The sat math scores, x, and sat verbal scores, y, for ten high school students are shown in the table below.
x y
400 330
420 440
470 480
510 460
530 520
570 610
600 590
680 670
700 680
790 710
using a residual plot, determine if the following model is a good fit for the data in the table above.
no. the model is not a good fit because the residual plot has a random pattern.
yes. the model is a good fit because the residual plot has a random pattern.
no. the model is not a good fit because the residual plot does not have a random pattern.
yes. the model is a good fit because the residual plot does not have a random pattern.

Option D (Yes. The model is a good fit because the residual plot does not have a random pattern).

Step-by-step explanation:

First of all, insert all the data in Microsoft Excel. Make sure that the values of X are in the ascending order. Then, make the scatter plot of the data with the line of best fit from the Insert option. The graph shows that there is a positive relation between x and y. Most of the actual values of y lie very close to the line. A very few observations are a little further from the line of best fit. Therefore, the model is a good fit because the residual plot does not have a random pattern. Option D is the correct answer!!!

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step-by-step explanation:

answer: c

because if you look at the chart you can see a pattern and compare it to the question he simplify out your

but i think the formula is f(x)=6x