[NeedAttention]
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
Answer: C
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What will be an ideal response?
The author cites four conditions that raise doubt about the applicability of the demographic transition to less developed countries: Describe and briefly discuss one of these conditions.
What will be an ideal response?
The concentration of carbon dioxide in surface water is low, whereas the concentration of oxygen is high because of the ________.
A. exchange of gases between the atmosphere and the ocean B. conversion of carbon dioxide to bicarbonate C. difference in solubility of the gases D. respiration of plants and animals E. photosynthesis process
Judge the following sentence according to the criteria given below: Few abyssal plains are located in the Pacific Ocean BECAUSE turbidity currents only occur along passive continental margins
A) The assertion and the reason are both correct, and the reason is valid. B) The assertion and the reason are both correct, but the reason is invalid. C) The assertion is correct, but the reason is incorrect. D) The assertion is incorrect, but the reason is correct. E) Both the assertion and the reason are incorrect.