[math]M[/math]  is a point on line segment [math]KL[/math]. [math]NM[/math] is a line segment. Select all the equations that represent the relationship between the measures of the angles in the figure.[br][br][img]data:image/png;base64,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[/img]

Which equation represents the relationship between the angles in the figure?[br][br][img]data:image/png;base64,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[/img]

Segments [math]AB,EF[/math] and [math]CD[/math] intersect at point [math]C[/math], and angle [math]ACD[/math] is a right angle. Find the value of [math]g[/math].[br][br][img]data:image/png;base64,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[/img]

Select all the expressions that are the result of decreasing [math]x[/math] by 80%.

[size=150]Andre is solving the equation [math]4(x+\frac{3}{2})=7[/math]. He says, “I can subtract [math]\frac{3}{2}[/math]  from each side to get [math]4x=\frac{11}{2}[/math] and then divide by 4 to get [math]x=\frac{11}{8}[/math]". Kiran says, “I think you made a mistake.”[/size][br][br]How can Kiran know for sure that Andre’s solution is incorrect?

Describe Andre’s error and explain how to correct his work.[br]

[math]\frac{1}{7}a+\frac{3}{4}=\frac{9}{8}[/math]

[math]\frac{2}{3}+\frac{1}{5}b=\frac{5}{6}[/math]

[math]\frac{3}{2}=\frac{4}{3}c+\frac{2}{3}[/math]

[math]0.3d+7.9=9.1[/math]

[math]11.03=8.78+0.02e[/math]

A train travels at a constant speed for a long distance. 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[/img][br][br]Write the [b]two [/b]constants of proportionality for the relationship between distance traveled and elapsed time. Explain what each of them means.