Which of the following has NOT been a compelling factor pushing rural people to migrate to cities in Latin America?
A) individual choices made by the young and the better educated to seek opportunities
B) mechanization of agriculture decreased the labor needs in the countryside
C) inability of the peasantry to gain ownership of arable farmland from the entrenched
latifundia system
D) conditions (educational access, drinking water, health care) are better in urban areas
E) to take advantage of government funded programs encouraging people to migrate to
large urban areas
E) to take advantage of government funded programs encouraging people to migrate to
large urban areas
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Wegener's continental drift hypothesis was weakened because a viable mechanism for moving the continents was lacking
Indicate whether the statement is true or false.
Invasive species represent a threat to biodiversity worldwide. Based on either the examples presented in the textbook or outside sources, describe several invasive species of concern in your area. What factors contributed to their spread
Why are these species of concern, both in a broad context, as well as within your area.
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
The two continents that fit together well and split relatively to one another were
What will be an ideal response?