How long and how wide is the actual swimming pool? 

Will a scale drawing where 1 cm represents 2 m be larger or smaller than this drawing?

A map of a park has a scale of 1 inch to 1,000 feet. Another map of the same park has a scale of 1 inch to 500 feet. Which map is larger? Explain or show your reasoning. 

On a map with a scale of 1 inch to 12 feet, the area of a restaurant is 60 in² Han says that the actual area of the restaurant is 720 ft². Do you agree or disagree? Explain your reasoning.

[size=150]Triangle [math]DEF[/math] is a scaled copy of triangle [math]ABC[/math]. For each of the following parts of triangle [math]ABC[/math], identify the corresponding part of triangle [math]DEF[/math].[/size][br][br][img]data:image/png;base64,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[/img][br][br]angle [math]ABC[/math][br]

angle [math]BCA[/math][br]

segment [math]AC[/math][br]

segment [math]BA[/math][br]