y = 4x + 87[br][br][img]data:image/png;base64,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[/img][br][br][br][br]a. Using the horizontal axis for x and the vertical axis for y, interpret the slope of the linear model in the situation shown in the scatter plot.[br][br]b. If the linear relationship continues to hold for the situation, interpret the y-intercept of the linear model in the situation provided.

y = -2.4x + 25[br][img]data:image/png;base64,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[/img][br]a. Using the horizontal axis for x and the vertical axis for y, interpret the slope of the linear model in the situation shown in the scatter plot.[br][br]b. If the linear relationship continues to hold for the situation, interpret the y-intercept of the linear model in the situation provided.