Consider the equilibrium A(g) hArr 2B (g...

Consider the equilibrium `A(g) hArr 2B (g) +3C(g) "at" 25^@C`. When A is loaded into a cylinder at 10.0 atm and the system is allowed to come an equilibrium then , final pressure is found to be 15.76 atm, what is standard Gibbs eneergy change for the reaction ?

Text Solution

AI Generated Solution

To find the standard Gibbs energy change (ΔG°) for the reaction \( A(g) \rightleftharpoons 2B(g) + 3C(g) \) at 25°C, we can follow these steps: ### Step 1: Understand the Initial and Final Conditions - The initial pressure of A is given as \( P_A = 10.0 \, \text{atm} \). - The final equilibrium pressure of the system is \( P_{total} = 15.76 \, \text{atm} \). ### Step 2: Set Up the Change in Pressure Let \( p \) be the change in pressure due to the reaction progressing towards equilibrium. According to the stoichiometry of the reaction: ...

Similar Questions

Explore conceptually related problems

If the equilibrium constant of a reaction is 2×10^3 at 25°C then the standard Gibbs free energy change for the reaction will be

Consider the imaginary equilibrium 4A(g)+5B(g)hArr 4X(g)+6Y(g) , The unit of equilibrium constant K_(C) is

A(s)hArrB(g)+C(g) K_(P)=40atm^(2) X(s)hArrB(g)+E(g) Above equilibrium is allowed to attain in a closed container and pressure of B was found to be 10 atm. Calculate standard Gibb's free energy change for X(s)hArrB(g)+E(g) "at" 300K (take R=2 cal//k//mol )

For the reaction NH_(4)HS(s) hArr NH_(3)(g)+H_(2)S(g) in a closed flask, the equilibrium pressure is P atm. The standard free energy of the reaction would be:

For the equilibrium NH_2CONH_4(s) hArr 2NH_3(g) +CO_2(g) P_(CO_2)= 1 atm at 100^@C . What will be the equilibrium constant at 100^@C in atm.

Equilibrium constant for the reaction: H_(2)(g) +I_(2) (g) hArr 2HI(g) is K_(c) = 50 at 25^(@)C The standard Gibbs free enegry change for the reaction will be:

The reaction, 2A(g) + B(g)hArr3C(g) + D(g) is begun with the concentration of A and B both at an intial value of 1.00 M. When equilibrium is reached, the concentration of D is measured and found to be 0.25 M. The value for the equilibrium constant for this reaction is given by the expression:

For the reaction AB_(2)(g) rarr AB(g) + B(g) , the initial pressure of AB_(2)(g) was 6 atm and at equilibrium, total pressure was found to be 8 atm at 300 K. The equilibrium constant of the reaction at 300 K is……

consider the given reaction, 3A(g) + B(g) hArr 2C(g) at a given temperature if a mixture of 2 mol each of A, B and C exist at equilibrium and K_c =9 then volume of the flask will be

For a reaction A(g) hArr B(g) at equilibrium . The partial pressure of B is found to be one fourth of the partial pressure of A . The value of DeltaG^(@) of the reaction A rarrB is

Consider the equilibrium `A(g) hArr 2B (g) +3C(g) "at" 25^@C`. When A is loaded into a cylinder at 10.0 atm and the system is allowed to come an equilibrium then , final pressure is found to be 15.76 atm, what is standard Gibbs eneergy change for the reaction ?

Text Solution

Similar Questions

Recommended Questions