Quantitative Techniques – I




                    Notes              The moving average of a group is always shown at the centre of its period. The process of
                                       computing moving averages smoothens out the fluctuations in the time series data. It can
                                       be shown that if the trend is linear and the oscillatory variations are regular, the moving
                                       average  with period  equal to the period  of oscillatory  variations would  completely
                                       eliminate them. Further, the effect of random variations would get minimised because the
                                       average of a  number of  observations must  lie between  the smallest  and the  largest
                                       observation. It should be noted here that the larger is the period of moving average the
                                       more would be the reduction in the effect of random component but more information is
                                       lost at the two ends of data.
                                       When the trend is non-linear, the moving averages would give biased rather than the
                                       actual trend values.

                                       Let Y , Y , ...... Y  be the n values of a time series for successive time periods 1, 2, ......  n
                                            1  2     n
                                       respectively. The calculation of 3-period and 4-period moving averages are shown in the
                                       following tables:




















                                       It should be noted that, in case of 3-period moving average, it is not possible to get the
                                       moving averages for the first and the last periods. Similarly, the larger is the period of
                                       moving average the more information will be lost at the ends of a time series.
                                       When the period of moving average is even, the computed average will correspond to the
                                       middle of the  two middle most periods.  These  values  should be  centered by  taking
                                       arithmetic mean of the two successive averages. The computation of moving average in
                                       such a case is also illustrated in the above table.


                                          Example: Determine the trend values of the following data by using 3-year moving
                                   average. Also find short-term fluctuations for various years, assuming additive model. Plot the
                                   original and the trend values on the same graph.

                                          Year      : 2001 2002 2003 2004 2005 2006 2007 2008 2009 2010
                                         Production
                                                    :  26   27   28    30   29   27   30    31   32   31
                                        ('000' tonnes)













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