Cities in developing countries containing a complex mix of ethnic groups show evidence of which urban structure model?

The majority of urban population growth in peripheral countries is due to natural increase

Indicate whether this statement is true or false.

Most of the historic evidence that supports the scientific theory of evolution comes from ____________________

Fill in the blanks with correct word

What type of slope failure is shown in this figure?

A) Rotational slide
B) Creep
C) Rock avalanche
D) Debris flow
E) Rock fall

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