Basics of the Coordinate Plane
Solutions to
Linear Equations
Linear Equations
Graphs of Linear Equations
Converting Between Forms
100
Write the ordered pairs for each point.
A: (3, 0)
B: (-4, -3)
C: (2, 4)
100
Complete each ordered pair to be a solution of
y = -3x + 6
a. (2, ___)
b. (___, -6)
a. (2, 0)
b. (4, -6)
100
Graph the following equation on a coordinate plane.
y = -1/3 x + 2
100
Convert the equation to slope-intercept form.
y + 3 = 2(x + 5)
y = 2x + 7
200
List one point in...
a) Quadrant 1
b) Quadrant 2
c) Quadrant 3
d) Quadrant 4
Check with Ms. Facchino
200
Complete each ordered pair to be a solution of
2x - 5y = 4
a. (0, ___)
b. (___, 4)
a. (0, -4/5)
b. (12, 4)
200
Graph the following equation on a coordinate plane.
y = 5x - 3
200
Convert the equation to slope-intercept form.
-8x + 2y = 12
y = 4x + 6
300
Triangle DEF has vertices D (-2, -2), E (1, 5) and F (4,-2). Find the area of the triangle in units2.
21 units2
300
Complete each ordered pair to be a solution of
y - 2 = 1/2 (x + 4)
a. (6, ___)
b. (___, -2)
a. (6, 7)
b. (-12, -2)
300
Write the equation of the line below.
y = 1/2 x + 4
300
Convert the equation to standard form.
y = 1/4 x - 3
x - 4y = 12
400
Point A (3, -4) is moved 7 units to the left and 8 units up. What is the new positive of Point A?
(-4, 4)
400
List two equations that both have (3, 5) as a solution.
Check with Ms. Facchino
400
Write the equation of the line below.
y = -3x
400
Convert the equation to point-slope form.
5x + y = 15
y - 0 = -5(x - 3)