Population Variance Example for grouped data

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Home > Statistical Methods calculators > Mean, Median and Mode for grouped data example

Population Variance Example for grouped data ( Enter your problem )

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Formula & Example
Population Variance Example
Population Standard deviation Example
Population coefficient of variation Example

Other related methods

Mean, Median and Mode
Quartile, Decile, Percentile, Octile, Quintile
Population Variance, Standard deviation and coefficient of variation
Sample Variance, Standard deviation and coefficient of variation
Population Skewness, Kurtosis
Sample Skewness, Kurtosis
Geometric mean, Harmonic mean
Mean deviation, Quartile deviation, Decile deviation, Percentile deviation
Five number summary
Box and Whisker Plots
Mode using Grouping Method
Less than type Cumulative frequency table
More than type Cumulative frequency table
Class and their frequency table

1. Formula & Example
(Previous example)

3. Population Standard deviation Example
(Next example)

2. Population Variance Example

1. Calculate Population Variance `(sigma^2)` from the following grouped data
X Frequency
0 1
1 5
2 10
3 6
4 3

Solution:

`x` `(1)`	Frequency `(f)` `(2)`	`f*x` `(3)=(2)xx(1)`	`fx^2=(fx)xx(x)` `(4)=(3)xx(1)`
0	1	0	0
1	5	5	5
2	10	20	40
3	6	18	54
4	3	12	48
---	---	---	---
	`n=25`	`sum f*x=55`	`sum f*x^2=147`

Mean `bar x = (sum fx)/n`

`=55/25`

`=2.2`

Population Variance `sigma^2 = (sum f*x^2 - (sum f*x)^2/n)/n`

`=(147 - (55)^2/25)/25`

`=(147 - 121)/25`

`=26/25`

`=1.04`

2. Calculate Population Variance `(sigma^2)` from the following grouped data
X Frequency
10 3
11 12
12 18
13 12
14 3

Solution:

`x` `(1)`	Frequency `(f)` `(2)`	`f*x` `(3)=(2)xx(1)`	`fx^2=(fx)xx(x)` `(4)=(3)xx(1)`
10	3	30	300
11	12	132	1452
12	18	216	2592
13	12	156	2028
14	3	42	588
---	---	---	---
	`n=48`	`sum f*x=576`	`sum f*x^2=6960`

Mean `bar x = (sum fx)/n`

`=576/48`

`=12`

Population Variance `sigma^2 = (sum f*x^2 - (sum f*x)^2/n)/n`

`=(6960 - (576)^2/48)/48`

`=(6960 - 6912)/48`

`=48/48`

`=1`

3. Calculate Population Variance `(sigma^2)` from the following grouped data
Class Frequency
2 - 4 3
4 - 6 4
6 - 8 2
8 - 10 1

Solution:

Class `(1)`	Frequency `(f)` `(2)`	Mid value `(x)` `(3)`	`f*x` `(4)=(2)xx(3)`	`fx^2=(fx)xx(x)` `(5)=(4)xx(3)`
2-4	3	3	9	27
4-6	4	5	20	100
6-8	2	7	14	98
8-10	1	9	9	81
---	---	---	---	---
--	`n = 10`	--	`sum f*x=52`	`sum f*x^2=306`

Mean `bar x = (sum fx)/n`

`=52/10`

`=5.2`

Population Variance `sigma^2 = (sum f*x^2 - (sum f*x)^2/n)/n`

`=(306 - (52)^2/10)/10`

`=(306 - 270.4)/10`

`=35.6/10`

`=3.56`

4. Calculate Population Variance `(sigma^2)` from the following grouped data
Class Frequency
0 - 2 5
2 - 4 16
4 - 6 13
6 - 8 7
8 - 10 5
10 - 12 4

Solution:

Class `(1)`	Frequency `(f)` `(2)`	Mid value `(x)` `(3)`	`f*x` `(4)=(2)xx(3)`	`fx^2=(fx)xx(x)` `(5)=(4)xx(3)`
0-2	5	1	5	5
2-4	16	3	48	144
4-6	13	5	65	325
6-8	7	7	49	343
8-10	5	9	45	405
10-12	4	11	44	484
---	---	---	---	---
--	`n = 50`	--	`sum f*x=256`	`sum f*x^2=1706`

Mean `bar x = (sum fx)/n`

`=256/50`

`=5.12`

Population Variance `sigma^2 = (sum f*x^2 - (sum f*x)^2/n)/n`

`=(1706 - (256)^2/50)/50`

`=(1706 - 1310.72)/50`

`=395.28/50`

`=7.9056`

5. Calculate Population Variance `(sigma^2)` from the following grouped data
Class Frequency
10 - 20 15
20 - 30 25
30 - 40 20
40 - 50 12
50 - 60 8
60 - 70 5
70 - 80 3

Solution:

Class `(1)`	Frequency `(f)` `(2)`	Mid value `(x)` `(3)`	`d=(x-A)/h=(x-45)/10` `A=45,h=10` `(4)`	`f*d` `(5)=(2)xx(4)`	`f*d^2` `(6)=(5)xx(4)`
10 - 20	15	15	-3	-45	135
20 - 30	25	25	-2	-50	100
30 - 40	20	35	-1	-20	20
40 - 50	12	45=A	0	0	0
50 - 60	8	55	1	8	8
60 - 70	5	65	2	10	20
70 - 80	3	75	3	9	27
---	---	---	---	---	---
	`n = 88`	-----	-----	`sum f*d=-88`	`sum f*d^2=310`

Mean `bar x = A + (sum fd)/n * h`

`=45 + -88/88 * 10`

`=45 + -1 * 10`

`=45 + -10`

`=35`

Population Variance `sigma^2 = ((sum f*d^2 - (sum f*d)^2/n)/n) * h^2`

`=((310 - (-88)^2/88)/88) * 10^2`

`=((310 - 88)/88) * 100`

`=222/88 * 100`

`=2.5227 * 100`

`=252.2727`

6. Calculate Population Variance `(sigma^2)` from the following grouped data
Class Frequency
20 - 25 110
25 - 30 170
30 - 35 80
35 - 40 45
40 - 45 40
45 - 50 35

Solution:

Class `(1)`	Frequency `(f)` `(2)`	Mid value `(x)` `(3)`	`d=(x-A)/h=(x-37.5)/5` `A=37.5,h=5` `(4)`	`f*d` `(5)=(2)xx(4)`	`f*d^2` `(6)=(5)xx(4)`
20 - 25	110	22.5	-3	-330	990
25 - 30	170	27.5	-2	-340	680
30 - 35	80	32.5	-1	-80	80
35 - 40	45	37.5=A	0	0	0
40 - 45	40	42.5	1	40	40
45 - 50	35	47.5	2	70	140
---	---	---	---	---	---
	`n = 480`	-----	-----	`sum f*d=-640`	`sum f*d^2=1930`

Mean `bar x = A + (sum fd)/n * h`

`=37.5 + -640/480 * 5`

`=37.5 + -1.3333 * 5`

`=37.5 + -6.6667`

`=30.8333`

Population Variance `sigma^2 = ((sum f*d^2 - (sum f*d)^2/n)/n) * h^2`

`=((1930 - (-640)^2/480)/480) * 5^2`

`=((1930 - 853.3333)/480) * 25`

`=1076.6667/480 * 25`

`=2.2431 * 25`

`=56.0764`

This material is intended as a summary. Use your textbook for detail explanation.
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