Metamorphism caused by the close proximity of a magma source is called

Which of the following conditions will likely occur if global temperatures continue to rise?

A. The oceans will increase the amount of CO2 in the atmosphere. B. The oceans will have no effect on atmospheric CO2 concentrations. C. The oceans will reduce the amount of CO2 in the atmosphere. D. The oceans could increase or reduce the amount of CO2 in the atmosphere.

A vesicular felsic rock is called a:

a. pumice. b. scoria. c. obsidian. d. tuff. e. volcanic breccia

Which one of the following is least likely to be a product of a transition to a sustainable civilization?

A) A stable human population B) Increased reliance upon recycled materials C) Larger cities with extensive suburbs D) Greater reliance upon renewable energy resources

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