Question

Maria gathered the data in the table. She finds the line of best fit to be y = 2.78x – 4.4. A 2-column table with 5 rows. The first column is labeled x with entries 1, 2, 3, 4, 5. The second column is labeled y with entries negative 2, 1.3, 4.2, 7.3, 8.9. What is the residual value when x = 4?

Answer 1

Answer:

The residual value when x = 4 is 0.58

Step-by-step explanation:

The residual value of a fitted function is the difference between the actual value of the data for a given input and the result of the fitted function. On this problem for the actual values, when $x = 4$ we have $y_{data} = 7.3$ , although, for the fitted function on the same value of "x", we have a different value, which is calculated below:

$y(4) = 2.78*4 - 4.4 = 6.72$

The residual value is:

$\text{residual value} = y_{data} - y_{function} = 7.3 - 6.72 = 0.58$

The residual value when x = 4 is 0.58

Answer 2

Answer:

C.0.58

Step-by-step explanation: