The Saffir-Simpson scale is used to classify _______________ intensity

Determine if the phrase in bold applies to only contact metamorphism, only regional metamorphism, both types of metamorphism or neither type of metamorphism. Form as a result of melting

A. Both contact and regional metamorphism B. Only contact metamorphism C. Only regional metamorphism D. Neither contact or regional metamorphism

Which of the following climates would you expect to find in coastal southern California?

A) humid tropical B) desert C) humid continental D) Mediterranean

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

Best available economically achievable technology (BAT) standards are standards set for

A. Nonpoint pollution B. Radioactive waste, specifically C. All point sources D. Organic compounds E. Toxic substances