Respuesta :
Answer:
the correct answer to increase the thickness of the windows
Explanation:
Thermal transfer by conduction is
P = k A [tex]( \frac{ T_h - T_c}{L} )[/tex]
where P is the heat transfer rate, A is the area and L is the thickness
In the given case we have that the window is made up of two materials, two layers of transparent glass and a layer of air between them, let us use the index 1 for the glass and the index 2 for the air, the equation remains
P =[tex]k_1 A_1 \frac{ \Delta T }{2 \ e_1} + k_2 A_2 \frac{ \Delta T}{e_2}[/tex]
where the number two (2) is due to the two layers of glass
the thermal conductivity of the glass is k₁ = 0.75 W/m K for a glass of
e₁ = 4 mm, this is more used for windows
the thermal conductivity of the air is k₂ = 0.024 W / m K for a temperature of T = 0ºC
In a window the area and the temperature difference are constant for each part for a given configuration
P = [tex]( \frac{k_1}{2 \ e_1} + \frac{k_2 }{ e_2} )[/tex] A ΔT
To decrease the speed of thermal transfer we can decrease the area, but this also reduces the lighting in the room, which brings other costs.
We can also increase the thickness of the materials, as we see the thermal conductivity of the air is very less than that of glass
k₂ « k₁
increasing the thickness of the air layer would have the greatest effect is the decrease in heat transfer in window light
consequently the correct answer to increase the thickness of the windows
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