Drawbacks to beach nourishment as a solution to coastal erosion include all of the following except

If the dry-bulb temperature is 55°F and the wet-bulb temperature is 52°F, What is the relative humidity?

Using the psychrometer tables and the table of saturation mixing ratios, answer the question about determining relative humidity with a sling psychrometer. What will be an ideal response? _______ %

Where is the greatest potential for the formation of a great fully developed sea?

a. Gulf Stream b. West Wind Drift c. Arctic Sea d. Northern Pacific Ocean e. Mediterranean Sea

________ clouds have a circular shape and form downwind of mountain barriers

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

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