Question 1
Label the mechanisms of heat transfer on the diagram below.
![](data:image/png;base64, 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)
Question 2
Considering the albedo of various surfaces, compare daily temperature ranges and means for an urban area to a more rural setting of crops and forests. Also, are there any other factors other than albedo that might affect these temperature variations?