Using the North America map (Figure 3), identify the Atlantic and Pacific Oceans, the Gulf of Mexico, and Hudson Bay. What will be an ideal response?

[NeedAttention]

src="data:image/png;base64,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

Because upstream floods affect localized areas, they are more likely to be brief than are downstream floods.

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

Even in an exergonic reaction, the reactants must be _________ in energy state in order to transform into the products, which are at a _________ energy state.

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

Short extensions of rock or other material that are placed at right angles to longshore drift to stop the longshore transport of sediments are called ____

A) berms B) seawalls C) groins D) dolos