Answer:
Temperature distribution is [tex]T(x)=\dfrac{q}{k}(L-x)+T[/tex]
Heat flux=q
Heat rate=q A
Explanation:
We know that for no heat generation and at steady state
[tex]\dfrac{\partial^2 T}{\partial x^2}=0[/tex]
[tex]\dfrac{\partial T}{\partial x}=a[/tex]
[tex]T(x)=ax+b[/tex]
a and are the constant.
Given that heat flux=q
We know that heat flux given as
[tex]q=-K\dfrac{dT}{dx}[/tex]
From above we can say that
[tex]a= -\dfrac{q}{K}[/tex]
Alos given that when x= L temperature is T(L)=T
[tex]T= -\dfrac{q}{K}L+b[/tex]
[tex] b=T+\dfrac{q}{K}L[/tex]
So temperature T(x)
[tex]T(x)=-\dfrac{q}{K}x+T+\dfrac{q}{K}L[/tex]
[tex]T(x)=\dfrac{q}{k}(L-x)+T[/tex]
So temperature distribution is [tex]T(x)=\dfrac{q}{k}(L-x)+T[/tex]
Heat flux=q
Heat rate=q A (where A is the cross sectional area of wall)
