Sample Skewness Example for grouped data

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

Sample Skewness Example for grouped data ( Enter your problem )

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Formula & Example
Sample Skewness Example
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1. Formula & Example
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3. Sample Kurtosis Example
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2. Sample Skewness Example

1. Calculate Sample Skewness from the following grouped data
X Frequency
0 1
1 5
2 10
3 6
4 3

Solution:
Skewness :
Mean `bar x=(sum f x)/n`

`=55/25`

`=2.2`

`x` `(2)`	`f` `(3)`	`f*x` `(4)=(2)xx(3)`	`(x-bar x)` `(5)`	`f*(x-bar x)^2` `(6)=(3)xx(5)`	`f*(x-bar x)^3` `(7)=(5)xx(6)`
0	1	0	-2.2	4.84	-10.648
1	5	5	-1.2	7.2	-8.64
2	10	20	-0.2	0.4	-0.08
3	6	18	0.8	3.84	3.072
4	3	12	1.8	9.72	17.496
---	---	---	---	---	---
--	`n=25`	`sum f*x=55`	`--	`=26`	`=1.2`

Sample Standard deviation `S = sqrt((sum (x - bar x)^2)/(n-1))`

`=sqrt(26/24)`

`=sqrt(1.0833)`

`=1.0408`

Sample Skewness `= (sum(x - bar x)^3)/((n-1)*S^3)`

`=1.2/(24*(1.0408)^3)`

`=1.2/(24*1.1276)`

`=0.0443`

2. Calculate Sample Skewness from the following grouped data
X Frequency
10 3
11 12
12 18
13 12
14 3

Solution:
Skewness :
Mean `bar x=(sum f x)/n`

`=576/48`

`=12`

`x` `(2)`	`f` `(3)`	`f*x` `(4)=(2)xx(3)`	`(x-bar x)` `(5)`	`f*(x-bar x)^2` `(6)=(3)xx(5)`	`f*(x-bar x)^3` `(7)=(5)xx(6)`
10	3	30	-2	12	-24
11	12	132	-1	12	-12
12	18	216	0	0	0
13	12	156	1	12	12
14	3	42	2	12	24
---	---	---	---	---	---
--	`n=48`	`sum f*x=576`	`--	`=48`	`=0`

Sample Standard deviation `S = sqrt((sum (x - bar x)^2)/(n-1))`

`=sqrt(48/47)`

`=sqrt(1.0213)`

`=1.0106`

Sample Skewness `= (sum(x - bar x)^3)/((n-1)*S^3)`

`=0/(47*(1.0106)^3)`

`=0/(47*1.0321)`

`=0`

3. Calculate Sample Skewness from the following grouped data
Class Frequency
2 - 4 3
4 - 6 4
6 - 8 2
8 - 10 1

Solution:
Skewness :
Mean `bar x=(sum f x)/(sum f)`

`=52/10`

`=5.2`

Class `(1)`	Mid value (`x`) `(2)`	`f` `(3)`	`f*x` `(4)=(2)xx(3)`	`(x-bar x)` `(5)`	`f*(x-bar x)^2` `(6)=(3)xx(5)`	`f*(x-bar x)^3` `(7)=(5)xx(6)`
2 - 4	3	3	9	-2.2	14.52	-31.944
4 - 6	5	4	20	-0.2	0.16	-0.032
6 - 8	7	2	14	1.8	6.48	11.664
8 - 10	9	1	9	3.8	14.44	54.872
---	---	---	---	---	---	---
--	--	`n=10`	`sum f*x=52`	`--	`=35.6`	`=34.56`

Sample Standard deviation `S = sqrt((sum (x - bar x)^2)/(n-1))`

`=sqrt(35.6/9)`

`=sqrt(3.9556)`

`=1.9889`

Sample Skewness `= (sum(x - bar x)^3)/((n-1)*S^3)`

`=34.56/(9*(1.9889)^3)`

`=34.56/(9*7.867)`

`=0.4881`

4. Calculate Sample Skewness 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:
Skewness :
Mean `bar x=(sum f x)/(sum f)`

`=256/50`

`=5.12`

Class `(1)`	Mid value (`x`) `(2)`	`f` `(3)`	`f*x` `(4)=(2)xx(3)`	`(x-bar x)` `(5)`	`f*(x-bar x)^2` `(6)=(3)xx(5)`	`f*(x-bar x)^3` `(7)=(5)xx(6)`
0 - 2	1	5	5	-4.12	84.872	-349.6726
2 - 4	3	16	48	-2.12	71.9104	-152.45
4 - 6	5	13	65	-0.12	0.1872	-0.0225
6 - 8	7	7	49	1.88	24.7408	46.5127
8 - 10	9	5	45	3.88	75.272	292.0554
10 - 12	11	4	44	5.88	138.2976	813.1899
---	---	---	---	---	---	---
--	--	`n=50`	`sum f*x=256`	`--	`=395.28`	`=649.6128`

Sample Standard deviation `S = sqrt((sum (x - bar x)^2)/(n-1))`

`=sqrt(395.28/49)`

`=sqrt(8.0669)`

`=2.8402`

Sample Skewness `= (sum(x - bar x)^3)/((n-1)*S^3)`

`=649.6128/(49*(2.8402)^3)`

`=649.6128/(49*22.912)`

`=0.5786`

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