Women in Sub-Saharan Africa generally do not suffer the kinds of traditional social restrictions encountered in other parts of the developing world

How are foliated metamorphic rocks classified? Describe some of the rock types found at different

grades of foliated metamorphic rocks. What will be an ideal response?

What is the shape of the boundary between the two air masses that interact at a cold front?

a. a shallowly inclined surface b. a vertical wall c. a mixing zone within a spherical bubble d. every cold front is different e. a steeply sloping surface

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

What is the velocity of a stream with a discharge of 200 cubic meters/s that is 10 meters wide and 2 meters deep?

A. 10 meters/s B. 20 meters/s C. 400 meters/s D. 2000 meters/s