[NeedAttention]
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
Answer: C
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Wegener used which of the following to provide evidence for continental drift?
A) Earthquake distribution B) Magnetic pole reversals C) Locations of active volcanoes D) Seafloor magnetic patterns E) Shape of continental margins
The study of how humans interact with the living and non-living components of the environment is called ____________ science.
Fill in the blank(s) with the appropriate word(s).
snRNA is involved in which of the following processes?
A) splicing B) transcription C) translation D) none of these
The greatest recorded seasonal snowfall ever recorded in the United States was recorded at Mt. Baker Lodge in Washington, with an amount of:
A) 33 feet. B) 67 feet. C) 90 feet. D) 110 feet.