Answer:
[tex]n_{C2H_5OH}^{eq}=14.234mol[/tex]
Explanation:
Hello,
In this case, the reaction is:
[tex]C_2H_4+H_2O\rightleftharpoons CH_3CH_2OH[/tex]
Thus, the law of mass action turns out:
[tex]Kc=\frac{[CH_3CH_2OH]_{eq}}{[H_2O]_{eq}[CH_2CH_2]_{eq}}[/tex]
Thus, since at the beginning there are 29 moles of ethylene and once the equilibrium is reached, there are 16 moles of ethylene, the change [tex]x[/tex] result:
[tex][CH_2CH_2]_{eq}=29mol-x=16mol\\x=29-16=13mol[/tex]
In such a way, the equilibrium constant is then:
[tex]Kc=\frac{\frac{x}{V} }{\frac{16mol}{V}* \frac{3mol}{V}} =\frac{\frac{13mol}{75.0L} }{\frac{16mol}{75.0L}* \frac{3mol}{75.0L}} =20.31[/tex]
Thereby, the initial moles for the second equilibrium are modified as shown on the denominator in the modified law of mass action by considering the added 15 moles of ethylene:
[tex]Kc=\frac{\frac{13+x_2}{V} }{\frac{16+15-x_2}{V}* \frac{3-x_2}{V}} =20.31[/tex]
Thus, the second change, [tex]x_2[/tex] finally result (solving by solver or quadratic equation):
[tex]x_2=1.234mol[/tex]
Finally, such second change equals the moles of ethanol after equilibrium based on the stoichiometry:
[tex]n_{C2H_5OH}^{eq}=x+x_2=13mol+1.234mol\\n_{C2H_5OH}^{eq}=14.234mol[/tex]
Best regards.
