Coarse particles transported by wind begin to move at the:

a. impact threshold
b. fluid threshold
c. suspension threshold
d. none of the above


a

Environmental & Atmospheric Sciences

You might also like to view...

In developing countries, as in Europe,

A) care is taken to make sure no poor person lives in the suburbs. B) there is no discernible urban pattern. C) the wealthy are accommodated in the outer rings, whereas the poor live near the center of cities as well as in a sector extending from the center. D) the poor are accommodated in the outer rings, whereas the wealthy live near the center of cities as well as in a sector extending from the center. E) care is taken so no poor person lives in the inner city.

Environmental & Atmospheric Sciences

What is the present level of CO2? What would it be if it were 50% greater?

What will be an ideal response?

Environmental & Atmospheric Sciences

[NeedAttention]

src="data:image/png;base64,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

Environmental & Atmospheric Sciences

Which is NOT a disadvantage of coal mining?

A. black lung disease B. dioxin pollution C. acid deposition D. acid mine drainage

Environmental & Atmospheric Sciences