Show or explain a different way of using partial quotients to divide 2,105 by 5.

Andre and Jada both found [math]657\div3[/math] using the partial quotients method, but they did the calculations differently, as shown here.[br][img]data:image/png;base64,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[/img][br]How is Jada's work the same as Andre’s work? How is it different?[br]

Explain why they have the same answer.

Which might be a better way to evaluate [math]1,150\div46[/math]: drawing base-ten diagrams or using the partial quotients method? Explain your reasoning.

Which of the polygons has the greatest area?

One micrometer is a millionth of a meter. A certain spider web is 4 micrometers thick. A fiber in a shirt is 1 hundred-thousandth of a meter thick.[br][br]Which is wider, the spider web or the fiber? How many meters wider? Explain your reasoning.