A square has an area of 81 square feet. Select [b]all [/b]the expressions that equal the side length of this square, in feet.

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[/img][br]How much larger is Russia than Canada?[br]

The Asian countries on this list are Russia, China, and India. The American countries are Canada, the United States, and Brazil. Which has the greater total area: the three Asian countries, or the three American countries?[br]

Select [b]all [/b]the expressions that are equivalent to [math]10^{-6}[/math].