Which type of plate motion is characteristic of a divergent boundary?
A. Plates move toward one another.
B. Plates move past one another.
C. Plates move away from one another.
Answer: C
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An oil field is a region underlain by one oil pool.
Answer the following statement true (T) or false (F)
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
Leading approaches to reducing birth rates emphasize the long-term benefits of
A) teaching people to become more active consumers. B) school programs that ignore contraceptive techniques and teach "abstinence only." C) improving men's educational attainment in conjunction with small loans to businesses owned by men in small communities. D) improving local economic conditions in conjunction with improving women's educational attainment. E) information about sexually transmitted diseases.
The "Golden Triangle", where several countries meet is a major source of opium and amphetamine production. All of the countries below meet in this area except:
A. China B. Thailand C. Malaysia D. Laos