IM 6.6.5 Practice: A New Way to Interpret a over b

[size=150]Select [b]all[/b] the expressions that equal [/size][math]\frac{3.15}{0.45}[/math]
[size=150]Which expressions are solutions to the equation [math]\frac{3}{4}x=15[/math]? Select [b]all[/b] that apply.[/size]
[size=150]Solve each equation.[/size][br][br][math]4a=32[/math]
[math]4=32b[/math]
[math]10c=26[/math]
[math]26=100d[/math]
[size=150]For each equation, write a story problem represented by the equation. For each equation, state what quantity [math]x[/math] represents. If you get stuck, consider drawing a diagram.[/size][br][br][math]\frac{3}{4}+x=2[/math]
[math]1.5x=6[/math]
Write as many mathematical expressions or equations as you can about the image. Include a fraction, a decimal number, or a percentage in each.[br][br][img]data:image/png;base64,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[/img]
In a lilac paint mixture, 40% of the mixture is white paint, 20% is blue, and the rest is red. There are 4 cups of blue paint used in a batch of lilac paint.
How many cups of white paint are used?
How many cups of red paint are used?[br][br]
How many cups of lilac paint will this batch yield?[size=150][br][/size]
If you get stuck, consider using a tape diagram.
Triangle P has a base of 12 inches and a corresponding height of 8 inches. Triangle Q has a base of 15 inches and a corresponding height of 6.5 inches. Which triangle has a greater area? Show your reasoning.
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Information: IM 6.6.5 Practice: A New Way to Interpret a over b