A cup of coffee cools from to in minutes when the room temperature is . The time taken by the similar cup of coffee to cool from to at the same room temperature is:
- A
- B
- C
- D
A cup of coffee cools from to in minutes when the room temperature is . The time taken by the similar cup of coffee to cool from to at the same room temperature is:
Correct answer:A
Standard Method
Given: A cup of coffee cools from to in minutes, and the surrounding temperature is .
Find: The time taken for a similar cup to cool from to at the same surrounding temperature.
Using Newton's law of cooling in integrated form:
Integrating between temperatures and gives
so,
Hence,
For cooling from to ,
Let the required time for cooling from to be . Then,
Since is the same in both cases,
Therefore,
Using the approximation given in the solution,
So,
Hence,
Therefore, the time taken is , so the correct option is A.
Average Form of Newton's Law of Cooling
Given: The cup cools from to in minutes, and the room temperature is .
Find: The time for cooling from to .
Using the average form of Newton's law of cooling:
and
From these two equations,
and
Eliminating ,
Thus,
This shortcut works because over a small temperature interval, the cooling rate may be estimated using the average excess temperature above the surroundings. Therefore, the correct option is A.
Using the temperature itself instead of the excess temperature above the surroundings. Newton's law of cooling depends on , not on alone. Always subtract the room temperature before forming the ratio or writing the differential equation.
Assuming equal temperature drops imply equal cooling times. A drop of at higher temperature does not take the same time as a drop of at lower temperature because the cooling rate changes with temperature difference from the surroundings.
Equating the times directly from the two cases without keeping the same cooling constant . The correct method is to write expressions for the same constant for both intervals and then compare them.
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