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College Algebra Chapter 2 Functions and Graphs
Section 2.5 Applications of Linear Equations and Modeling
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1. Apply the Point-Slope Formula
2. Determine the Slopes of Parallel and Perpendicular Lines 3. Create Linear Functions to Model Data 4. Create Models Using Linear Regression
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Apply the Point-Slope Formula
Point-slope formula for a line: y – y1 = m(x – x1) m is the slope (x1, y1) is a point on the line
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Example 1: Use the point-slope formula to write an equation of the line having the given conditions. Write the answer in slope-intercept form (if possible). Passes through (–4, 2) and m = 2
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Example 2: Use the point-slope formula to write an equation of the line having the given conditions. Write the answer in slope-intercept form (if possible). Passes through (5, 0) and m =
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Example 3: Use the point-slope formula to write an equation of the line having the given conditions. Write the answer in slope-intercept form (if possible). Passes through (–1, –4) and (–2, 1)
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Example 4: Use the point-slope formula to write an equation of the line having the given conditions. Write the answer in slope-intercept form (if possible). Passes through (2,3) and the slope is undefined.
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1. Apply the Point-Slope Formula
2. Determine the Slopes of Parallel and Perpendicular Lines 3. Create Linear Functions to Model Data 4. Create Models Using Linear Regression
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Determine the Slopes of Parallel and Perpendicular Lines
Parallel lines have matching slopes. If m1 and m2 represent the slopes of two nonvertical parallel lines, then m1 = m2. Perpendicular lines have slopes that are negative reciprocals. If m1 and m2 represent the slopes of two nonvertical perpendicular lines, then
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Examples 5 – 7: The slope of a line is given. Determine the slope of a line parallel and perpendicular to the given line, if possible. Parallel: ____ Perpendicular: ____ Parallel: ____ Perpendicular: ____ Parallel: ____ Perpendicular: ____
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Example 8: Give the equation of a line that passes through (–1,2) and is parallel to the line defined by
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Example 9: Give the equation of a line that passes through (6,8) and is perpendicular to the line defined by
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1. Apply the Point-Slope Formula
2. Determine the Slopes of Parallel and Perpendicular Lines 3. Create Linear Functions to Model Data 4. Create Models Using Linear Regression
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Example 10: The local hardware store charges $28 to rent a carpet cleaning machine for 24 hours and $10.98 for each medium-sized bottle of rug shampoo. a. Write a linear function S that represents the cost of renting the machine for x days along with 2 bottles of rug shampoo.
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Example 10 continued: b. Evaluate S(2) and interpret the meaning in the context of this problem.
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Create Linear Functions to Model Data
A linear cost function models the cost C(x) to produce x items. m is the variable cost per item b is the fixed cost A linear revenue function models revenue R(x) for selling x items. p is the price per item A linear profit function models the profit for producing and selling x items.
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Example 11: Alina is starting a summer business power-washing home driveways and sidewalks. She will charge $35 to pressure-clean a driveway and the sidewalk in front of a house. Her start-up costs include her initial purchase of a power washer for $330 and a fee of $2 per house she must pay to the homeowners association for the use of the water for each house.
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Example 11 continued: a. Write a linear cost function for power-washing at x homes. b. Write a linear revenue function for power- washing at x homes.
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Example 11 continued: c. Write a linear profit function for power-washing at x homes. d. How much profit will Alina make if she power- washes at 15 homes?
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Example 11 continued: e. How many homes must Alina power-wash to make $330?
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1. Apply the Point-Slope Formula
2. Determine the Slopes of Parallel and Perpendicular Lines 3. Create Linear Functions to Model Data 4. Create Models Using Linear Regression
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Create Models Using Linear Regression
Creating a Linear Regression Model 1. Graph the data in a scatter plot. 2. Inspect the data visually to determine if the data suggest a linear trend. 3. Invoke the linear regression feature on a calculator, graphing utility, or spreadsheet. 4. Check the result by graphing the line with the data points to verify that the line passes through or near the data points.
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Example 12: Determine the equation for the least-squares regression line for the given data. x y 0.5 1 1.3 2 2.9 3 2.4 4 5 6 5.4 7 7.7 8 8.3
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Example 12 continued: 1. Use the STAT button, then EDIT to enter the x and y data in two lists. Exit this screen.
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Example 12 continued: 2. Use the STAT button, then CALC, choose 4:LinReg(ax + b).
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Example 12 continued: Hit CALCULATE. The equation is
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Example 12 continued: 4. To see the data and the line graphed: Above the y = key, Turn Plot1 ON and select STATPLOT. select the type of graph.
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Example 12 continued: Graph
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Example 12 continued: 5. Enter into the equation editor and see the line graphed.
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