The relocation of hundreds of thousands of African Americans from the South to cities in the industrial North is known by what name?

Terranes that can be shown to have traveled great distances are known as ________ terranes.

A. accreted B. exotic C. suspect D. shield E. cratonic

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

Where is the Bermuda High located during the summer and fall? How might the path of a hurricane, moving toward the west from Africa, be affected by the Bermuda High as the hurricane approaches the United States?

What will be an ideal response?

Explain the formation of the hook-shaped lake southeast of “D Ranch.”

The question is based on Map T-15, the “Point Reyes, California” quadrangle (scale 1:62,500; contour interval 80 feet) showing Point Reyes and Drakes Bay in Point Reyes National Seashore (38°01'38"N, 122°57'51"W). What will be an ideal response?