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Question: A hot body obeying Newton's law of cooling is cooled down from its peak value \[{80^ \circ }C\] to a...

A hot body obeying Newton's law of cooling is cooled down from its peak value 80C{80^ \circ }C to an ambient temperature of 30C{30^ \circ }C. It takes 5min.5\min . in cooling down from 80C to 40C{80^ \circ }C{\text{ to }}{40^ \circ }C. How much time will it take to cool down from 62C to 32C{62^ \circ }C{\text{ to }}{32^ \circ }C
(given ln2=0.693,ln5=1.609\ln 2 = 0.693,\ln 5 = 1.609)
a. 9.6min.9.6\min .
b. 3.75min.3.75\min .
c. 8.6min.8.6\min .
d. 6.5min.6.5\min .

Explanation

Solution

Hint In this question, the only formula that will be used is Newton's law of cooling which is (θtθo)=(θpθo)ekt({\theta _t} - {\theta _o}) = ({\theta _p} - {\theta _o}){e^{ - kt}}
Here , θt{\theta _t} is the temperature at time t,
θo{\theta _o} is the temperature of surroundings,
θp{\theta _p} is the peak temperature and
kk is the constant
We will first determine the unknown value of kk and then use this law again to find the time according to new conditions.

Complete step-by-step solution :
Newton's law of cooling states that the rate of heat loss of a body is directly proportional to the difference in the temperature between the body and its surroundings.
Here the temperature of surroundings or we can say, the ambient temperature is 30C{30^ \circ }C. So, θ=30C{\theta _ \circ } = {30^ \circ }C
The peak temperature from which it starts cooling down is 80C{80^ \circ }C. It is represented by θp{\theta _p} . So, θp=80C{\theta _p} = {80^ \circ }C body cools down from peak temperature after a certain time interval. In this case, the time interval is 5min.5\min . or 50×60=300s50 \times 60 = 300s and temperature θt=40C{\theta _t} = {40^ \circ }C
Newton's law of cooling is mathematically expressed as
(θtθo)=(θpθo)ekt({\theta _t} - {\theta _o}) = ({\theta _p} - {\theta _o}){e^{ - kt}}
Substituting the values, we get
4030=(8030)ekt 10=50e300k e300k=5 40 - 30 = (80 - 30){e^{ - kt}} \\\ 10 = 50{e^{ - 300k}} \\\ {e^{300k}} = 5
Taking log\log both sides,we have
ln(e300k)=ln5 300k=ln5 k=ln5300 k=0.609300 \ln ({e^{300k}}) = \ln 5 \\\ 300k = \ln 5 \\\ k = \dfrac{ln 5}{300} \\\ k = \dfrac{0.609}{300} \\\
Now, we are asked to calculate the time in which the body will cool down. The surrounding temperature and constant k will remain the same.
Let the unknown time be t
We have
θp=62C θt=32C θo=30C k=1.609300  {\theta _p} = {62^ \circ }C \\\ {\theta _t} = {32^ \circ }C \\\ {\theta _o} = {30^ \circ }C \\\ k = \dfrac{1.609}{300} \\\
Using Newton's law of cooling, we have
θtθo=(θpθo)ekt\Rightarrow {\theta _t} - {\theta _o} = ({\theta _p} - {\theta _o}){e^{ - kt}}
3230=(6230)ekt\Rightarrow 32 - 30 = (62 - 30){e^{ - kt}}
ekt=16\Rightarrow {e^{ - kt}} = 16
Taking log\log both sides
ln(ekt)=ln16\ln ({e^{ - kt}}) = \ln 16
kt=4ln2\Rightarrow kt = 4\ln 2
t=4ln2k\Rightarrow t = 4\dfrac{ln 2}{k }
t=4×0.693×3001.609=516.84s\Rightarrow t = \dfrac{4 \times 0.693 \times 300}{1.609} = 516.84s
t=8.614min\Rightarrow t = 8.614\min
So, option (c) is correct .

Note:- You should be very careful with calculations and should be well versed with laws related to logarithm. Moreover, you should precisely know which physical quantities are represented by θp,θt,θn,t\theta _{p},\theta _{t},\theta _{n},t