Session 8

Session 8

Overview Forecasting Methods • Exponential Smoothing • Simple • Trend (Holt’s Method) • Seasonality (Winters’ Method) • Regression • Trend • Seasonality • Lagged Variables Applied Regression -- Prof. Juran

Forecasting • Analysis of Historical Data • Time Series (Extrapolation) • Regression (Causal) • Projecting Historical Patterns into the Future • Measurement of Forecast Quality Applied Regression -- Prof. Juran

Measuring Forecasting Errors • Mean Absolute Error • Mean Absolute Percent Error • Root Mean Squared Error • R-square Applied Regression -- Prof. Juran

Mean Absolute Error Applied Regression -- Prof. Juran

e n å i Y = 1 i i = 100 % * MAPE n e n å i ˆ Y = 1 i i = 100 % * Or, alternatively n Mean Absolute Percent Error Applied Regression -- Prof. Juran

Root Mean Squared Error Applied Regression -- Prof. Juran

R-Square Applied Regression -- Prof. Juran

Trend Analysis • Part of the variation in Y is believed to be “explained” by the passage of time • Several convenient models available in an Excel chart Applied Regression -- Prof. Juran

Example: Revenues at GM Applied Regression -- Prof. Juran

You can right-click on the data series, and choose to superimpose a trend line on the graph: Applied Regression -- Prof. Juran

Applied Regression -- Prof. Juran

You can also show moving-average trend lines, although showing the equation and R-square are no longer options: Applied Regression -- Prof. Juran

Simple Exponential Smoothing Applied Regression -- Prof. Juran

Why is it called “exponential”? See p. 918 in W&A for more details. Applied Regression -- Prof. Juran

Example: GM Revenue Applied Regression -- Prof. Juran

In this spreadsheet model, the forecasts appear in column G. Note that our model assumes that there is no trend. We use a default alpha of 0.10. Applied Regression -- Prof. Juran

We use Solver to minimize RMSE by manipulating alpha. After optimizing, we see that alpha is 0.350 (instead of 0.10). This makes an improvement in RMSE, from 4691 to 3653. Applied Regression -- Prof. Juran

Exponential Smoothing with Trend:Holt’s Method Weighted Current Level Weighted Current Observation Weighted Current Trend Applied Regression -- Prof. Juran

Holt’s model with optimized smoothing constants. This model is slightly better than the simple model (RMSE drops from 3653 to 3568). Applied Regression -- Prof. Juran

Exponential Smoothing with Seasonality:Winters’ Method Applied Regression -- Prof. Juran

Weighted Current Seasonal Factor Weighted Seasonal Factor from Last Year Applied Regression -- Prof. Juran

Winters’ model with optimized smoothing constants. This model is better than the simple model and the Holt’s model (as measured by RMSE). Applied Regression -- Prof. Juran

Forecasting with Regression Applied Regression -- Prof. Juran

Which Method is Better? The most reasonable statistic for comparison is probably RMSE for smoothing models vs. standard error for regression models, as is reported here: The regression models are superior most of the time (6 out of 10 revenue models and 7 out of 10 EPS models). Applied Regression -- Prof. Juran

Time series characterized by relatively consistent trends and seasonality favor the regression model. If the trend and seasonality are not stable over time, then Winters’ method does a better job of responding to their changing patterns. Applied Regression -- Prof. Juran

Lagged Variables • Only applicable in a causal model • Effects of independent variables might not be felt immediately • Used for advertising’s effect on sales Applied Regression -- Prof. Juran

Example: Motel Chain Applied Regression -- Prof. Juran

Session 8

Session 8

Presentation Transcript

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