The process by which the population of urban settlements grows is known as migration

Questions 5 and 6 involve upper-level or geostrophic winds, which occur higher than 500 m (1600 ft). Because of the absence of friction, winds here flow parallel to the isobars, rather than at a 45-degree angle like surface winds. Draw the pressure-gradient force in red, Coriolis force in green, and the resulting flow of wind in blue, from the two high-pressure cells toward the low-pressure cell in the center of Figure 11.5a below.

What will be an ideal response?

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

When a star appears to twinkle or flicker, it is a condition called ____________________

Fill in the blank with correct word.

Bisphenol A (BPA), a common component of plastics in bottles and can liners

A) mimics estrogen and can potentially cause disruption of human reproduction and development. B) causes mutations similar to those caused by UV light and X-rays. C) has been tested by the European Commission and found safe for human consumption. D) has been withdrawn from manufacture and use in the United States.