Wave action works to straighten a coast as wave energy focuses around headlands in a process called

Which of the following was NOT included in Beijing under the Yuan Dynasty?

A) Drum Tower B) outer and inner walls C) residential areas D) palaces E) informal settlements

Which of the following is not accurate concerning water and mass wasting in unconsolidated (loose) materials?

A. Slopes become unstable when a small amount of water is added. B. Slopes can be unstable if the material is too dry. C. Slopes can be more stable if the material has some water in it. D. Slopes become very unstable if there is too much water. E. All of these choices are correct.

[NeedAttention]

src="data:image/png;base64,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

Which of the following statements is FALSE about volcanoes?

A) volcanoes usually provide an array of warnings before they erupt, thus minimizing the loss of life should humans heed the warnings B) volcanoes tend to generate very poor soils for agriculture C) volcanoes are found in site-specific places on Earth, most notably along plate boundaries D) volcanoes are an excellent source of geothermal energy E) volcanism may provide tourism revenue due to the scenic beauty of the landscape