Answer:
-13.18°C
Explanation:
To develop the problem it is necessary to consider the concepts related to the thermal conduction rate.
Its definition is given by the function
[tex]\frac{Q}{t} = \frac{kA\Delta T}{d}[/tex]
Where,
Q = The amount of heat transferred
t = time
k = Thermal conductivity constant
A = Cross-sectional area
[tex]\Delta T =[/tex] The difference in temperature between one side of the material and the other
d= thickness of the material
The problem says that there is a loss of heat twice that of the initial state, that is
[tex]Q_2 = 2*Q_1[/tex]
Replacing,
[tex]kA\frac{\Delta T_m}{x} = 2*kA\frac{\Delta T}{x}[/tex]
[tex]\frac{\Delta T}{x}=2*\frac{\Delta T}{x}[/tex]
[tex]\frac{T_i-T_o}{x} = 2\frac{T_1-T_2}{x}[/tex]
[tex]\frac{28.9-T_o}{x} = 2\frac{28.9-7.86}{x}[/tex]
Solvinf for [tex]T_o[/tex],
[tex]T_o = -13.18[/tex]
Therefore the temprature at the outside windows furface when the heat lost per second doubles is -13.18°C
