Answer:
d/dt[mCp(Ts-Ti)] = FCp(Ts-Ti) - FoCp(Ts-Ti) + uA(Ts-Ti)
Explanation:
Differential balance equation on the tank is given as;
<h3>Accumulation = energy of inlet steam - energy of outlet steam+ </h3><h3> heat transfer from the steam</h3><h3>where; </h3>
Accumulation = d/dt[mcp(Ts-Ti)]
Energy of inlet steam = FCp(Ts-Ti)
Energy of outlet steam = FoCp(Ts-Ti)
Heat transfer from the steam = uA(Ts-Ti)
Substituting into the formula, we have;
<h3>Accumulation = energy of inlet steam - energy of outlet steam+ </h3><h3> heat transfer from the steam</h3><h3 /><h3>d/dt[mCp(Ts-Ti)] = FCp(Ts-Ti) - FoCp(Ts-Ti) + uA(Ts-Ti)</h3><h3 /><h3 />