The newest bonanza for recycling scarce and toxic metals is to recover them from ________

Pore pressure refers to the effect in which water forces grains apart.

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

The recurrence interval is equal to (N + 1)/M where N is the number of years of flood records and M is ________.

A. the absolute value of the slope of the falling limb on the hydrograph of a 50-year flood B. mass of water moved in each year's maximum flood C. the numerical rank of each year's maximum flood discharge D. minimum amount of discharge needed to produce a flood E. the slope of the rising limb on the hydrograph of a 25-year flood

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

About how long does it take for a typical frontal system (midlatitude cyclone) to cross the United States?

A. 8-13 days B. 1-2 days C. 3-7 days D. 12 hours