On that same day, friends of yours are sightseeing at Iguaçu Falls in Brazil (25.7°S). At what altitude will they observe the noon Sun?

The population of the United States is growing because the replacement fertility rate exceeds the total fertility rate.

Answer the following statement true (T) or false (F)

One landform that is caused by erosion from running water is a

A. U-shaped valley. B. sand dune. C. waterfall. D. mountain.

The original factors of production in global development—population and resources—are declining in importance and being replaced by specialization

Indicate whether the statement is true or false

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