The continuous removal of heat from water corresponds to a consistent decrease in temperature. Indicate whether the statement is true or false
ANS: F
The removal of heat does not correspond to a steady drop in temperature. The heat removal does lower
the temperature, but the temperature stops when there is a phase change. The temperature stops until
all the water transitions from liquid to solid, for example. Only after all of the molecules change their
state will the temperature continue to decrease. Information can be found in the section Water Has
Unusual Thermal Characteristics.
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Which of the following best exemplifies innovation?
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