SCENARIO 16-4 The number of cases of merlot wine sold by a Paso Robles winery in an 8-year period follows. \[\begin{array}{l} \text { Year Cases of Wine }\\ \begin{array} { l l } 2005 & 270 \\ 2006 & 356 \\ 2007 & 398 \\ 2008 & 456 \\ 2009 & 358 \\ 2010 & 500 \\ 2011 & 410 \\ 2012 & 376 \end{array} \end{array}\] -Referring to Scenario 16-4, exponential smoothing with a weight or smoothing constant of 0.2 will be used to smooth the wine sales. The value of E4, the smoothed value for 2008 is __________.

The answer of SCENARIO 16-4 The number of cases of merlot...

SCENARIO 16-1 The number of cases of chardonnay wine sold by a Paso Robles winery in an 8-year period follows. \[\begin{array} { c c } \text { Year } & \text { Cases of Wine } \\ \hline 2006 & 270 \\ 2007 & 356 \\ 2008 & 398 \\ 2009 & 456 \\ 2010 & 438 \\ 2011 & 478 \\ 2012 & 460 \\ 2013 & 480 \end{array}\] -Referring to Scenario 16-1, set up a scatter diagram (i.e., a time-series plot) with year on the horizontal X-axis.

The answer of SCENARIO 16-1 The number of cases of chardonnay...

Exam 16: Time-Series Forecasting

SCENARIO 16-15-A You are the CEO of a diary company. The total milk production (in gallons) from your company over the past 30 years are presented below and also contained in the Excel file SCENARIO 16- 15-A.XLSX. Year 1986 1987 1988 1989 1990 1991 1992 1993 1994 1995 1996 1997 1998 1999 2000 2001 2002 2003 2004 2005 2006 2007 2008 2009 2010 2011 2012 2013 2014 2015 Milk 150201 172719 171357 157121 155727 152974 153443 158548 162614 164210 Prod 159127 153866 165992 177843 167477 163821 161700 170348 174105 185103 184670 173385 159695 173641 165706 171164 168706 150684 179314 163802 You want to predict your company's future total milk production using the linear trend, quadratic trend, exponential trend, first-order autoregressive, second-order autoregressive and third-order autoregressive model. -Referring to Scenario 16-15-A, you can reject the null hypothesis for testing the appropriateness of the third-order autoregressive model at the 5% level of significance.

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Question 41

SCENARIO 16-14 A contractor developed a multiplicative time-series model to forecast the number of contracts in future quarters, using quarterly data on number of contracts during the 3-year period from 2011 to -Referring to Scenario 16-14, using the regression equation, which of the following values is the best forecast for the number of contracts in the second quarter of 2015?

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Question 42

SCENARIO 16-14 A contractor developed a multiplicative time-series model to forecast the number of contracts in future quarters, using quarterly data on number of contracts during the 3-year period from 2011 to -Referring to Scenario 16-14, the best interpretation of the coefficient of X (0.117) in the regression equation is:

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Question 43

In selecting an appropriate forecasting model, the following approaches are suggested:

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Question 44

SCENARIO 16-12 A local store developed a multiplicative time-series model to forecast its revenues in future quarters, using quarterly data on its revenues during the 5-year period from 2009 to 2013. The following is the resulting regression equation: $\log _ { 10 } \hat { Y } = 6.102 + 0.012 X - 0.129 Q _ { 1 } - 0.054 Q _ { 2 } + 0.098 Q _ { 3 }$ where $\hat { Y }$ is the estimated number of contracts in a quarter $X$ is the coded quarterly value with $X = 0$ in the first quarter of 2008 . $Q _ { 1 }$ is a dummy variable equal to 1 in the first quarter of a year and 0 otherwise. $Q _ { 2 }$ is a dummy variable equal to 1 in the second quarter of a year and 0 otherwise. $Q _ { 3 }$ is a dummy variable equal to 1 in the third quarter of a year and 0 otherwise. -Referring to Scenario 16-12, in testing the significance of the coefficient of X in the regression equation (0.012) which has a p-value of 0.0000. Which of the following is the best Interpretation of this result? a) The quarterly growth rate in revenues is significantly different from $0 \% ( \alpha = 0.05 )$ . b) The quarterly growth rate in revenues is not significantly different from $0 \%$ ( $\alpha =$ $0.05 )$ c) The quarterly growth rate in revenues is significantly different from $1.2 \% ( \alpha =$ $0.05$ ). d) The quarterly growth rate in revenues is not significantly different from $1.2 \% ( \alpha =$ 0.05).

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Question 45

SCENARIO 16-13 Given below is the monthly time series data for U.S. retail sales of building materials over a specific year. Month Retail Sales 1 6,594 2 6,610 3 8,174 4 9,513 5 10,595 6 10,415 7 9,949 8 9,810 9 9,637 10 9,732 11 9,214 12 9,201 The results of the linear trend, quadratic trend, exponential trend, first-order autoregressive, second-order autoregressive and third-order autoregressive model are presented below in which the coded month for the 1st month is 0: $\text { Linear trend model: }$ Coefficients Standard Error t Stat P-value Intercept 7950.7564 617.6342 12.8729 0.0000 Coded Month 212.6503 95.1145 2.2357 0.0494 $\text { Quadratic trend model: }$ $SCENARIO 16-13 Given below is the monthly time series data for U.S. retail sales of building materials over a specific year. \begin{array} { | c | c | } \hline \text { Month } & \text { Retail Sales } \\ \hline 1 & 6,594 \\ \hline 2 & 6,610 \\ \hline 3 & 8,174 \\ \hline 4 & 9,513 \\ \hline 5 & 10,595 \\ \hline 6 & 10,415 \\ \hline 7 & 9,949 \\ \hline 8 & 9,810 \\ \hline 9 & 9,637 \\ \hline 10 & 9,732 \\ \hline 11 & 9,214 \\ \hline 12 & 9,201 \\ \hline \end{array} The results of the linear trend, quadratic trend, exponential trend, first-order autoregressive, second-order autoregressive and third-order autoregressive model are presented below in which the coded month for the 1st month is 0: \text { Linear trend model: } \begin{array}{lrrrr} & \text { Coefficients } & \text { Standard Error } & \text { t Stat } & \text { P-value } \\ \hline \text { Intercept } & 7950.7564 & 617.6342 & 12.8729 & 0.0000 \\ \text { Coded Month } & 212.6503 & 95.1145 & 2.2357 & 0.0494 \end{array} \text { Quadratic trend model: } \text { Exponential trend model: } \begin{array}{lrrrr} \hline & \text { Coefficients } & \text { Standard Error } & \text { t Stat } & \text { P-value } \\ \hline \text { Intercept } & 3.8912 & 0.0315 & 123.3674 & 0.0000 \\ \text { Coded Month } & 0.0116 & 0.0049 & 2.3957 & 0.0376 \end{array} \text { First-order autoregressive: } \begin{array}{lrrrr} & \text { Coefficients } & \text { Standard Error } & t \text { Stat } & {\text { P-value }} \\ \hline \text { Intercept } & 3132.0951 & 1287.2899 & 2.4331 & 0.0378 \\ \text { YLag1 } & 0.6823 & 0.1398 & 4.8812 & 0.0009 \\ \hline \end{array} -Referring to Scenario 16-13, the best autoregressive model using the 5% level of significance is$ $\text { Exponential trend model: }$ Coefficients Standard Error t Stat P-value Intercept 3.8912 0.0315 123.3674 0.0000 Coded Month 0.0116 0.0049 2.3957 0.0376 $\text { First-order autoregressive: }$ Coefficients Standard Error t Stat P-value Intercept 3132.0951 1287.2899 2.4331 0.0378 YLag1 0.6823 0.1398 4.8812 0.0009 -Referring to Scenario 16-13, the best autoregressive model using the 5% level of significance is

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Question 46

The method of moving averages is used

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Question 47

SCENARIO 16-11 The manager of a health club has recorded mean attendance in newly introduced step classes over the last 15 months: 32.1, 39.5, 40.3, 46.0, 65.2, 73.1, 83.7, 106.8, 118.0, 133.1, 163.3, 182.8, 205.6, 249.1, and 263.5. She then used Microsoft Excel to obtain the following partial output for both a first- and second-order autoregressive model. -Referring to Scenario 16-11, using the first-order model, the forecast of mean attendance for month 17 is __________.

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Question 48

A least squares linear trend line is just a simple regression line with the years recoded.

(True/False)

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Question 49

SCENARIO 16-15-B You are the CEO of a diary company. The total milk production (in gallons) from your company over the past 30 years are presented below and also contained in the Excel file SCENARIO 16- 15-B.XLSX. Year 1986 1987 1988 1989 1990 1991 1992 1993 1994 1995 1996 1997 1998 1999 2000 2001 2002 2003 2004 2005 2006 2007 2008 2009 2010 2011 2012 2013 2014 2015 Milk 150201 193718 212520 214553 237507 248069 241824 234627 252049 252029 Prod 263449 260689 247900 260059 268197 249477 246216 265236 256364 241705 245932 243529 241551 247697 248454 241974 235823 243517 238490 248606 You want to predict your company's future total milk production using the linear trend, quadratic trend, exponential trend, first-order autoregressive, second-order autoregressive and third-order autoregressive model. -Referring to Scenario 16-15-B, what is the p-value of the t test statistic for testing the appropriateness of the first-order autoregressive model?

(Short Answer)

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Question 50

You need to decide whether you should invest in a particular stock. You would like to invest if the price is likely to rise in the long run. You have data on the daily mean price of this Stock over the past 12 months. Your best action is to

(Multiple Choice)

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Question 51

SCENARIO 16-15-B You are the CEO of a diary company. The total milk production (in gallons) from your company over the past 30 years are presented below and also contained in the Excel file SCENARIO 16- 15-B.XLSX. Year 1986 1987 1988 1989 1990 1991 1992 1993 1994 1995 1996 1997 1998 1999 2000 2001 2002 2003 2004 2005 2006 2007 2008 2009 2010 2011 2012 2013 2014 2015 Milk 150201 193718 212520 214553 237507 248069 241824 234627 252049 252029 Prod 263449 260689 247900 260059 268197 249477 246216 265236 256364 241705 245932 243529 241551 247697 248454 241974 235823 243517 238490 248606 You want to predict your company's future total milk production using the linear trend, quadratic trend, exponential trend, first-order autoregressive, second-order autoregressive and third-order autoregressive model. -Referring to Scenario 16-15-B, what is the p-value for the t test statistic for testing the significance of the quadratic term in the quadratic-trend model?

(Short Answer)

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Question 52

The principle of parsimony indicates that the simplest model that gets the job done adequately should be used.

(True/False)

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Question 53

SCENARIO 16-6 The president of a chain of department stores believes that her stores' total sales have been showing a linear trend since 1993. She uses Microsoft Excel to obtain the partial output below. The dependent variable is sales (in millions of dollars), while the independent variable is coded years, where 1993 is coded as 0, 1994 is coded as 1, etc. -Referring to Scenario 16-6, the forecast for sales (in millions of dollars) in 2015 is __________.

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Question 54

A trend is a persistent pattern in annual time-series data that has to be followed for several years.

(True/False)

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Question 55

SCENARIO 16-4 The number of cases of merlot wine sold by a Paso Robles winery in an 8-year period follows. Year Cases of Wine 2005 270 2006 356 2007 398 2008 456 2009 358 2010 500 2011 410 2012 376 -Referring to Scenario 16-4, exponential smoothing with a weight or smoothing constant of 0.2 will be used to smooth the wine sales. The value of E4, the smoothed value for 2008 is __________.

(Short Answer)

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Question 56

SCENARIO 16-13 Given below is the monthly time series data for U.S. retail sales of building materials over a specific year. Month Retail Sales 1 6,594 2 6,610 3 8,174 4 9,513 5 10,595 6 10,415 7 9,949 8 9,810 9 9,637 10 9,732 11 9,214 12 9,201 The results of the linear trend, quadratic trend, exponential trend, first-order autoregressive, second-order autoregressive and third-order autoregressive model are presented below in which the coded month for the 1st month is 0: $\text { Linear trend model: }$ Coefficients Standard Error t Stat P-value Intercept 7950.7564 617.6342 12.8729 0.0000 Coded Month 212.6503 95.1145 2.2357 0.0494 $\text { Quadratic trend model: }$ $SCENARIO 16-13 Given below is the monthly time series data for U.S. retail sales of building materials over a specific year. \begin{array} { | c | c | } \hline \text { Month } & \text { Retail Sales } \\ \hline 1 & 6,594 \\ \hline 2 & 6,610 \\ \hline 3 & 8,174 \\ \hline 4 & 9,513 \\ \hline 5 & 10,595 \\ \hline 6 & 10,415 \\ \hline 7 & 9,949 \\ \hline 8 & 9,810 \\ \hline 9 & 9,637 \\ \hline 10 & 9,732 \\ \hline 11 & 9,214 \\ \hline 12 & 9,201 \\ \hline \end{array} The results of the linear trend, quadratic trend, exponential trend, first-order autoregressive, second-order autoregressive and third-order autoregressive model are presented below in which the coded month for the 1st month is 0: \text { Linear trend model: } \begin{array}{lrrrr} & \text { Coefficients } & \text { Standard Error } & \text { t Stat } & \text { P-value } \\ \hline \text { Intercept } & 7950.7564 & 617.6342 & 12.8729 & 0.0000 \\ \text { Coded Month } & 212.6503 & 95.1145 & 2.2357 & 0.0494 \end{array} \text { Quadratic trend model: } \text { Exponential trend model: } \begin{array}{lrrrr} \hline & \text { Coefficients } & \text { Standard Error } & \text { t Stat } & \text { P-value } \\ \hline \text { Intercept } & 3.8912 & 0.0315 & 123.3674 & 0.0000 \\ \text { Coded Month } & 0.0116 & 0.0049 & 2.3957 & 0.0376 \end{array} \text { First-order autoregressive: } \begin{array}{lrrrr} & \text { Coefficients } & \text { Standard Error } & t \text { Stat } & {\text { P-value }} \\ \hline \text { Intercept } & 3132.0951 & 1287.2899 & 2.4331 & 0.0378 \\ \text { YLag1 } & 0.6823 & 0.1398 & 4.8812 & 0.0009 \\ \hline \end{array} -Referring to Scenario 16-13, what is the p-value of the t test statistic for testing the appropriateness of the second-order autoregressive model?$ $\text { Exponential trend model: }$ Coefficients Standard Error t Stat P-value Intercept 3.8912 0.0315 123.3674 0.0000 Coded Month 0.0116 0.0049 2.3957 0.0376 $\text { First-order autoregressive: }$ Coefficients Standard Error t Stat P-value Intercept 3132.0951 1287.2899 2.4331 0.0378 YLag1 0.6823 0.1398 4.8812 0.0009 -Referring to Scenario 16-13, what is the p-value of the t test statistic for testing the appropriateness of the second-order autoregressive model?

(Short Answer)

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Question 57

MAD is the summation of the residuals divided by the sample size.

(True/False)

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Question 58

SCENARIO 16-1 The number of cases of chardonnay wine sold by a Paso Robles winery in an 8-year period follows. Year Cases of Wine 2006 270 2007 356 2008 398 2009 456 2010 438 2011 478 2012 460 2013 480 -Referring to Scenario 16-1, set up a scatter diagram (i.e., a time-series plot) with year on the horizontal X-axis.

(Essay)

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Question 59

SCENARIO 16-15-A You are the CEO of a diary company. The total milk production (in gallons) from your company over the past 30 years are presented below and also contained in the Excel file SCENARIO 16- 15-A.XLSX. Year 1986 1987 1988 1989 1990 1991 1992 1993 1994 1995 1996 1997 1998 1999 2000 2001 2002 2003 2004 2005 2006 2007 2008 2009 2010 2011 2012 2013 2014 2015 Milk 150201 172719 171357 157121 155727 152974 153443 158548 162614 164210 Prod 159127 153866 165992 177843 167477 163821 161700 170348 174105 185103 184670 173385 159695 173641 165706 171164 168706 150684 179314 163802 You want to predict your company's future total milk production using the linear trend, quadratic trend, exponential trend, first-order autoregressive, second-order autoregressive and third-order autoregressive model. -Referring to Scenario 16-15-A, what is the p-value of the t test statistic for testing the appropriateness of the first-order autoregressive model?

(Short Answer)

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Question 60

Showing 41 - 60 of 235

In selecting an appropriate forecasting model, the following approaches are suggested:

The method of moving averages is used

A least squares linear trend line is just a simple regression line with the years recoded.

You need to decide whether you should invest in a particular stock. You would like to invest if the price is likely to rise in the long run. You have data on the daily mean price of this Stock over the past 12 months. Your best action is to

The principle of parsimony indicates that the simplest model that gets the job done adequately should be used.

A trend is a persistent pattern in annual time-series data that has to be followed for several years.

MAD is the summation of the residuals divided by the sample size.

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Fundamentals of Hypothesis Testing: One-Sample Tests

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