A(n) ________ tree is one that sheds its leaves on a sporadic or successive basis with no seasonal variation
A) deciduous
B) hardwood
C) softwood
D) broadleaf
E) evergreen
Answer: E
You might also like to view...
[NeedAttention]
src="data:image/png;base64,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
Car accidents have killed more Americans than all wars in the country's history.
Answer the following statement true (T) or false (F)
What causes dynamic metamorphism and where is it found? What will be an ideal response?
Mexico's maquiladora plants
A) must operate far from the U.S.-Mexico border. B) employ more than five million laborers. C) have an advantage of proximity to Latin American markets. D) have an advantage of proximity to U.S. markets. E) have grown in number as factories have been closed in China.