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Chapter 4 SIMPLE SMOOTHING METHODS

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Alpha Based on Desired Simple Moving Average = 2/(n 1) or n = 2/ - 1 (4-8) Consider the use of the following alphas: For alpha of .1: n = 2/.1 - 1 = 19.00 ... – PowerPoint PPT presentation

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Title: Chapter 4 SIMPLE SMOOTHING METHODS


1
Chapter 4SIMPLE SMOOTHING METHODS
  • MOVING AVERAGES
  • SIMPLE MOVING AVERAGES (SMA)
  • WEIGHTED MOVING AVERAGES (WMA)
  • SINGLE EXPONENTIAL
  • SMOOTHING DERIVATION OF EXPONENTIAL WEIGHTS
  • SEASONAL EXPOS - FORECASTING U.S. MARRIAGES
  • ADAPTIVE RESPONSE-RATE EXPOS (ARRES)
  • FORECASTING LOW-VOLUME AND ERRATIC SERIES
  • I know of no way of judging the future but by the
    past. Patrick Henry, Virginia Convention, 1775

2
INTRODUCTION
  • Simple Smoothing are not General Models
  • Simple Smoothing for Simple Series.
  • Do Not Include Trends or Seasonality.
  • May Work Well c Deseasonalized Data.

3
SIMPLE MOVING AVERAGES (SMA)
  • SMA4(May) (JanFebMarApr)/4
  • (120124122123)/4
  • 122.25
  • Ft (At-1 At-2 At-3 At-4)
  • SMA4(Jun) (Feb Mar Apr May)/4
  • (124122123125)/4
  • 123.50

4
  • Ft1 (At At-1 At-2 At-3)/4 S
    (At - Ft) et (4-1)
  • n et2 S(At - Ft)2
    (4-2) S et2 RSE
    (4-3)
  • n - 1 where
    At Actual demand
    Ft Forecasted demand
    n Number of errors

5
Choosing the Best Forecasting Model - Min
RSE
  • A probability statementActual Jan
    (t25)(NovDec)/2 /-1.96RSE
    (137138)/2 /-1.962.12 137.5-4.16
    to 137.54.16 133.34 to
    141.66Figure 4-1.Two, Four, and Eight -
    Period Moving Average for Data of Table 4-1.

6
Optimal Number of Periods in a Moving Average
  • is that number minimizing the RSE.
  • When to Use Simple Moving AveragesFor
    patternless series W/O trend or seasonality.
    Patternless-erratic use a longer-period.
  • Smooth (highly autocorrelated) a shorter-period
    average.

7
WEIGHTED MOVING AVERAGES (WMA)
  • WMA(May) .1Jan.2Feb.3Mar.4Apr
    .1120.2124.3122.4123
    122.6 Ft .1At-4 .2At-3 .3At -2
    .4At-1
  • Limitations of the SMA and the WMA
  • Do not model seasonality or trend.
  • Expo. Smo. is more efficient.
  • Difficult to determine the optimal No. of
    periods.

8
SINGLE EXPONENTIALSMOOTHING
  • Ft ?At-1 (1-?)Ft-1 (4-4)whereFt
    Exp. smoothed F. for period tAt-1 Actual
    demand in the prior periodFt-1 Exp. smoothed
    F. of the pri. perioda Smoothing constant,
    called alpha
  • Ft ?At-1 (1-?)Ft-1 .301,000
    (1-.3)900 300 630 930 unitsAlpha(?)
    yields weights for each term

9
  • Ft ?At-1 (1-?)Ft-1 .301,000
    (1-.3)900 300 630 930 At
    980, then Ft1 ?At (1-?)Ft
    .30980 (1-.3)930 945
  • A Re-expression of the SES equation is Ft
    Ft-1 ?(At-1 - Ft-1) (4-5)

10
The Smoothing Constant
  • Actuals Weight
    Most recent " 0.300One period
    old " (1- ") 0.210 Two periods
    old " (1- " )(1- ") 0.147Three
    periods old "(1- ")(1-")(1-") 0.1029
    Alpha 1.0
    -gt zero smoothing Ft "At-1 (1-")Ft-1
    1At-1 (1-1)Ft-1 At-1 (4-6)

11
CHOOSING THE BEST ALPHA
  • Alpha Based on AutocorrelationsAlpha Based on
    Desired Simple Moving Average ? 2/(n1)
    or n 2/? - 1 (4-8)Consider the use of the
    following alphasFor alpha of .1 n 2/.1 - 1
    19.00For alpha of .3 n 2/.3 - 1
    5.67For alpha of .6 n 2/.6 - 1 2.33For
    alpha of .9 n 2/.9 - 1 1.22Alpha Based
    on Minimum Residual Standard Error

12
DERIVATION OF EXPONENTIAL WEIGHTS FOR
PAST ACTUALS
  • The basic exponential smoothing model Ft
    aAt-1 (1-a)Ft-1 (4-9)
  • Thus, the following equations are also
    true Ft-1 aAt-2 (1-a)Ft-2 (4-10) Ft-2
    aAt-3 (1-a)Ft-3 (4-11) Ft-3 aAt-4
    (1-a)Ft-4 (4-12) Ft-4 aAt-5
    (1-a)Ft-5 (4-13)

13
  • Through SubstitutionFt "At-1(1-")"At-2(1
    -")Ft-2 (4-14)Ft "At-1(1-")"At-2
    (1-")("At-3
  • (1-")Ft-3) (4-15) Ft
    "At-1(1-")1"At-2(1-")2"At-3
  • (1-")3Ft-3 (4-16)Ft
    weighted moving average of At-k's
  • and one Ft-kF(t) " At-1 (1- ")1
    " At-2 (1- ")2 " At-3 (1-
    ")3At-4 (1- a)4 a At-5
  • (1- a)5 " At- 6 (1- ")6 " At-7
    ...
  • (1 - ")nFt-n (4 -17)where
    Ft-n Initial forecast in period t-n

14
SEASONAL EXPOS EXAMPLE FORECASTING MARRIAGES IN
THE UNITED STATES
  • Ft aAt-s (1-a)Ft-s (4-18)where s
    length of the seasonal cycle
  • Quarterly Marriages Ft aAt-4 (1-
    a)Ft-4 (4-19) Optimal alpha .435

15
  • Statistics of the original series At are Mean
    599,909.44 Standard Deviation
    116,739.84 The ACFS of At 1 2 3
    4 -0.12496 -0.71134 -0.10884 0.87531
    5 6 7 8 -0.10276 -0.61304
    -0.10676 0.74338 2SeACF .35

16
  • Ft .435At-4 (1-.435)Ft-4 (4-20)Model
    ResultsR2 0.9879 RSE 12823.98 MAPE
    1.79R-2 1-(12,823.98)2/(116,739.84)2 .9879
    chapter

17
  • Table 4-5. Fitted and Residuals of Marriages
    using Eq. 4-10.DATE
    MARRIAGES FITTED RESIDUAL ERROR198501
    420240 NA NA
    NA198502 703900 NA
    NA NA198503 709010
    NA NA NA198504
    579475 NA NA
    NA198601 416040 420240.0
    -4200.0 -1.0198602 701072
    703900.0 -2828.0 -0.4 ?199201
    423000 414657.0 8343.0
    2.0199202 662000 687064.0 -25064.0
    -3.8199203 697000
    709045.5 -12045.5 -1.7199204
    579000 589175.3 -10175.3
    -1.8Mean
    599,909 601,878 -2,432.2 -0.39
    Std.Dev. 116,740 118,211 12,824
    2.13

18
  • The ets have patternless ACFs 1
    2 3 4 -0.02162 0.28913 0.01340 0.11240
    5 6 7 8 -0.08242 -0.15865
    -0.18035 -0.22533

19
  • Most EXPSMO models do not yield white noise
    residuals. However, if a model has
  • low ACFs
  • high R2 and
  • low RSE
  • EXPOS is Versatile.

20
ADAPTIVE RESPONSE-RATE EXPONENTIAL SMOOTHING
(ARRES)
  • SADt
  • TSTt (4-20)
  • MADt
  • SADt b(At - Ft) (1 - b)SADt-1 (4-21)
  • MADt bAt - Ft/ (1 - b)MADt-1 (4-22)

21
  • where TSTt Tracking signal in t used for
    alpha in forecasting period t
    1 b Beta, a smoothing constant often
    0.2
  • SADt An exponentially weighted average
    deviation (mean forecast error) in
  • period t MADt An
    exponentially weighted mean
  • absolute forecast error in period t
    Denotes absolute values

22
  • Ft Ft-1 TSTt-1(At-1 - Ft-1) (4-23) 0 ?
    TSTt-1 ? 1

23
FORECASTING LOW-VALUE OR ERRATIC SERIES
  • With high Cv and no seasonal or trend, patterns
    difficult to forecast. Then (1) forecast the
    series as well as possible (2) group
    the demands to improve forecast accuracy.

24
  • Patterns in Low-Value SeriesLow volume series
    can possess patterns and are more easily
    forecasted.
  • Low-Volume and Erratic DemandsWith these simple
    smoothing methods are the best.

25
  • Group Patterns in Low-Volume or Erratic
    SeriesIndividual f (20 from pattern 80
    from random) Group f (60 from pattern
    40 from random) Extremely
    Low-Volume ValuesWith extremely low means,
    sometimes a fractional unit per period, Errors
    should be modeled with different distributions.
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