The temperature of a body at time is . If , then is:
- A
- B
- C
- D
The temperature of a body at time is . If , then is:
Correct answer:C
Standard Method
Given: , , and .
Find: .
Separate the variables:
Integrate both sides:
So,
Exponentiating,
Hence,
Using ,
Therefore,
So the temperature function is
Now use :
Thus,
Substitute :
Therefore, the temperature at is . The correct option is C.
Use the ratio directly
Given: with surrounding temperature .
Find: .
For Newton's law of cooling, the excess temperature decays exponentially. From to ,
and
So in minutes, the excess temperature becomes half.
The same factor applies in each equal interval of minutes. Therefore after minutes, which is three such intervals,
Hence,
Therefore, the temperature is . The correct option is C.
Using exponential decay on directly instead of on . The differential equation is based on the difference from the ambient temperature , so the correct quantity to track is , not itself.
Forgetting to use the condition to determine . Without finding the decay constant from the second condition, cannot be evaluated correctly.
Assuming the temperature drops by the same number of degrees every minutes. The process is exponential, so the excess temperature is multiplied by a constant factor, not decreased by a fixed amount.
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