IM 7.7.5 Lesson: Using Equations to Solve for Unknown Angles
[size=100][size=150]Tyler thinks that this figure has enough information to figure out the values of [math]a[/math] and [math]b[/math].[/size][/size][br][br][img]data:image/png;base64,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[/img][br][br]Do you agree? Explain your reasoning.
[size=100][size=150]Elena and Diego each wrote equations to represent these diagrams. For each diagram, decide which equation you agree with, and solve it. You can assume that angles that look like right angles are indeed right angles.[/size][/size][br][br][img]data:image/png;base64,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[/img][br][br][size=100]Elena: [math]x=35[/math][br]Diego: [math]x+35=180[/math][/size]
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[/img][br][br]Elena: [math]35+w+41=180[/math][br]Diego: [math]w+35=180[/math]
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[/img][br][br]Elena: [math]w+35=90[/math][br]Diego: [math]2w+35=90[/math]
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[/img][br][br]Elena: [math]2w+35=90[/math][br]Diego: [math]w+35=90[/math]
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[/img][br][br]Elena: [math]w+148=180[/math][br]Diego: [math]x+90=148[/math]
Find the unknown angle measures. Show your thinking. Organize it so it can be followed by others.
The diagram contains three squares. Three additional segments have been drawn that connect corners of the squares. We want to find the exact value of a + b + c.
Use a protractor to measure the three angles. Use your measurements to conjecture about the value of [math]a+b+c[/math].
Find the exact value of [math]a+b+c[/math] by reasoning about the diagram.
IM 7.7.5 Practice: Using Equations to Solve for Unknown Angles
Segments [math]AB[/math], [math]DC[/math], and [math]EC[/math] intersect at point [math]C[/math]. Angle [math]DCE[/math] measures [math]148^\circ[/math].[br]Find the value of [math]x[/math].[br][br][img]data:image/png;base64,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[/img]
Line [math]l[/math] is perpendicular to line [math]m[/math]. Find the value of [math]x[/math] and [math]w[/math].[br][img]data:image/png;base64,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[/img]
If you knew that two angles were complementary and were given the measure of one of those angles, would you be able to find the measure of the other angle? Explain your reasoning.
[size=150]For each inequality, decide whether the solution is represented[/size] [math]x<4.5[/math] by [math]x>4.5[/math].[br][br][math]-24>\text{-}6(x-0.5)[/math]
[math]\text{-}8x+6>\text{-}30[/math]
[math]\text{-}2(x+3.2)<\text{-}15.4[/math]
[size=150]A runner ran [math]\frac{2}{3}[/math] of a 5 kilometer race in 21 minutes. They ran the entire race at a constant speed.[/size][br][br][br]How long did it take to run the entire race?[br]
How many minutes did it take to run 1 kilometer?
Jada, Elena, and Lin walked a total of 37 miles last week. Jada walked 4 more miles than Elena, and Lin walked 2 more miles than Jada. The diagram represents this situation:[br][br][img]data:image/png;base64,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[/img][br][br]Find the number of miles that they each walked. Explain or show your reasoning.
Select all the expressions that are equivalent to [math]\text{-}36+54y-90[/math]