Unit 11: Analysis of Time Series




          11.2 Seasonal Variations                                                              Notes

          If the time series data are in terms of annual figures, the seasonal variations are absent. These
          variations are likely to be present in data recorded on quarterly or monthly or weekly or daily
          or hourly basis. As discussed earlier, the seasonal variations are of periodic nature with period
          equal to one year. These variations reflect the  annual repetitive pattern of  the economic or
          business activity of any society. The main objectives of measuring seasonal variations are :
          1.   To understand their pattern.

          2.   To use them for short-term forecasting or planning.
          3.   To compare the pattern of seasonal variations of two or more time series in a given period
               or of the same series in different periods.

          4.   To  eliminate  the  seasonal  variations  from  the  data.  This  process  is  known  as
               deseasonalisation of data.

          11.2.1 Methods of Measuring Seasonal Variations

          The measurement of seasonal variation is done by isolating them from other components of a
          time series. There are four methods commonly used for the measurement of seasonal variations.
          These method are :
          1.   Method of Simple Averages

          2.   Ratio to Trend Method
          3.   Ratio to Moving Average Method
          4.   Method of Link Relatives
          Note: In the discussion of the above methods, we shall often  assume a  multiplicative model. However,
          with suitable modifications, these methods are also applicable to the problems based on additive model.

          Method of Simple Averages

          This method is used when the time series variable consists of only the seasonal and random
          components. The effect of taking average of data corresponding to  the same  period (say 1st
          quarter of each  year) is to eliminate the effect of random component and thus, the resulting
          averages consist of only seasonal component. These averages are then converted into seasonal
          indices, as explained in the following examples.


                 Example: Assuming that trend and cyclical variations are absent, compute the seasonal
          index for each month of the following data of sales (in   ‘000) of a company.

                 Year Jan Feb Mar Apr May Jun Jul Aug Sep Oct           Nov Dec
                 2008  46   45   44   46   45   47  46   43   40   40   41   45
                 2009  45   44   43   46   46   45  47   42   43   42   43   44
                 2010  42   41   40   44   45   45   46  43   41   40   42   45












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