What material is 10 on the Mohs scale?

The following table shows three fields of a land use layer with 10 polygons. The following questions relate to a series of queries in continuous sequence.LucodeCosthaHectare200200004.574001000010.50300100003.31300100000.44300100000.10300100000.72200150001.10300100000.19200150000.75200150000.78Next, you set up the expression, hectare > 2.0, and click "Select from current selection." How many records are selected?

What will be an ideal response?

Continents have no significant influence on global precipitation patterns

Indicate whether the statement is true or false

Which of the following is not a density-dependent population control factor?

A. Overcrowding B. Drought C. Competition D. Predation E. Stress

[NeedAttention]

src="data:image/png;base64,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