How to Compute Vector Means

This lesson explains how to use matrix methods to compute the means of vector elements and the means of matrix columns.

Mean Scores: Vectors

In ordinary algebra, the mean of a set of observations is computed by adding all of the observations and dividing by the number of observations.

x = Σx_i / n

where x is the mean of observations, Σx_i is the sum of all observations, and n is the number of observations.

In matrix algebra, the mean of a set of n scores can be computed as follows:

x = 1'x ( 1'1 )^-1 = 1'x ( 1/n )

where

x is the mean of a set of n scores
1 is an n x 1 column vector of ones
x is an n x 1 column vector of scores: x₁, x₂, . . . , x_n

To show how this works, let's find the mean of elements of vector x, where x' = [ 1 2 3 ].

x   =

1'

x

(

1'

1

)-1

x   =

[ 1 1 1 ]

1 2 3

(

[ 1 1 1 ]

1 1 1

)-1

x   =   6/3   =   2

Thus, the mean of the elements of x is 2.

Mean Scores: Matrices

You can think of an r x c matrix as a set of c column vectors, each having r elements. Often, with matrices, we want to compute mean scores separately within columns, consistent with the equation below.

X_c = Σ X_ic / r

where

X_c is the mean of a set of r scores from column c
Σ X_ic is the sum of elements from column c

In matrix algebra, a vector of mean scores from each column of matrix X can be computed as follows:

m' = 1'X ( 1'1 )^-1 = 1'X ( 1/r )

where

m' is a row vector of column means, [ X₁   X₂ ... X_c ]
1 is an r x 1 column vector of ones
X is an r x c matrix of scores: X₁₁, X₁₂, . . . , X_rc

The problem below shows how everything works.

Test Your Understanding

Problem 1

Consider matrix X.

X   =

3 5 1 9 1 4

Using matrix methods, create a 1 x 3 vector m', such that the elements of m' are the mean of column elements from X. That is,

m' = [ X₁    X₂    X₃ ]

where X_i is the mean of elements from column i of matrix X.

Solution

To solve this problem, we use the following equation: m' = 1'X ( 1'1 )^-1. Each step in the computation is shown below.

m'   =	1'		X		(		1'		1	)-1
m'   =	[ 1 1 ]		3 5 1 9 1 4		(		[ 1 1 ]		1 1	)-1

m'  =

3+9   5+1   1+4

(

[ 1 1 ]

1 1

)-1

m'   =

12   6   5

*  0.5

m'   =

6   3   2.5

Thus, vector m has the mean column scores from matrix X. The mean score for column 1 is 6, the mean score for column 2 is 3, and the mean score for column 3 is 2.5.