Answer: the temperature of the inner surface is 599.55 K
Explanation:
first, let Am² represent area of the oven surface
now heat transfer rate due to convection
qconv = hAΔT
where ΔT is temperature difference in kelvin (To -Ts) temperature of outer surface - temperature of surroundings
ΔT = 400K - 300k = 100k
and h = 20 W/m².K
so we substitute
qconv = 20 × A × 100 = 2000A W
Now heat transfer due to emission
qemi = ∈α(To⁴ - Ts⁴)A
∈ is emissivity = 0.8, α is boltzman constant = 5.67×10⁻⁸ W/m⁻²K⁻⁴
so we substitute
qemi = 0.8 × 5.67×10⁻⁸ (400⁴ - 300⁴)A
qemi = 4.536×10⁻⁸ × 1.75×10¹⁰ × A
qemi = 793.8A W
NOW total heat loss rate = Qconv + Qemi
2000A + 793.8A = 2793.8A W
so since outer surface is to be maintained at a temp of 400K then heat must be transferred from inner surface to outer surface at the same rate.
Therefore
Heat transfer rate to outer surface by conduction = kA(Ti-To)/L
k is thermal conductivity 0.7 W/m.K, Ti is temperature of inner surface, L is the thickness of plate 0.05m
so Heat transfer rate = 0.7× A × ( Ti - 400 ) / 0.05
Now
This heat transfer rate equals heat loss rate
so 0.7× A × ( Ti - 400 ) / 0.05 = 2793.8 × A
divide both side by A
THEREFORE
Ti = 400 + 199.55
Ti = 599.55 K
∴ the temperature of the inner surface is 599.55 K
