Here are the data for radioactive decay of radioctive sample: Time 1 3 5 7 Log...

Here are the data for radioactive decay of radioactive sample: Time 1 3 5 7 Log...

Here are the data for radioactive decay of radioactive sample: Time 1 3 5 7 Log Count 6.36662 5.77194 5.31677 4.76331 The least-squares regression line for these data is count=6.6077+(−0.26326 ⋅time)count=6.6077+(−0.26326 ⋅time). Calculate the residuals for the given counts. Residual is actual value minus predicted value. (Use decimal notation. Give your answer to five decimal places.) Residual for case 1 is Residual for case 2 is Residual for case 3 is Residual for case 4 is

X Y 9 -2.8 4 3.1 6 -4.9 2 1.2 8 -5.9 The sample of five...

X Y 9 -2.8 4 3.1 6 -4.9 2 1.2 8 -5.9 The sample of five observations for the variables x and y has been collected . The least squares regression line for this sample is y = 4 − x.  Draw a scatter plot for this dataset and add the regression line.  In this diagram, indicate the five residuals of this linear regression .  Calculate the predicted value and the residual for the point (6, −.9).

Select all the statements that are true of a least-squares regression line. 1. R2 measures how...

Select all the statements that are true of a least-squares regression line. 1. R2 measures how much of the variation in Y is explained by X in the estimated linear regression. 2.The regression line maximizes the residuals between the observed values and the predicted values. 3.The slope of the regression line is resistant to outliers. 4.The sum of the squares of the residuals is the smallest sum possible. 5.In the equation of the least-squares regression line, Y^ is a predicted...

Given the data (-1, 0), (3, 8), (4, 13), (9, 19), (12, 27), find the following...

Given the data (-1, 0), (3, 8), (4, 13), (9, 19), (12, 27), find the following Least-squares regression line (round to four decimal places) Find  Linear Correlation Coefficient for the above Least Squares Regression line Find the Standard Error of Estimate for the above Least Squares Regression line Find the Interval Estimate at 95% significance level of the slope for the above Least Squares Regression line. Give the lower bound give the upper bound Find The Margin of Error for the...

Consider the data. xi 1 2 3 4 5 yi 3 7 5 11 14 The...

Consider the data. xi 1 2 3 4 5 yi 3 7 5 11 14 The estimated regression equation for these data is ŷ = 0.20 + 2.60x. (a) Compute SSE, SST, and SSR using equations SSE = Σ(yi − ŷi)2, SST = Σ(yi − y)2, and SSR = Σ(ŷi − y)2. SSE = SST = SSR = (b) Compute the coefficient of determination r2. r2 = Comment on the goodness of fit. (For purposes of this exercise, consider a...

Consider the data. xi 1 2 3 4 5 yi 3 7 4 10 12 The...

Consider the data. xi 1 2 3 4 5 yi 3 7 4 10 12 The estimated regression equation for these data is ŷ = 0.90 + 2.10x. (a)Compute SSE, SST, and SSR using equations SSE = Σ(yi − ŷi)2,SST = Σ(yi − y)2,and SSR = Σ(ŷi − y)2. SSE= SST= SSR= (b)Compute the coefficient of determination r2. r2= Comment on the goodness of fit. (For purposes of this exercise, consider a proportion large if it is at least 0.55.)...

Consider the data. xi 1 2 3 4 5 yi 3 7 4 10 12 The...

Consider the data. xi 1 2 3 4 5 yi 3 7 4 10 12 The estimated regression equation for these data is ŷ = 0.90 + 2.10x. (a) Compute SSE, SST, and SSR using equations SSE = Σ(yi − ŷi)2, SST = Σ(yi − y)2, and SSR = Σ(ŷi − y)2. SSE=SST=SSR= (b) Compute the coefficient of determination r2. r2 = Comment on the goodness of fit. (For purposes of this exercise, consider a proportion large if it is...

Consider the data. xi 1 2 3 4 5 yi 4 7 6 10 13 The...

Consider the data. xi 1 2 3 4 5 yi 4 7 6 10 13 The estimated regression equation for these data is ŷ = 1.70 + 2.10x. (a) Compute SSE, SST, and SSR using equations SSE = Σ(yi − ŷi)2, SST = Σ(yi − y)2, and SSR = Σ(ŷi − y)2. SSE= SST= SSR= (b) Compute the coefficient of determination r2. r2= Comment on the goodness of fit. (For purposes of this exercise, consider a proportion large if it...

Match the statistics term with its BEST definition. Question 2 options: A key requirement for using...

Match the statistics term with its BEST definition. Question 2 options: A key requirement for using correlation and regression models is to collect this type of data. With bivariate data, the result of MINIMIZING the sum of squared distances between the observed and predicted values (residuals) for a linear model. This quantity is computed by subtracting the observed response variable from the predicted response variable. With bivariate data, when one variable increases a second variable decrease implies this relationship. A...

Given the following five pairs of (x, y) values, x 5 3 10 7 14 y...

Given the following five pairs of (x, y) values, x 5 3 10 7 14 y 10 6 4 3 0 Determine the least squares regression line. ANSWER correct to 4 decimal places