IM 6.5.10 Practice: Using Long Division

Kiran is using long division to find [math]696\div12[/math].[br][br][img]data:image/png;base64,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[/img][br]He starts by dividing 69 by 12. In which decimal place should Kiran place the first digit of the quotient (5)?
Here is a long-division calculation of 917 ÷7.
[img]data:image/png;base64,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[/img][br][br]There is a 7 under the 9 of 917. What does this 7 represent?
What does the subtraction of 7 from 9 mean?[br]
Why is a 1 written next to the 2 from [math]9-7[/math]?
Han's calculation of 972 ÷ 9 is shown here.
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[/img][br]Find [math]180⋅9[/math].
Use your calculation of [math]180⋅9[/math] to explain how you know Han has made a mistake.
Identify and correct Han’s mistake.
Find the quotient.
Find each quotient.
Find each quotient.
One ounce of a yogurt contains of 1.2 grams of sugar. How many grams of sugar are in 14.25 ounces of yogurt?
The mass of one coin is 16.718 grams. The mass of a second coin is 27.22 grams. How much greater is the mass of the second coin than the first? Show your reasoning.
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Information: IM 6.5.10 Practice: Using Long Division