[img]data:image/png;base64,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[/img][br][size=150]Here is a diagram showing the number being divided into 5 equal 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[/img][br]If a large rectangle represents 1,000, what division problem did the second diagram show? What is its answer?
If a large rectangle represents 100, what division problem did the second diagram show? What is its answer?
If a large rectangle represents 10, what division problem did the second diagram show? What is its answer?
[table][tr][td][math]4.5\div0.09[/math][/td][td][/td][td][math]45\div0.9[/math][/td][td][/td][td][math]450\div9[/math][/td][td][/td][td][math]4500\div90[/math][/td][/tr][/table]
What is the common value?
[size=150]Four students set up a lemonade stand. At the end of the day, their profit is $17.52. How much money do they each have when the profit is split equally? Explain your reasoning or show your reasoning below.[/size]
A standard sheet of paper in the United States is 11 inches long and 8.5 inches wide. Each inch is 2.54 centimeters. How long and wide is a standard sheet of paper in centimeters?
A standard sheet of paper in Europe is 21.0 cm wide and 29.7 cm long. Which has the greater area, the standard sheet of paper in the United States or the standard sheet of paper in Europe? Explain your reasoning.