The collision-coalescence process:

How would connecting iron with a wire to a piece of metal like copper, which undergoes reduction very easily, affect the rate at which the iron corrodes?

A) It would increase the rate of corrosion. B) It would decrease the rate of corrosion. C) The rate would stay the same. D) Rates are only affected by temperature. E) none of the above

True or False: Almost all natural rocks are consolidated aggregates of minerals

Indicate whether this statement is true or false.

The response to Earth's rotation is ________

A) wind B) polar flattening C) equatorial flattening D) faulting creating Death Valley E) the collision of plates causing Mt. Everest

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