IM 8.3.10 Lesson: Calculating Slope

[size=150]Find values for [math]a[/math] and [math]b[/math] that make each side have the same value.[/size][br][br][math]\frac{a}{b}=-2[/math]
[math]\frac{a}{b}=2[/math]
[math]a-b=-2[/math]
Plot the points (1, 11) and (8, 2), and the line that passes through them.
Without calculating, do you expect the slope of the line through [math](1,11)[/math] and [math](8,2)[/math] to be positive or negative?
How can you tell?
Calculate the slope of this line.
Find the value of k so that the line passing through each pair of points has the given slope.
[size=150][math](k,2)[/math] and [math](11,14)[/math], slope = 2[/size]
[size=150][size=100][math](1,k)[/math] and [math](4,1)[/math], slope = -2[/size][/size]
[size=100][math](3,5)[/math] and [math](k,9)[/math], slope =[/size] [math]\frac{1}{2}[/math]
[size=150][size=100][math](-1,4)[/math] and [math](-3,k)[/math], slope =[/size] [math]-\frac{1}{2}[/math][/size]
[math]\left(-\frac{15}{2},\frac{3}{16}\right)[/math] and [math]\left(-\frac{13}{22},k\right)[/math], slope= 0
Your teacher will give you either a design or a blank graph. Do not show your card to your partner.
[table][tr][td]If your teacher gives you the design:[/td][td]If your teacher gives you the blank graph:[/td][/tr][tr][td][list=1][*]Look at the design silently and think about how [/*][*]you could communicate what your partner [br]should draw. Think about ways that you can [br]describe what a line looks like, such as its slope or[br]points that it goes through.[/*][*]Describe each line, one at a time, and give your[br]partner time to draw them.[/*][*]Once your partner thinks they have drawn all the[br]lines you described, only then should you show [br]them the design.[/*][/list][/td][td][list=1][*]Listen carefully as your partner describes each [br]line, and draw each line based on their [br]description.[/*][*]You are not allowed to ask for more information [br]about a line than what your partner tells you.[/*][*]Do not show your drawing to your partner until [br]you have finished drawing all the lines they[br]describe.[/*][/list][/td][/tr][/table][br]When finished, place the drawing next to the card with the design so that you and your partner can both see them. [b]How is the drawing the same as the design? How is it different?[/b] Discuss any miscommunication that might have caused the drawing to look different from the design.[br][br]Pause here so your teacher can review your work. When your teacher gives you a new set of cards, switch roles for the second problem.

IM 8.3.10 Practice: Calculating Slope

For each graph, calculate the slope of the line.
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[/img]
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[/img]
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[/img]
Match each pair of points to the slope of the line that joins them.
[size=150][math](9,10)[/math][/size][size=100] and[/size][size=150] [math](7,2)[/math][/size]
[math](-8,-11)[/math] and [math](-1,-5)[/math]
[math](5,-6)[/math] and [math](2,3)[/math]
[math]\left(6,3\right)[/math] and [math]\left(5,-1\right)[/math]
[math](4,7)[/math] and [math](6,2)[/math]
Use the applet below for the following questions. Draw a line with the given slope through the given point, find another point that lies on that line.
What other point lies on that line?
Point A, slope = [math]-3[/math]
Point A, slope =[math]\frac{-1}{4}[/math].
Point C, slope = [math]\frac{-1}{2}[/math]
Point E, slope = [math]\frac{-2}{3}[/math]
Make a sketch of a linear relationship with a slope of 4 and a negative y-intercept.
Show or explain how you know the slope is 4.
Write an equation for the line you created above.

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