Respuesta :
After an hour (4pm to 5pm) the temperature drops 18e⁻⁰˙⁶=9.9℉, so the temperature after an hour will be 68-9.9=58.1℉.
(The change -18e⁻⁰˙⁶ is negative indicating a drop in temperature.)
(The change -18e⁻⁰˙⁶ is negative indicating a drop in temperature.)
Answer:
The temperature of the wine have dropped by 0.9°F.
The temperature of the wine will be 58.1 °F at 5 PM.
Step-by-step explanation:
We have been given that a bottle of white wine at room temperature (68°f) is placed in a refrigerator at 4 p.m. its temperature after t hr is changing at the rate of [tex]-18e^{-0.6t}[/tex] °f/hour.
We will use newton'e law of cooling to solve our given problem.
[tex]T(t)=Ce^{-kt}+T_a[/tex], where,
[tex]T_a[/tex] = Initial temperature.
Upon substituting [tex]T_a=68[/tex] and [tex]Ce^{-kt}=-18e^{-0.6t}[/tex], we will get:
[tex]T(t)=-18e^{-0.6t}+68[/tex]
To find the temperature at 5 p.m. we will substitute [tex]t=5[/tex] in our function as:
[tex]T(5)=-18e^{-0.6(5)}+68[/tex]
[tex]T(5)=-18e^{-3}+68[/tex]
[tex]T(5)=-18(0.0497870683678639)+68[/tex]
[tex]T(5)=-0.8961672306215502+68[/tex]
[tex]T(5)=67.103832769\approx 67.10[/tex]
Now, we will subtract 67.10 from 68 to find the temperature dropped by 5 PM.
[tex]68-67.10=0.9[/tex]
Therefore, the temperature dropped by 0.9°F.
To find the temperature of wine at 5 PM, we will substitute [tex]x=1[/tex] as 5 PM is 1 hour later 4 PM.
[tex]T(1)=-18e^{-0.6(1)}+68[/tex]
[tex]T(1)=-18e^{-0.6}+68[/tex]
[tex]T(1)=-9.87860944969+68[/tex]
[tex]T(1)=58.12139055031\approx 58.1[/tex]
Therefore, the temperature of the wine will be 58.1 °F at 5 PM.
