This is question has multiple parts.
Extracted text: Calculate the residuals for the flocks identified. The residual for flock 2 is The residual for flock 17 is The residual for flock 35 is You want to test the significance of this regression equation. The null hypothesis can be phrased as: o The regression equation accounts for a significant portion of the variance in the y scores (counts from the photos) The intercept of the regression equation is greater than zero The slope of the regression equation is greater than zero o The regression equation does not account for a significant portion of the variance in the y scores (counts from the photos) The Pearson correlation is r= 0.8662, SSX = 327,086.00, and SSY = 339,559.64. Calculate the SSregression. the SSresidual and the percentage of the variance explained by the regression equation mentioned previously. The SSregression is explained is The SSresiduall is__. The percentage of the variance Use the Distributions tool to help you test the null hypothesis.(Note: Do not use the F-table to calculate the critical value as the answer requires an of an exact df to calculate the value.) F Distribution Numerator Degrees of Freedom - 26 Denominator Degrees of Freedom - 26 0.00 1.00 2.00 3.00 4.00 5.00 6.00 7.00 8.00 AAN F To test the null hypothesis, you will first need to find the critical value of F at alpha = 0.01. F is Next, calculate the F-ratio. The F-ratio i these results, you variance in the y scores (counts from the photos). Therefore, the null hypothesis is conclude that the regression equation accounts for a significant portion of the On the basis of
![Experienced observers use aerial survey methods to estimate the number of snow geese in their summer<br>range area west of Hudson Bay, Canada. A small aircraft flies over the range, and when a flock of geese<br>is spotted, the observer estimates the number of geese in the flock.<br>To investigate the reliability of the estimates, an airplane carrying two goose observers flies over 45<br>flocks. Each observer makes an independent estimate of the number of geese in each flock. A photograph<br>is taken of each flock and a count made of the number of geese in the photograph. The sample data for the<br>45 flocks appear in the DataView tool. [Data source: These data were obtained from Lunneborg. C. E.<br>(1994). Modeling experimental and observational data. Pacific Grove, CA: Duxbury Press.]<br>Data Set<br>Geese<br>Sample<br>Variables-3<br>Observations = 45<br>Count from a Photo and Observers' Estimates of the Size of Flocks of Geese<br>C. E. Lunneborg, Modeling Experimental and Observational Data, Duxbury Press, 1994<br>Variables<br>Observations<br>Type v<br>Missing V<br>Variable v<br>Form V<br>Values V<br>Observations<br>Photo<br>Quantitative<br>Numeric<br>45<br>A Estimate<br>Quantitative<br>Numeric<br>45<br>B Estimate<br>Quantitative<br>Numeric<br>45<br>Variable<br>Variable<br>Variable<br>Correlation<br>Correlation<br>You will work with goose observer A's estimates in this problem to examine how well observer A's<br>estimates predict counts from the associated photographs for the same flock. The photographs provide a<br>highly accurate count of geese; optimally, the observer's estimate would predict the photo-based count for<br>a specific flock.<br>First, use the regression equation to predict Y values based on observer A's estimates. The regression<br>equation, in the format Y = bX + a, is:<br>Ý = 0.88X + 26.65<br>where X = goose observer A's estimate,<br>Ý = an estimate of the goose count from the photograph<br>In this problem, Y is the actual count of geese in the photograph.<br>Note: The estimated regression equation can also be obtained by going to the Correlation section in the<br>DataView tool, specifying the proper dependent (Y) and independent (X) variables, and clicking on the<br>Linear Regression button.<br>Ý for flock 17 is<br>You will need to use the Observations list in the DataView tool to identify goose<br>observer A's estimate for the appropriate flock. Click on the Observations button in the tool and scroll to<br>Find the predicted Y values for the flocks 2, 17, and 35. Ÿ for flock 2 is<br>for flock 35 is<br>the appropriate flock number.<br>](https://s3.us-east-1.amazonaws.com/storage.unifolks.com/qimg-008/008_fyksw50-noxxcbmu.jpeg)
Extracted text: Experienced observers use aerial survey methods to estimate the number of snow geese in their summer range area west of Hudson Bay, Canada. A small aircraft flies over the range, and when a flock of geese is spotted, the observer estimates the number of geese in the flock. To investigate the reliability of the estimates, an airplane carrying two goose observers flies over 45 flocks. Each observer makes an independent estimate of the number of geese in each flock. A photograph is taken of each flock and a count made of the number of geese in the photograph. The sample data for the 45 flocks appear in the DataView tool. [Data source: These data were obtained from Lunneborg. C. E. (1994). Modeling experimental and observational data. Pacific Grove, CA: Duxbury Press.] Data Set Geese Sample Variables-3 Observations = 45 Count from a Photo and Observers' Estimates of the Size of Flocks of Geese C. E. Lunneborg, Modeling Experimental and Observational Data, Duxbury Press, 1994 Variables Observations Type v Missing V Variable v Form V Values V Observations Photo Quantitative Numeric 45 A Estimate Quantitative Numeric 45 B Estimate Quantitative Numeric 45 Variable Variable Variable Correlation Correlation You will work with goose observer A's estimates in this problem to examine how well observer A's estimates predict counts from the associated photographs for the same flock. The photographs provide a highly accurate count of geese; optimally, the observer's estimate would predict the photo-based count for a specific flock. First, use the regression equation to predict Y values based on observer A's estimates. The regression equation, in the format Y = bX + a, is: Ý = 0.88X + 26.65 where X = goose observer A's estimate, Ý = an estimate of the goose count from the photograph In this problem, Y is the actual count of geese in the photograph. Note: The estimated regression equation can also be obtained by going to the Correlation section in the DataView tool, specifying the proper dependent (Y) and independent (X) variables, and clicking on the Linear Regression button. Ý for flock 17 is You will need to use the Observations list in the DataView tool to identify goose observer A's estimate for the appropriate flock. Click on the Observations button in the tool and scroll to Find the predicted Y values for the flocks 2, 17, and 35. Ÿ for flock 2 is for flock 35 is the appropriate flock number.