1. Time-Series Analysis and Forecasting – Part III
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2. Time-Series Data Numerical data ordered over time
The time intervals can be annually, quarterly, daily, hourly, etc.
The sequence of the observations is important
Example 13
Year:
Sales:

3. A time-series plot is a two-dimensional plot of time series data
the vertical axis measures the variable of interest
the horizontal axis corresponds to the time periods
Statistics for Business and Economics, 6e © 2007 Pearson Education, Inc.

4. The problem of comparability of levels of time series
Jointing (смыкание) of time series

5. Since time series is formed during the long period of time, its levels are frequently incomparable

6. Reasons of the incomparability
Change of prices.
Different methods of calculation of the same indicator.
Change of «borders» (organizational, administrative)

7. The method of jointing time series is often used to ensure the comparability of data. It is necessary to have a transitional link (переходное звено) for jointing time series. Transitional link – is the period of time, for which the investigated indicator was calculated using the old method (in old borders) and the new method (in new borders). A transitional coefficient for this transitional is calculated, the transitional coefficient spreads over all the previous period of time

8. Example 14

9. Transitional coefficient

12. Analysis of the main tendency of time series

13. The levels of time series are formed under the influence of lots of factors. They can be divided into 5 groups

14. Time-Series Components
Trend Compo-nent
Secular Compo-nent
Seasonality Component
Cyclical Compo-nent
Irregular Compo-nent

15. 1. Determining (Определяющие) factors have a constant and strong influence on the examined indicator. They determine the main tendency (the trend) of time series

16. The trend component

17. Trend Component
Long-run increase or decrease over time (overall upward or downward movement)
Data taken over a long period of time
Sales
Upward trend
Time
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18. Trend Component Trend can be upward or downward
(continued)
Trend can be upward or downward
Trend can be linear or non-linear
Sales
Sales
Time
Time
Downward linear trend
Upward nonlinear trend
Statistics for Business and Economics, 6e © 2007 Pearson Education, Inc.

19. Real fluctuations around the trend

20. There are 4 kinds of charge or variations involved in time series analysis. They are:
2.Secular trend Ut. In the secular trends the value of variable tends to increase or decrease over a long period of time. The steady increase of the cost of living recorded by the Сonsumer price index is an example of secular trend. From year to year, the cost of living varies a great deal, but if we examine long-period, we see that the trend is toward a steady increase.

21. 3. Cyclical fluctuation Vt
3. Cyclical fluctuation Vt. The most common example of cyclical fluctuation is the business cycle. Over time, there are years when the business cycle hits a peak above the trend line. At other times, business activity is likely to slump, hitting a low point below the trend line. The time between hitting peaks and falling to low points is at least one year and it can be as many as 15 or 20 years.

22. Cyclical Component Long-term wave-like patterns
Regularly occur but may vary in length
Often measured peak to peak or trough to trough
1 Cycle
Sales
Year
Statistics for Business and Economics, 6e © 2007 Pearson Education, Inc.

23. 4. Seasonal variation St involves pattern of change within year that tend to be repeated from year to year. For example the consumption of drinks, juices, ice cream and other. Seasonal factors give rise to oscillations relative to the main tendency

24. Seasonal Component Short-term regular wave-like patterns
Observed within 1 year
Often monthly or quarterly
Sales
Summer
Winter
Summer
Fall
Winter
Spring
Fall
Spring
Time (Quarterly)
Statistics for Business and Economics, 6e © 2007 Pearson Education, Inc.

25. 5. Irregular variation εt
5. Irregular variation εt. The value of variable may be completely unpredictable changing in random manner. For example, the Iraqi situation in 1990, the ruble devaluation in 1998 and the others. Random factors cause the random fluctuations of levels of series (for example, weather factor)
Statistics for Business and Economics, 6e © 2007 Pearson Education, Inc.

26. Thus each value of time series could be presented as follows:
5. Irregular variation εt. The value of variable may be completely unpredictable changing in random manner. For example, the Iraqi situation in 1990, the ruble devaluation in 1998 and the others.
Thus each value of time series could be presented as follows:
Statistics for Business and Economics, 6e © 2007 Pearson Education, Inc.

27. Irregular Component Unpredictable, random, “residual” fluctuations
Due to random variations of
Nature
Accidents or unusual events
“Noise” in the time series
Statistics for Business and Economics, 6e © 2007 Pearson Education, Inc.

28. Time-Series Component Analysis
Used primarily for forecasting
Observed value in time series is the sum or product of components
Additive Model
Multiplicative model (linear in log form)
where Tt = Trend value at period t
St = Seasonality value for period t
Ct = Cyclical value at time t
It = Irregular (random) value for period t
Statistics for Business and Economics, 6e © 2007 Pearson Education, Inc.

29. Smoothing the Time Series
Calculate moving averages to get an overall impression of the pattern of movement over time
This smooths out the irregular component
Moving Average: averages of a designated
number of consecutive
time series values
Statistics for Business and Economics, 6e © 2007 Pearson Education, Inc.

30. Method of interval enlargement

31. Method of interval enlargement consists in replacement of initial levels of series by the average values, which are calculated for the enlarged intervals

32. Example 15
Month yt
Quarterly sums
Average monthly value
(per quarter) 1
5.1 2
5.4
15.7
5.23 3
5.2 4
5.3 5
5.6
16.7
5.57 6
5.8 7 8
5.9
17.6
5.87 9
6.1 10
6.0 11
18.1
6.03 12
6.2

33. The End of Part III To be continued
Statistics for Business and Economics, 6e © 2007 Pearson Education, Inc.