Answer:
(a) Heat transfer to the environment is: 1 MJ and (b) The efficiency of the engine is: 41.5%
Explanation:
Using the formula that relate heat and work from the thermodynamic theory as:[tex]W=Q=Q_{in}-Q_{out}[/tex] solving to Q_out we get:[tex]Q_{out}=Q_{in}-W=5(MJ)-4(MJ)=1(MJ)[/tex] this is the heat out of the cycle or engine, so it will be heat transfer to the environment. The thermal efficiency of a Carnot cycle gives us: [tex]n=1-\frac{T_{Low} }{T_{High}}[/tex] where T_Low is the lowest cycle temperature and T_High the highest, we need to remember that a Carnot cycle depends only on the absolute temperatures, if you remember the convertion of K=°C+273.15 so T_Low=150+273.15=423.15 K and T_High=450+273.15=723.15K and replacing the values in the equation we get:[tex]n=1-\frac{423.15}{723.15} =0.415=41.5%[/tex]
