A city or region should do all of the following to promote economic innovation except

Consider the isotherm map of the United States shown above. Which of the following statements best describes the area between Las Vegas, NV, and Palm Springs, CA?

A) This area exhibits one of the greatest temperature gradients on the map. B) The average temperature in this area is below freezing. C) One would expect to encounter a temperature of 40°F if driving from Las Vegas to Palm Springs. D) This area exhibits one of the lowest temperature gradients on the map.

Coalescing sinkholes form a(n) ____________________

Fill in the blank(s) with correct word

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

In September, the Intertropical Convergence Zone is shifted to

A. the north of the Isthmus and winds blow across the Isthmus from the southwest. B. the south of the Isthmus and winds blow across the Isthmus from the southwest. C. the north of the Isthmus and winds blow across the Isthmus from the northeast. D. the south of the Isthmus and winds blow across the Isthmus from the northeast.