According to Newton\'s Law of Cooling. the rate of change of an object\'s temper
ID: 2881263 • Letter: A
Question
According to Newton's Law of Cooling. the rate of change of an object's temperature is proportional to the difference between the temperature of the object and that of the surrounding medium. The accompanying figure shows the graph of the temperature T (in degrees Fahrenheit) versus time t (in minutes) for a cup of coffee, with initial temperature 200 degrees Fahrenheit, that is allowed to cool in a room with a constant temperature of 75 degrees Fahrenheit. Click on the image to see a larger graph. Estimate T when t = 10 minutes: Estimate dT/dt when t = 10 minutes: Newton's Law of Cooling can be expressed as = dT/dt = k(T - T_0).where k is the constant of proportionality and T_0 is the temperature of the surrounding medium. Use the results of parts (a) and (b) to estimate the value of k. Value of kExplanation / Answer
We have given T(0)=2000,T(a)=750
Newton's Law of Cooling dT/dt =k(T-T0)
T=T0+(T(0)-T0)e^(kt)
a) when t=10 minutes
T(10)=75+(200-75)e^(10k) since T(0)=200,T0=75
T(10)=75+125*e^(10k)
b) we have T=T0+(T-T0)e^(kt)
dT/dt=(T-T0)e^(kt)*(k)
dT/dt=(200-75)e^(kt)*(k)=125k*e^(kt)
when t=10
dT/dt =125k*e^(10k)
c) Equating both the part (a) and part (b) for after 10 minutes
125k*e^(10k)=75+125*e^(10k)
125*e^(10k)*(k-1)=75
e^(10k)*(k-1)=75/125=3/5
e^(10k)=3/5 and (k-1)=3/5
10k=ln(3/5) and k=3/5+1=8/5
k=ln(3/5)/10 and k=8/5