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Graphing Lines
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Graphing Lines Plotting Points on a Coordinate System
Graphing a line using points Graphing a line using intercepts Finding the slope Graphing a line using slope and a point Graphing a line using slope and y-intercept Horizontal & Vertical Lines Parallel & Perpendicular Lines Equations of a Line
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Plotting points on a coordinate system
(x, y) x moves left or right & y moves up or down (1, 1) is right 1 and up 1 (-2, -1) is 2 to the left and 1 down
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Graphing a line using points
Make a table finding at least 3 points Example: 2x + y = 4 x y 1 2 -1 6 3 -2
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Graphing a line using intercepts
Make a table Example: x + y = 4 X-intercept put 0 in for y and solve for x. 2x + 0 = 4 x = 2 (2, 0) is x-intercept y-intercept put 0 in for x and solve for y. 2(0) + y = 4 y = 4 (0, 4) is y-intercept x y 4 2
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Finding the slope given 2 points
m = Find the slope of the line connecting (-2,1) and (6, -3) m = = -1 6 - (-2)
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Graphing Using the Slope and a Point
Graph the point Apply the slope (rise over run) from that point Follow same pattern (steps) for more points Draw the line Example: Point (1, -2) & m= 1/3
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Graphing line using the slope and y-intercept
Graph y-intercept Apply slope (up/down, left/right) Draw line Example: y-intercept (0, 2) m = 3/2
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Horizontal & Vertical Lines
y = c where c is a constant Horizontal line y-intercept (0, c) Slope is 0 No x-intercept x= c where c is a constant Vertical line x-intercept is (c, 0) Slope is undefined No y-intercept
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Parallel & Perpendicular Lines
Parallel lines: have the same slope Example: y = 2x + 1 y = 2x -4 Both have a slope of 2, therefore the lines are parallel Perpendicular lines: slopes are negative reciprocals of each other Example: y = 3x + 2 y = -1/3 x - 4 First has slope of 3 and second has a slope of -1/3. Note: 3 * -1/3 = -1
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Equations of a Line Ax + By + C = 0 (General Form - no fractions for A, B, or C) y = mx + b (Function form - m is the slope and b is the y-intercept) (Symmetric form – 436 only. a is the x-intercept and b is the y-intercept)
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Questions about Lines 1. Find the equation of a line in general form through (-2, 2) and (1, 3) 2. Find the equation of a line in function form through (6, -2) and parallel to 3x - 2y =4 3. Find the equation of a line with a slope of 0 and a y-intercept of -3 4. Find the equation of a line in function form through (4, 3) and perpendicular to 2x = 4y + 6
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Answers to Lines Solution:
Slope = = 1 1- (-2) 3 Using y=mx+b: 2 = 1/3 (-2) + b 2 = -2/3 + b 2 + 2/3 = b 8/3 = b y = 1/3 x + 8/3 Answer: 0 = x - 3y + 8 1. Find the equation of a line in general form through (-2, 2) and (1, 3)
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Answers to Lines Solution:
Find the slope of 3x - 2y = 4 by solving for y: -2y = -3x + 4 y = 3/2 x - 2 m = 3/2 (Parallel lines: same slope) 2. Find the equation of a line in function form through (6, -2) and parallel to 3x - 2y = 4 use y = mx + b - 2 = 3/2 (6) + b - 2 = 9x + b - 11= b y = 3/2 x - 11
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Answers to Lines Solutions:
Slope of 0 means this is a horizontal line in the form y = c. y = -3 is the answer Find slope of 2x = 4y + 6 by solving for y. y = 1/2 x - 3/2 Slope of perpendicular line is -2. 3 = -2 (4) + b 3 + 8 = b 11 = b y = -2x + 11 3. Find the equation of a line with a slope 0 and a y-intercept of -3 4. Find the equation of a line in function form through (4, 3) & perpendicular to 2x = 4y + 6
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Hope you enjoyed Lines !
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