Following data shows number of ICU admission (X) and number of death per day (Y) for...

Data on ICU hospitalization (X) and number of death (Y) for 5 days due to COVID-19...

Data on ICU hospitalization (X) and number of death (Y) for 5 days due to COVID-19 is given. Date In ICU (X) Death (Y) 04/25 50 21 04/26 80 35 04/27 87 31 04/28 92 45 04/29 118 50 Total 427 182 Find estimate  βˆ0 Question 10 options: 0.4367 -0.2198 0.1827 -0.8928 0.6741

Data on ICU hospitalization (X) and number of death (Y) for 5 days due to COVID-19...

Data on ICU hospitalization (X) and number of death (Y) for 5 days due to COVID-19 is given. Date In ICU (X) Death (Y) 04/25 50 21 04/26 80 35 04/27 87 31 04/28 92 45 04/29 118 50 Total 427 182 Find estimate  βˆ1 Question 9 options: 0.6741 -0.8928 0.1827 0.4367 -0.2198

1. An inventor has developed a new, energy-efficient lawn mower engine and claims that the engine...

1. An inventor has developed a new, energy-efficient lawn mower engine and claims that the engine will run continuously at least 300 minutes on a single gallon of regular gasoline. From his stock of 2000 engines, the inventor selects a simple random sample of 15 engines for testing. The engines run for an average of 305 minutes, with a sample standard deviation of 20 minutes. To test the inventors claim we use: Question 1 options: Two sided Z- test One...

The data shows the number of weeks employed and the number of errors made per day...

The data shows the number of weeks employed and the number of errors made per day for a sample of assembly line workers. Weeks (x) Errors (y) 1 20 1 18 2 16 4 10 4 8 5 4 6 3 8 1 10 2 11 1 12 0 12 1 Develop a scatter plot.  Describe the relationship between weeks and errors. Use a simple least square regression equation to predict the number of errors. Is there a significant relationship between...

The data represent number of flash drives sold per day at a local computer shop and...

The data represent number of flash drives sold per day at a local computer shop and their prices. Price (x)   Units Sold (y) $34 ................ 3 36 ................. 4 32 ................ 6 35 ............... 5 30 ............... 9 38 .............. 2 40 .............. 1 A.) Develop a least-squares regression line and explain what the slope of the line indicates. B.) Compute the coefficient of determination and comment on the strength of relationship between x and y. C.) Compute the sample...

The table below shows a set of bivariate data: X and Y. Calculate the covariance and...

The table below shows a set of bivariate data: X and Y. Calculate the covariance and correlation coefficients by completing the below table, assuming sample data. Show all workings. (Note: You can calculate the mean and standard deviation of X & Y with Excel or your calculator; no working for their calculation is required.) X Y (X - X bar) (Y - Y bar) (X - X bar)(Y - Y bar) 5 5 -0.2 -0.6 0.12 2 3 -3.2 -2.6...

Please show the work The following table shows the marginal benefit of activity X and Y....

Please show the work The following table shows the marginal benefit of activity X and Y. The price of X is $4 and the price of Y is $2. Quantity MBx MBY 1 20 14 2 16 12 3 12 8 4 10 6 5 8 5 6 6 4 a. Calculate the marginal benefits per dollar for each activity and put the values in columns 3 and 5 of the above table. If the total budget is $20, the...

The accompanying data represent the number of days​ absent, x, and the final exam​ score, y,...

The accompanying data represent the number of days​ absent, x, and the final exam​ score, y, for a sample of college students in a general education course at a large state university. Complete parts ​(a) through​ (e) below. LOADING... No. of ​absences, x 0 1 2 3 4 5 6 7 8 9 Final exam​ score, y 88.9 86.4 83.7 81.5 78.9 73.2 63.7 71.8 65.1 66.8 PrintDone Click the icon to view the absence count and final exam score...

Person number X Value Y Value Person number X Value Y Value Person number X Value...

Person number X Value Y Value Person number X Value Y Value Person number X Value Y Value 1 24 30 11 39 42 21 21 27 2 42 53 12 60 65 22 33 29 3 20 27 13 34 40 23 25 27 4 31 30 14 24 26 24 22 25 5 22 24 15 51 57 25 28 33 6 46 47 16 80 83 26 34 40 7 52 60 17 28 27 27 53...

The table below gives the number of hours spent unsupervised each day as well as the...

The table below gives the number of hours spent unsupervised each day as well as the overall grade averages for seven randomly selected middle school students. Using this data, consider the equation of the regression line, yˆ=b0+b1x for predicting the overall grade average for a middle school student based on the number of hours spent unsupervised each day. Keep in mind, the correlation coefficient may or may not be statistically significant for the data given. Remember, in practice, it would...