In order to make a forecast,
A) detailed information only about atmospheric conditions east and west of the forecast location is needed.
B) detailed information only about atmospheric conditions north and south of the forecast location is needed.
C) detailed information only about atmospheric conditions above the ground is needed.
D) detailed information about atmospheric conditions in all three dimensions is needed.
Answer: D
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The Earth's tallest trees are the
A) coast douglas fir (Pseudotsunga menziessii). B) coast redwoods (Sequoia sempervirens). C) giant ash (Eucalyptus regnans). D) sitka spruce (Picea sitchensis).
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
Efforts to reduce fertility rates in Sub-Saharan Africa did not begin in earnest until the 1980s
Indicate whether the statement is true or false
Decreasing SO2 pollution, which contributes to acid rain and respiratory diseases, will decrease the rate of global warming
a. True b. False