Answer:
[tex]\eta = 4.617\times 10^{-4}\,(0.046\,\%)[/tex], [tex]\dot Q_{out} = 162369.444\,kW[/tex]
Explanation:
The definition of thermal efficiency follows to this expression:
[tex]\eta = \frac{\dot W}{\dot Q_{in}}[/tex]
[tex]\eta = \frac{75\,kW}{\left(43000\,\frac{kJ}{L} \right)\cdot \left(13600\,\frac{L}{h} \right)\cdot \left(\frac{1\,h}{3600\,s} \right)}[/tex]
[tex]\eta = 4.617\times 10^{-4}\,(0.046\,\%)[/tex]
The rate of heat transfer to the ocean is:
[tex]\dot Q_{out} = \dot Q_{in}-\dot W[/tex]
[tex]\dot Q_{out} = \left(43000\,\frac{kJ}{L} \right)\cdot \left(13600\,\frac{L}{h} \right)\cdot \left(\frac{1\,h}{3600\,s} \right)-75\,kW[/tex]
[tex]\dot Q_{out} = 162369.444\,kW[/tex]
