The maximum discount value of the Entertainment card for the "Fine Dining" section for various pages is given in the table below. Page number Maximum value ($) 4 17 14 18 25 16 32 16 43 19 57 16 72 17 85 14 90 16 Let page number be the independent variable and maximum value be the dependent variable. Part (b) Calculate the least-squares line. Put the equation in the form of: 9 = a + bx. (Round your answers to three decimal places.) 9 = Part (c) Find the correlation coefficient. (Round your answer to four decimal places.) Is it significant? (Use a significance level of 0.05.) Yes No Part (d) Find the estimated maximum values for the restaurants on page ten and on page 70. (Round your answers to the nearest cent.) Page 10:$ Page 70: $ Part (0) Does it appear that the restaurants giving the maximum value are placed in the beginning of the "Fine Dining section? How did you arrive at your answer? Yes, there is a significant linear correlation so it appears there is a relationship between the page and the amount of the discount No, there is not a significant linear correlation to it appears there is no relationship between the page and the amount of the discount C Part (0) Suppose that there were 200 pages of restaurants. What do you estimate to be the maximum value for a restaurant fisted on page 2007 (Round your answer to the nearest cont> a Part() Is the least squares line valid for page 2007 Why or why not? Yes, the line produced a valid response for the maximum value No, using the regression equation to predict the maximum value for page 200 is extrapolation Part (h) What is the slope of the least squares (best-A) tine? (Round your answer to three decimal places) Interpret the slope As the page number increases by one page, the discount decreases by 5