Persistent pesticides decompose quickly and present less of an environmental hazard.

Acoustic profiling is used to study ________.

A. sediment size B. sediment distribution C. sediment size and sediment distribution D. seafloor structure E. sediment distribution and seafloor structure

[NeedAttention]

src="data:image/png;base64,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

This is the first type of cloud an observer will see when a warm front is approaching

A) low-level stratus. B) nimbostratus. C) altostratus. D) cirrus.

Which one of the following is a secondary pollutant?

A) sulfuric acid B) particulate matter C) volatile organics D) carbon monoxide