Linear Functions Assessment Choice Board – Choose one square from each column 20 points
Each square in the first two columns is worth 5 points and squares in the third column are 10 points
A. Your friends was absent the day the following formulas were introduced:· Formula to find slope
· Slope-intercept formula
Address what each formula is, when it is used, and how it is used. Give detailed examples / D. Graph the equation below 3 different times, using the methods listed:
f(x)=-2x+4
1. Using a table of values
2. Using slope-intercept form
3. Using x- and y-intercepts
Explain the steps you used when graphing each way / G. Create a sample textbook lessons based on the following topic: slope
Include:
· Definition of slope
· Variable used for slope
· Types of slope
· Finding slope given a graph
· The slope formula
Give visuals, examples, and step-by-step explanations
B. Write three linear equations, given the following guidelines:
1. A slope-intercept form equation with a negative slope and a y-intercept of 0
2. A vertical line
3. A horizontal line
Provide a graph of all three of your equations / E. Graph the equation below 3 different times, using the methods listed:
x-3y=6
1. Using a table of values
2. Using slope-intercept form
3. Using x- and y-intercepts
Explain the steps you used when graphing each way / H. Create a mini-book containing the following 3 sections
· Graphing linear equations using slope-intercept form
· Graphing linear equations using intercepts
· Horizontal vs. vertical lines
·
In each section, give examples and explanations on how to graph each type of equation
C. Create sets of two ordered pairs so that the slope of the line between them is:
1. Positive
2. Negative
3. Zero
4. Undefined
Use both a graph and the slope formulas as proof / F. Graph the following equations:
1. 2x+3y=3
2. x=-6
3. y=-5
Find the area of the figure formed by the intersection of the lines. / I. Create a mind-map based on the following topic: linear equations
Include:
· Slope
· Slope-intercept form
· Ways to graph linear equations
· Vertical vs. horizontal lines
Give visuals and examples within the map