The plot shown below describes the relationship between students' scores on the first exam in a class and their corresponding scores on the second exam in the class. A line was fit to the data to model the relationship. A scatterplot plots points x y axis. The y axis is labeled Exam 2 score. The x axis is labeled Exam 1 score. Points rise diagonally in a relatively loose pattern. The line passes between the points through (0, 0) and (100, 100). All values estimated. \[\small{10}\] \[\small{20}\] \[\small{30}\] \[\small{40}\] \[\small{50}\] \[\small{60}\] \[\small{70}\] \[\small{80}\] \[\small{90}\] \[\small{10}\] \[\small{20}\] \[\small{30}\] \[\small{40}\] \[\small{50}\] \[\small{60}\] \[\small{70}\] \[\small{80}\] \[\small{90}\] Which of these linear equations best describes the given model? Choose 1 answer: Choose 1 answer: (Choice A) \[\hat y=2x+10\] A \[\hat y=2x+10\] (Choice B) \[\hat y=x+10\] B \[\hat y=x+10\] (Choice C) \[\hat y=2x\] C \[\hat y=2x\] (Choice D) \[\hat y=x\] D \[\hat y=x\] Based on this equation, estimate the score on the second exam for a student whose first exam score was \[88\]