55.581
= 55.58
P60 = size of `("60N"/100)^"th"` value
= size of `((60 xx 120)/100)^"th"` value
= size of 72th value
Thus P60 lies in the class (50 - 60) and its corresponding values are L = 50, `"60N"/100` = 72, pcf = 36, f = 43 and C = 10.
P60 = `"L" +[("60N"/100 - "pcf")/"f"] xx "C"`
= `50 + ((72 - 36)/43) xx 10`
= `50 + 36/43 xx 10`
= 50 + 8.37
= 58.37
APPEARS IN
संबंधित प्रश्न
Find the first quartile and third quartile for the given observations.
2, 4, 6, 8, 10, 12, 14, 16, 18, 20, 22
Calculate GM for the following table gives the weight of 31 persons in the sample survey.
| Weight (lbs): | 130 | 135 | 140 | 145 | 146 | 148 | 149 | 150 | 157 |
| Frequency | 3 | 4 | 6 | 6 | 3 | 5 | 2 | 1 | 1 |
The monthly incomes of 8 families in rupees in a certain locality are given below. Calculate the mean, the geometric mean and the harmonic mean and confirm that the relations among them holds true. Verify their relationships among averages.
| Family: | A | B | C | D | E | F | G | H |
| Income (Rs.): | 70 | 10 | 50 | 75 | 8 | 25 | 8 | 42 |
When calculating the average growth of the economy, the correct mean to use is?
The best measure of central tendency is _________.
The harmonic mean of the numbers 2, 3, 4 is:
If the mean of 1, 2, 3, …, n is `(6"n")/11`, then the value of n is
The first quartile is also known as _________.
Which of the following best describes a 'measure of central tendency'?
The sum of deviations of all observations from the arithmetic mean of a dataset is always ______.
