Graphing Linear Equations
Name _____________________________________________________ Date ____________ Color _________
Algebra I Ms. Hahl
Introduction to Graphing Linear Equations
The Coordinate Plane:
A – The coordinate plane has 4 quadrants.
B – Each point in the coordinate plane has an x coordinate (the abscissa) and the y coordinate (the
ordinate). The point is stated as an ordered pair (x, y).
C – Horizontal Axis is the X-Axis. (y=0)
D – Vertical Axis is the Y-Axis. (x=0)
Directions: Plot the following points on the coordinate plane.
a) [pic] b) [pic] c) [pic] d) [pic]
e) [pic] f) [pic] g) [pic] h) [pic]
Graphing Linear Equations
To graph a line (linear equation), we first want to make sure the equation is in slope intercept form (y=mx+b). We will then use the slope and the y-intercept to graph the line.
Slope (m): Measures the steepness of a non-vertical line. It is sometimes refereed to as the rise/run or change in y/change in x. It’s how fast and in what direction y changes compared to x.
y-intercept(b): The y-intercept is where a line passes through the y axis. It is always stated as an ordered pair (x,y). The x coordinate is always zero. The y coordinate can be taken from the “b” in y=mx+b.
Graphing The Linear Equation: [pic]
1) Find the slope: [pic] ( [pic] = [pic] = [pic]
2) Find the y-intercept: [pic] ( [pic]
3) Plot the y-intercept
4) Use slope to find the next point: Start at [pic]
[pic] ( up 3 on the y-axis
( right 1 on the x-axis
[pic] Repeat: [pic]
5) To plot to the left side of the y-axis, go to y-int. and
do the opposite(Down 3 on the y, left 1 on the x)
[pic] Repeat:[pic]
6) Connect the dots.
Do Now: Graph the following linear equations.
1) [pic] 2) [pic]
3) [pic] 4) [pic]
5)[pic] 6) [pic]
7) [pic] 8) [pic]
Finding the Equation of a Linear Function
Finding the equation of a line in slope intercept form (y=mx + b)
Example: Find the equation in slope intercept form of the line formed by (3,8) and (-2, -7).
A. Find the slope (m): B. Use m and one point to find b:
[pic] [pic]
[pic] Have: [pic]
[pic] [pic]
[pic] [pic]
[pic]
[pic]
[pic]
Special Slopes:
A. Zero Slope B. No Slope (undefined slope)
* No change in Y * No change in X
* Equation will be Y = * Equation will be X =
* Horizontal Line * Vertical Line
Practice Problems:
Find the equation in slope intercept form and then graph. (On some problems , the slope (m) is given, so you only have to find the y-intercept (b).)
1) [pic] 2) [pic]
3) [pic] 4) [pic]
5) [pic] 6) [pic]
7) [pic] 8) [pic]
Directions: Find the equation of each line in slope intercept form and then graph:
1) [pic] 2) [pic] 3) [pic]
4) [pic] 5) [pic] 6) [pic]
7) [pic] 8) [pic] 9) [pic]
10) [pic] 11) [pic] 12) [pic]
13) [pic] 14) [pic] 15) [pic]
16) [pic] 17) [pic]
Finding the Equation of a Parallel Line
Parallel Lines:
* Do not intersect
* Have same slopes
Example: Find for the given line, find a line that is parallel and
passes through the given point and then graph.
A) Given Line: [pic] Given Point: (12, 9)
[pic] [pic] [pic]
[pic]
[pic]
[pic]
[pic]
[pic]
Parallel Line: [pic]
Do Now: For the given line, find a line that is parallel and passes through the given point and then
graph both lines..
Given Line: Given Point:
1) [pic] (6,1)
2) [pic] [pic]
Given Line: Given Point:
3) [pic] [pic]
10) [pic] [pic]
Practice Problems: a) Use the two points to find the equation of the line.
b) For the line found in part a, find a line that is parallel and passes through the given point.
c) Graph both lines.
Given Line: Parallel: Given Line: Parallel:
1) (-5, 13) (3, -3) (4,-10) 2) (-6,0) (3,6) (6,3)
3) (2,6)(-3,-19) (5,14) 4) (-4,3) (-8,6) (-4, 10)
5) (2,-5) (-2, -5) (8,-2) 6) (-9,-11)(6,9) (-3,-9)
7) (8,-3) (-4,9) (-2, 14) 8) (3,6)(3,-6) (11,-3)
9) (4,-3)(-6,-8) (6,7) 10) (2,4)(-6,-12) (-3,-5)
11) Find the equation of the line parallel to y = 3x – 2, passing through (-2, 1).
12) Find the equation of the line parallel to y = -¼ x + 2, passing through (-8, 7)
13) Find the equation of the line parallel to y = -5, passing through (2,7)
14) Find the equation of the line parallel to x= 8, passing through (4, -9)
Page 6 Answers[pic]
[pic]
Page 8 Answers
[pic]
[pic]
-----------------------
[pic]
[pic]
................
................
In order to avoid copyright disputes, this page is only a partial summary.
To fulfill the demand for quickly locating and searching documents.
It is intelligent file search solution for home and business.
Related download
- solving graphing linear equations take home test
- solving linear systems with graphing 7
- equation of a line discovery activity
- worksheet 6 4 graphing linear equations name
- graphing a linear equation
- graphing linear equations
- writing linear equations from word problems
- graphing linear equations table of values
Related searches
- graphing linear equations basic steps
- graphing linear equations pdf
- graphing linear equations examples
- graphing linear equations practice pdf
- graphing linear equations calculator
- graphing linear equations worksheet
- graphing linear equations in standard form
- graphing linear equations in two variables calculator
- graphing linear equations answer key
- graphing linear equations by plotting points
- graphing linear equations practice worksheet
- graphing linear equations worksheet pdf