I am supposed to determine whether the following two statements are true or false:
For the reaction $\ce{A (g) <=> B (g) + C(g)}$, $K_p = \pu{1 atm}$. If we start with equal moles of all gases at $\pu{9 atm}$ of initial pressure, then at equilibrium the partial pressure of $\ce{A}$ increases.
The reaction quotient $Q_p > K_p$, hence the equilibrium shifts in the backward direction.
I discussed it with my friend, who gave me a weird explanation abut how to find the reaction quotient $Q$ at the start. He claimed that it would be equal to the total pressure at the starting point, $\pu{9 atm}$. But I believe that my friend is wrong, according to the following calculation:
Let us assume that $x~\mathrm{mol}$ of each gas is present. Hence the mole fraction of each gas is $x/(3x)$ = $1/3$. The partial pressure of $\ce{A}$ is thus $p_\ce{A} = (1/3) \times 9 = 3$ . Similarly we get $p_\ce{B} = 3$ and $p_\ce{C} = 3$, which gives
$$Q_p = (p_\ce{C} \times p_\ce{B})/p_\ce{A} = (3 \times 3)/3 = 3$$
Regardless of whether $Q$ is 3 or 9, it is still larger than $K$, so the eventual answer is not changed. However, I wanted to know what the correct value of $Q$ was.
