Difference between revisions of "Manuals/calci/SKEW"

From ZCubes Wiki
Jump to navigation Jump to search
Line 22: Line 22:
  
 
==Examples==
 
==Examples==
 +
{| class="wikitable"
 +
|+Spreadsheet
 +
|-
 +
! !! A !! B !! C !! D!! E
 +
|-
 +
! 1
 +
| 0 || 4 || -5 ||9 || 1
 +
|-
 +
! 2
 +
| 29 || 9 || 11 || 20 || 2
 +
|-
 +
! 3
 +
| 41  || 11  || 18  ||6 || 3
 +
|-
 +
! 4
 +
| 18 ||10  || 7  ||42 ||5
 +
|-
 +
! 5
 +
| 4 || 5 || 9  ||78 || 6
 +
! 6
 +
| 38 || 9 || 13  ||48 || 11
 +
|}
 
1.Array={4,9,11,10,5}
 
1.Array={4,9,11,10,5}
 
SKEW(B1:B5)=-0.4369344921493
 
SKEW(B1:B5)=-0.4369344921493
Line 31: Line 53:
 
SKEW(C1:C6)=0
 
SKEW(C1:C6)=0
 
5.Array={1,2,3,5,6,11}
 
5.Array={1,2,3,5,6,11}
SKEW(A1:A6)=1.16584702768
+
SKEW(E1:E6)=1.16584702768
  
 
==See Also==
 
==See Also==

Revision as of 06:38, 21 January 2014

SKEW(n1,n2,…)


  • Failed to parse (syntax error): {\displaystyle n_1,n_2,…} are numbers to calculate the skewness.

Description

  • This function gives the Skewness of a distribution.
  • Skewness is a measure of the degree of asymmetry of a distribution.
  • A distribution(normal distribution) is symmetry ,it don't have a Skewness.
  • In a distribution the left tail is more pronounced than the right tail (towards more negative values) then the function is said to have Negative Skewness.
  • If a distribution is skewed to the right, the tail on the curve's right-hand side is longer than the tail on the left-hand side (towards more positive values), then the function is said to have a positive skewness.
  • In a Left Skewed Distribution, its
  • In a Normal Skewed Distribution, its
  • In a Right Skewed Distribution, its .
  • In is required. are optional.
  • In calci there is no restriction for giving the number of arguments.
  • The arguments can be be either numbers or names, array,constants or references that contain numbers.
  • Suppose the array contains text,logicl values or empty cells, like that values are not considered.
  • The equation for Skewness is defined by :

Where, is the sample standard deviation, represents a sample mean.

  • This function will return the result as error when
 1. Any one of the argument is non-numeric. 
 2. If there are fewer than three data points, or the Sample Standard Deviation is zero.

Examples

Spreadsheet
A B C D E
1 0 4 -5 9 1
2 29 9 11 20 2
3 41 11 18 6 3
4 18 10 7 42 5
5 4 5 9 78 6 6 38 9 13 48 11

1.Array={4,9,11,10,5} SKEW(B1:B5)=-0.4369344921493 2.Array={0,29,41,18,4,38} SKEW(A1:A6)=-0.21921252920 3.Array={-5,11,18,7} SKEW(C1:C4)=-0.715957010 4.Array={4,5,2,5,6,8} SKEW(C1:C6)=0 5.Array={1,2,3,5,6,11} SKEW(E1:E6)=1.16584702768

See Also


References