Unit 11: Analysis of Time Series




                                                                                                Notes


             Case Study  Production Estimate

                 uppose that there is a series of quarterly production figures (in thousand tonnes) in
                 an industry for the years 2004 to 2010 and the equation of linear trend fitted to the
             Sannual data is Xt = 107.2 + 2.93t , where t = year 2007 and Xt the annual production in
             time period t. Use this equation to estimate the annual production for the year 2005 and
             2011.
             Suppose now the quarterly indices of seasonal variations are: January-March 125, April-
             June 105, July-September 87,  October-December 88.  (The multiplicative model for the
             time series is assumed.) Use these indices to estimate the production  during the  first
             quarter of 1987.

          11.3 Summary

               A series of observations, on a variable, recorded after successive intervals of time is called
               a time series.
               The data on the population of India is a time series data where  time interval between
               two successive figures is 10 years. Similarly figures of national income, agricultural and
               industrial production, etc., are available on yearly basis.
               The analysis of time series implies its decomposition into various factors that affect the
               value of its variable in a given period.

               It is a quantitative and objective evaluation of the effects of various factors on the activity
               under consideration.
               Secular trend or simply trend is the general tendency of the data to increase or decrease or
               stagnate over a long period of time.
               Trend values of two or more time series can be used for their comparison
               Oscillatory movements, repeat  themselves after a regular  interval of time. This  time
               interval is known as the period of oscillation.
               The main objective of measuring seasonal variations is to eliminate the effect of seasonal
               variations from the data.
               Random variations are usually short-term variations but sometimes their effect may be so
               intense that the value of trend may get permanently affected.
               The main objectives of measuring seasonal variations is to understand their pattern.
               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 methods are:

                    Method of Simple Averages
                    Ratio to Trend Method
                    Ratio to Moving Average Method
                    Method of Link Relatives




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