The table below gives the number of hours ten randomly selected students spent studying and their corresponding midterm exam grades. Using this data, consider the equation of the regression line, y^=b0+b1x, for predicting the midterm exam grade that a student will earn based on the number of hours spent studying. Keep in mind, the correlation coefficient may or may not be statistically significant for the data given. Remember, in practice, it would not be appropriate to use the regression line to make a prediction if the correlation coefficient is not statistically significant.

Hours Studying	0	1	2	2.5	3	3.5	4	4.5	5.5	6
Midterm Grades	61	64	65	66	71	79	84	88	94	98

Summation Table

	x	y	xy	x2	y2
Student 1	0.0	61	0.0	0.00	3721
Student 2	1.0	64	64.0	1.00	4096
Student 3	2.0	65	130.0	4.00	4225
Student 4	2.5	66	165.0	6.25	4356
Student 5	3.0	71	213.0	9.00	5041
Student 6	3.5	79	276.5	12.25	6241
Student 7	4.0	84	336.0	16.00	7056
Student 8	4.5	88	396.0	20.25	7744
Student 9	5.5	94	517.0	30.25	8836
Student 10	6.0	98	588.0	36.00	9604
Sum	32.0	770	2685.5	135.00	60920

Step 1 of 6:

Find the estimated slope. Round your answer to three decimal places.

Step 2 of 6:

Find the estimated y-intercept. Round your answer to three decimal places.

Step 3 of 6:

Determine if the statement "Not all points predicted by the linear model fall on the same line" is true or false.

Step 4 of 6:

Find the estimated value of y when x=5.5. Round your answer to three decimal places.

Step 5 of 6:

Find the error prediction when x=5.5. Round your answer to three decimal places.

Step 6 of 6:

Find the value of the coefficient of determination. Round your answer to three decimal places.