[NeedAttention]
src="data:image/png;base64,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
Answer: E
You might also like to view...
A tipping-bucket rain gauge measures rainfall by [INSERT FIGURE 7-25B. NO CAPTION]
A) measuring the volume of the water that spills out of the buckets B) counting the number of time the bucket tips over C) collecting the water that spills out of only one of the two buckets D) weighing the rainwater that spills out of the buckets
Answer the following statement(s) true (T) or false (F)
1. The traditional cattle grazing of the Maasai is the majo cause of the decline of rhino and elephant populations in Kenya. 2. Actor network theory helps explain the dialogue between Ideal and material factors in the “nature-culture” dichotomy. 3. Contingent valuation is a way to assess cultural values by determining how much people are willing to pay for things. 4. One assumption of rational risk assessment is that the “facts” relevant to an issue of risk cannot be known.
Latitude is a major control of temperature since latitude determines the Sun angle
Indicate whether the statement is true or false
Which statement correctly describes rock-forming minerals and economic minerals?
a. Rock-forming minerals consist of a few types of minerals that are sparse in Earth's crust, whereas economic minerals are very abundant and are used extensively in the manufacture of products. b. Only minerals that are not rock-building minerals can have economic value. c. Silicates are important economic resources and include gypsum, which is used for plaster. Nonsilicate minerals are only important as rock-building minerals. d. Economic minerals consist mostly of silicate minerals, whereas rock-building minerals consist mostly of nonsilicates. e. Rock-forming minerals consist of a few types of minerals that are abundant in Earth's crust, whereas economic minerals are less abundant and are used extensively in the manufacture of products.