Answer:
For A: The total pressure in the flask at equilibrium is 1.19 atm
For B: The value of [tex]K_p[/tex] for the given equation is 2.016
Explanation:
We are given:
Initial partial pressure of A = 0.77 atm
Equilibrium partial pressure of A = 0.35 atm
For the given chemical equation:
[tex]A(g)\rightleftharpoons 2B(g)[/tex]
Initial: 0.77
At eqllm: 0.77-x 2x
Evaluating the value of 'x'
[tex]\Rightarrow (0.77-x)=0.35\\\\x=0.42[/tex]
Equilibrium partial pressure of B = 2x = (2 × 0.42) = 0.84 atm
Total pressure in the flask at equilibrium = [tex]p^A_{eq}+p^b_{eq}=[0.35+0.84]atm=1.19atm[/tex]
Hence, the total pressure in the flask at equilibrium is 1.19 atm
The expression of [tex]K_p[/tex] for given equation follows:
[tex]K_p=\frac{(p_B)^2}{p_A}[/tex]
Putting values in above expression, we get:
[tex]K_p=\frac{(0.84)^2}{0.35}\\\\K_p=2.016[/tex]
Hence, the value of [tex]K_p[/tex] for the given equation is 2.016
