Answer:
Q = 42.877
e = 76.87 %
Explanation:
Given:
- The diameter of the Aluminium rod d = 1 cm
- The Length of the Aluminium rod L = 30 cm
- The base Temperature of rod Tb = 80°C
- The temperature of ambient air T∞ = 220°C
- The thermal conductivity of rod k = 237 W/mK
- heat transfer coefficient is h = 18 W/m*k
Find:
What is the rate of heat transfer from the fin
What is the fin effectiveness?
Solution:
- The perimeter P of the fin:
P = pi*d
P = pi*0.01 = 0.03141 m
- The area of rod cross section A:
A = pi*d^2 / 4 = pi*0.01^2 / 4
A = 0.00007 m^2
- The heat transfer rate of fin:
[tex]\\Q = \sqrt{h*P*k*A}*(T_i_n_f - Tb)[/tex]
Then:
[tex]Q = \sqrt{18*237*0.0007*0.03141}*(220 - 80)\\\\Q =42.877 W[/tex]
- The effectiveness e of an infinitely long pin is as follows:
[tex]e = \sqrt{\frac{k*P}{h*A} } \\\\e = \sqrt{\frac{237*0.03141}{18*0.00007} } \\\\e = 76.87%[/tex]
