Tides arrive at the same location at the same time each day.

What type of geographers concentrate on studying landforms and processes on Earth's surface, in the oceans, and in the atmosphere, and how they affect life?

A) Human geographers B) Physical geographers C) Religious geographers D) Historical geographers

Resisting strength is greater when

A) bedding planes are parallel to a hillside. B) water percolates into rock along joints. C) bedding is not parallel to a hillside. D) shale weathers to clay minerals.

If you visited Mount Shasta City (elevation 900 m [3000 ft.]) and found the outside air temperature to be 27°C (81°F),

what would be the air temperature at the summit of Mount Shasta (elevation 4200 m [14,000 ft.]) at that moment—assuming that the temperature conditions with altitude change at an average, or normal, lapse rate? A) 0.2°C (32.0°F) B) 5.9°C (42.5°F) C) -6°C (20.5°F) D) 48.1°C (119.5°F) E) 7.2°C (44.7°F)

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