Hurricanes can’t form along the equator because:a

The continental rise is located ________

A) at the top of a mid-ocean ridge B) at the top of the continental slope C) at the seaward edge of a deep ocean trench D) between an abyssal plain and continental slope

Deviations from the average strength of Earth’s present-day magnetic field are called

____________________. Fill in the blank(s) with the appropriate word(s).

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

What is the term for a vertical cut shows soil layers?

a. Soil structure. b. Soil texture. c. Soil profile. d. Soil order.