Slope M Pickens 2006 What does the line

Slope M. Pickens 2006

What does the line look like when… • You have positive slope? • You have negative slope? • You have zero slope? • You have NO slope? • (Or undefined) M. Pickens 2006

Positive slope, + work Negative slope, - work Zero slope is zero fun! NO slope. Oh No!!!! Slope Mountain Ski Resort M. T. Pickens Merrill 2005 2006

Lets Cheer Positive, Negative Zero NO X-Axis Y-Axis Go, Go M. Pickens 2006

What Type of Slope is Shown? Positive Slope Negative Slope Zero Slope No Slope/Undefined M. Pickens 2006

Slope of a Graph • When slope is positive or negative we need to find the actual value of the slope or rate of change • On a graph we find slope using the formula How far up or down it changes How far left or right it changes M. Pickens 2006

Slope of a Graph 1. First pick two points on the line The points need to be where the lines cross so they are integers 2. Then find the rise and run 3. Determine if the slope of the line is positive or negative Rise = 2 Run = 3 M. Pickens 2006

Slope of a Graph 1. First pick two points on the line The points need to be where the lines cross so they are integers 2. Then find the rise and run 3. Determine if the slope of the line is positive or negative Rise = 10 Run = 2 M. Pickens 2006

Bell Ringer Tuesday 1/17 • 1. What is the equation for a line? • 2. Are these four points on the same line? Show your work!! (2, 3) (4, 5) (-2, -3) (-4, -5) 3. What is the slope of these two points? (-8, -3)(4, -1) Challenge: How can you prove that the slope is the same between any two points on a line? M. Pickens 2006

Bell Ringer Wednesday 1/18 • 1. What is the slope of the equation x=-2? • 2. What is the slope of a line that goes through (-2, -3) and (4, -5)? • 3. What is the slope of the line y=2 x+3? How does it compare to the line y=4 x 2? • Challenge: Are these three points on the same line, (-4, -6)(3, 4) and (5, 6) M. Pickens 2006

Friday- Test- No Bell Ringer M. Pickens 2006

Slope of a Graphed Line Find the slope of each line below y Slopes: Find the slope of each line below x 4 4 M. Pickens 2006

Slope of line through 2 points • To find the slope of a line through 2 given points we use the formula • For example, Find the slope of a line 18 that goes through (-3, -3 55) and (2, 2 18) X 1 y 1 X 2 y 2 M. Pickens 2006

Given two points on a line, find the slope: 1. (9, 2), (8, -7) X 1 y 1 X 2 y 2 2. (-4, 4), (-7, 2) X 1 y 1 X 2 y 2 3. (5, -1), (9, -4) X 1 y 1 X 2 y 2 M. Pickens 2006

Given two points on a line, find the slope: 4. (5, 2), (1, 0) X 1 y 1 X 2 y 2 5. (3, -3), (3, -1) X 1 y 1 X 2 y 2 Undefined, NO slope 6. (-4, -2), (4, -2) X 1 y 1 X 2 y 2 M. Pickens 2006

Slope of a Table • In a table we can use the same formula. Pick any two pairs in the table for coordinates x 1 x 2 x -4 1 3 8 10 y -17 -2 4 19 25 Pick any two rows. If it is linear it will be the same no matter which two rows you pick y 1 y 2 M. Pickens 2006

Slope of a Table • Find the slope for each table below x -3 -1 0 1 5 y 4. 25 2. 75 2 1. 25 -1. 75 x -8 -6 -3 -1 0 y 2 3 4. 5 5. 5 6 M. Pickens 2006

Slope of a Table • Find the slope for each table below x -10 -5 -1 5 10 y 17 10 4. 4 -4 -11 x -3 -1 0 1 4 y -8 -8 -8 M. Pickens 2006

Conclusion • Slope is: the rate of change of a line • Describe the slope of each of the following Negative slope Undefined/ No slope Positive slope Zero/0 slope M. Pickens 2006