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Chapter 4
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Two points determine a line Standard Form Ax + By = C Find the x and the y-intercepts An equation represents an infinite number of points in a relationships When given an equation, make a T-chart substitute the domain (x values) and find the corresponding range (y- values)
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A point and a slope can name a line y = mx + b plot the y-intercept use the slope to find more points
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Y = 3/4 x – 2 3x + 2y = 6 -2x + 5y = 10 2y = 1
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Increasing Decreasing Zero Slope Undefined Slope or NO slope y = (positive number)x + b y = (negative number)x + b y = constant (domain is all real numbers and the range is the constant) X = constant (a vertical line is not a function so there is no y-intercept form for it
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Y = x + 7 y = x + 5 Y = x – 1 Y = x – ¾ Change the slope Y = 1/3x y = 4x Y = 10x Y = -5x Change both Y = 1/3x + 7 Y = -3/4x -5 Y = 8x -2 Y = -4x – 3 Y = 5/6x + 9 Change the intercept
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WHEN GIVEN A POINT AND A SLOPE (NOT THE Y-INTERCEPT ) Given: Pt (2,1) and slope 3 Pt((4, -7) and slope - 1 Pt ((2,-3) and slope 1/2 WHEN GIVEN TWO POINTS Given: (3,1), (2,4) (-1, 12), (4, -8) (5,-8), (-7, 0)
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Given point (3,-2) and slope ¼ Given point (-2, 1) and slope -6 y + 2 = ¼(x – 3) y –(-2)= ¼(x – 3) y – 1 = -6(x + 2) y – 1 = -6(x –(-2))
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y – y 1 = m(x – x 1 ), where (x 1, y 1 ) is a specific point Where does this equation come from? m = y 1 – y 2 x 1 – x 2
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Standard Form Slope- Intercept Point-Slope Ax +By = C y = mx + b y – y 1 = m(x-x 1 )
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Find the equation in: Point slope form Standard form Slope-intercept form
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You need to know how to identify key elements from each type of equation and when to use each!
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y = 2x – 4 y = -3/4x + 3 y = ½ x – 7 y = -1/2 x + 2 y = -2x + 5 y = -3/4 x y = -3x + 4 y = 4/3 x – 1 y = 2x + 5 y =.5x - 3
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Parallel lines have the same slope Write an equation for a line that passes through the point (-3, 5) parallel to the line y = 2x - 4 Write and equation for a line passing through the point (4,-1) and parallel to the line y = ¼ x + 7
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Intersecting lines have different slopes Write an equation for a line that intersects the line y = -2/3 x + 5 and goes point (-1, 3) Write an equation for a line that intersects the line 3x – 4y = 10
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The slopes of perpendicular lines are opposite reciprocals Write and equation for a line that passes through the point (-4,6) and is perpendicular to the line 2x + 3y = 12 Write an equation to a line that passes through the point (4,7) and is perpendicular to the line y = 2/3 x - 1
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Bivariate Data Regression Lines (line of best fit) Correlation Causation Correlation coefficient (r factor)
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Additive Inverse (opposite) Multiplicative Inverse (reciprocal) Square Root (undoes squaring) Solving Equations
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If one relation contains the element (a,b), then the inverse relation will contain the element (b,a) EX: A B (-3, -6)(-6, -3) (-1, 4)(4, -1) (2, 9)(9, 2) ((5, -2)(-2, 5) ~Display as a set of ordered pairs, Table, Mapping, Graph
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“Mathalicious example”~ wins per million we reversed to millions per win y= x + 3 y =2x + 3 y = -1/3x + 2 y = -3/4x -1
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To find the inverse function f-1 (x) of the linear function f(x), complete the following steps: Step 1~ Replace f(x) with y in the equation f(x) Step 2~ Interchange y and x in the equation Step 3~ Solve the equation for y Step 4~ Replace y with f -1 (x) in the new equation
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f(x) = 4x – 6 f(x) = -1/2x + 11 f(x) = -3x + 9 f(x) = 5/4x – 3 f -1 (x) = x + 6 4 f -1 (x) = -2x +22 f -1 (x) = -1/3x +3 f -1 (x) = 4/5 x + 12/5
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Mathalicious example”~ wins per million we reversed to millions to win f(x)=.103x – 2.96 (NFL cost verses wins) F -1 (x) = 9.7x + 2.87 (NFL wins verses cost) Celsius verse Fahrenheit C(x) = 5/9(x – 32 C -1 (x) = F(x) (Fahrenheit) Car rental cost per day C(x) = 19.99 +.3x C -1 (x) = total number of miles
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