Slope Intercept Form
Y=MX+B
Y=MX+B
Writing Equations in Slope-Intercept Form
Given Coordinates for Graph.
(0,3) (4,4)
Y = 2/4X + 3
Given Coordinates for Graph.
Give the coordinate in where both lines cross.
Y = 3X - 5
Y = -1/2X + 2
(2,1)
m = 1/5
m = 1/5
(Parallel, Perpendicular, or Neither)
Parallel
Y = 3X + 2
Y = 5X - 2
(2,6)
Graphing Linear Equations in Standard Form
5X + 3Y = 15
(3,0) (0,5)
Writing Equations in Slope-Intercept Form
Given Coordinates For Graph.
(0,-4)
Y = -4
Given Coordinates for Graph.
Give the coordinate in where both lines cross.
Y = -5/3X + 3
Y = 1/3X - 3
(3,-2)
m = -3/5
m = 5/3
(Parallel, Perpendicular, or Neither)
Perpendicular
Y = 2X + 5
Y = -4X - 1
(-1,3)
Graphing Linear Equations in Standard Form
-4X + 6Y = 24
(-6,0) (0,4)
Writing Equations in Slope Intercept Form.
Given Coordinates for Graph.
(0,0) (2,-5)
Y = -5/2X
Given Coordinates for Graph.
Give the coordinate in where both lines cross.
Y = -1
Y = 5/2X + 4
(2,-1)
m = 5/2
m = -5/2
(Parallel, Perpendicular, or Neither)
Neither
Y = 3X - 2
Y = 5X + 8
(5,13)
Point-Slope Form
(3,-2) m=4
Y = 4X - 14
Converting into Slope-Intercept Form.
12X+3Y=18
Y = -4X + 6
Given Coordinates for Graph.
Give the coordinate in where both lines cross.
Y = 3X - 2
Y = -X - 6
(-1,-5)
Find the slope that is perpendicular to the pair of points.
(-4,3) (-9,1)
m = 5/2
Y = 3X - 7
Y = 2X - 4
(3,2)
Point-Slope Form
(-3,0) m=-2
Y = -2X - 6
Converting into Slope-Intercept Form.
24X - 6Y = 12
Y = 4X - 2
Given Coordinates for Graph.
Give the coordinate in where both lines cross.
Y = 2X + 4
Y = 2X - 2
No Solution
Find the slope that is parallel to the parallel to the pair of points.
(-2,3) (-6,-9)
m = 3
Y = 3X - 1
Y = 2X +1
(2,5)
(2,5) m=3
Y = 3X - 1