Unit 13: Multivariate Analysis




          13.1 Multivariate Analysis                                                            Notes

          In multivariate analysis, the number of variables to be tackled are many.


                 Example: The demand for television sets may depend not only on price, but also on the
          income of households, advertising expenditure incurred by TV manufacturer and other similar
          factors. To solve this type of problem, multivariate analysis is required.

          Classification

          Multiple-variate analysis: This can be classified under the following heads:

          1.   Multiple regression
          2.   Discriminant  analysis
          3.   Conjoint analysis
          4.   Factor analysis
          5.   Cluster  analysis

          6.   Multidimensional scaling.

          13.1.1 Multiple Regression

          In the case of simple linear regression, one variable, say,  X  is affected by a linear combination
                                                          1
          of another variable X  (we shall use X  and X  instead of Y and X used earlier). However, if X  is
                           2            1     2                                     1
          affected  by a linear combination  of more  than one variable, the regression is termed as  a
          multiple linear  regression.
          Let there be k variables X , X  ...... X , where one of these, say X , is affected by the remaining k –
                              1  2     k                    j
          1 variables. We write the typical regression equation as
          X  = a           + b           X  + b           X  +......(j = 1, 2,.... k).
           jc  j×1, 2, .... j–1, j + 1, .... k  j 1.2,3, .... j –1, j + 1, ....k  1  j 2.1, 3, .... j – 1, j + 1, ....k  2
          Here a    , b     ...... etc. are constants. The constant  a   is interpreted as the value of X
               j.1,2, ....  j1.2, 3, ....                j.1,2, ....                  j
          when X , X , ..... X , X   ..... X  are all equal to zero. Further, b  , b   etc.,
                2  3     j-1  j + 1  k                      j1.2,3, .... j–1, j + 1, ....k  j2.1,3, .... j –1, j +1, ....k
          are (k – 1) partial regression coefficients of regression of X  on X , X  ...... X  , X   ...... X .
                                                         j    1  2    j – 1  j + 1  k
          For simplicity, we shall consider three variables  X , X  and  X . The three possible regression
                                                    1  2     3
          equations can be written as
                                   X  = a   + b  X  + b  X                       .... (1)
                                    1c  1.23  12.3  2  13.2  3
                                   X  = a   + b  X  + b  X                       .... (2)
                                    2c  2.13  21.3  1  23.1  3
                                   X  = a   + b  X  + b  X                       .... (3)
                                    3c  3.12  31.2  1  32.1  2
          Given n observations on  X , X  and X , we want to find such  values of the constants of the
                                1  2      3
                                 n
                                           2
                                 å
          regression equation so that  ( X -  X ijc ) ,  j = 1, 2, 3, is minimised.
                                     ij
                                 i=  1
          For convenience, we shall use regression equations expressed in terms of deviations of variables
          from their respective means. Equation (1), on taking sum and dividing by n, can be written as
                                        å X  1c  =  +  å X  2  +  å X  3
                                          n    a 1.23  b 12.3  n  b 13.2  n






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