[NeedAttention]
src="data:image/png;base64,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
Answer: E
You might also like to view...
How might future plans for restoring the Colorado Delta go astray?
What will be an ideal response?
Why are so few volcanoes mapped in the middle of the oceans?
A) The middle of the oceans corresponds with the middle of tectonic plates, so there are only hot-spot volcanoes there. B) Geologists cannot pinpoint the locations of many recently active seafloor volcanoes. C) There are only convergent plate boundaries under the ocean, which are less likely to have volcanoes than transform or divergent boundaries. D) There are only divergent plate boundaries under the ocean, which are less likely to have volcanoes than transform or convergent boundaries.
Lymphocytes are a specialized form of which of the following?
A) dendritic cells B) macrophages C) red blood cells D) white blood cells
Which process of a scientifically enlightened citizen deals with being aware that others' actions on Earth affect us and we affect others?
A. know B. act C. care