The construction of a dam across a river is likely to cause ______ upstream of the dam, and _______ downstream.

Climate knowledge can be used to accurately predict weather

Indicate whether the statement is true or false

A(n) ________ is a step-like landform found above a stream and its floodplain. It is a remnant of an older flood plain or river-eroded flat surface.

A. levee B. upland plateau C. cut bank D. stream terrace E. incised meander

All major geyser basins are similar in that they are covered with ________

A) a salt glaze B) mineral deposits C) tufa layers D) a thick sulfur layer E) a gravel layer

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