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Warm-Up Write the equation of each line. A B (1,2) and (-3, 7)
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Correlation and Lines of Best Fit
Unit 8 - Statistics
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Correlation Correlation tells us about the LINEARITY of two quantitative variables It is a number, “r”, that can be calculated and is always −1≤𝑟≤1. The closer to 1 or -1 r is, the more linear the scatterplot of the two variables.
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Values of “r” Values close to +1 indicate a positive, linear correlation Values close to 0 indicate no correlation or a non-linear pattern Values close to -1 indicate a negative, linear correlation r ≈ 0 (no linear correlation) r = 1 (positive perfect) r = -1 (negative perfect)
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Match the r-value to it’s graph
𝑟=0.8 𝑟=−0.05 𝑟=−0.91 𝑟=0.57 Negative very weak Positive strong Positive weak Negative stong Remember, a low r-value doesn’t mean the variables are not related. It only tells us they are not LINEARLY related!
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Lines of Best Fit Most scatterplot are not perfectly linear, but are close enough for us to model with a line. What is a line of Best Fit? Line that approximates the data Where is it on a scatterplot? Through the “center” of the points Why do we need one? Predict outcomes that are not found in the data
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Finding the Line of Best Fit
Plot the points. Pick two “center” points and connect them with a line. There should be about the same number of data points above and below the line you draw. Use the two points to calculate a slope. Calculate the y-intercept. Use point-slope formula and convert to slope-intercept form.
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Example #1 Approximate a line of best fit for the data. Predict what y would be in x is 20. 𝑚= 11−2 13−5 = 9 8 =1.125 𝑦−2=1.125 𝑥−5 𝑦 =1.125𝑥−3.625
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Practice Modeling y = 2.04x-2.36
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Other models Match each graph with it’s line of best fit
𝑦= 𝑥 3 −2 𝑥 2 +3 𝑦= 2 𝑥 𝑦=− 𝑥− 𝑦=−2𝑥+3 A B C D
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