For the reaction
`AB_(2)(g)hArrAB(g)+B(g)`
If `prop` is negligiable w.r.t `1` then degree of dissociaation `(prop)` of `AB_(2)` is proportional to :

For the reaction (1)and(2) A(g)hArrB(g)+C(g) X(g) hArr2Y(g) Given , K_(p1):K_(p2)=9:1 If the degree of dissociation of A(g) and X(g) be same then the total pressure at equilibrium (1) and (2) are in the ratio:

At temperature T, a compound AB_(2)(g) dissociates according to the reaction 2AB_(2)(g)hArr2AB(g)+B_(2)(g) with degree of dissociation alpha , which is small compared with unity. The expression for K_(p) in terms of alpha and the total pressure P_(T) is

At certain temperature compound AB_(2)(g) dissociates according to the reaction 2AB_(2)(g) hArr2AB (g)+B_(2)(g) With degree of dissociation alpha Which is small compared with unity, the expression of K_(p) in terms of alpha and initial pressure P is :

For the reaction, N_2(g) +O_2(g) hArr 2NO(g) Equilibrium constant k_c=2 Degree of association is

The dissociation equilibrium of a gas AB_2 can be represented as, 2AB_2(g) hArr 2AB (g) +B_2(g) . The degree of disssociation is 'x' and is small compared to 1. The expression relating the degree of dissociation (x) with equilibrium constant k_p and total pressure P is

The equilibrium constant for the reaction A_(2)(g)+B_(2)(g) hArr 2AB(g) is 20 at 500K . The equilibrium constant for the reaction 2AB(g) hArr A_(2)(g)+B_(2)(g) would be

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……

For the reaction, AB(g)hArr A(g)+B(g), AB" is "33% dissociated at a total pressure of 'p' Therefore, 'p' is related to K_(p) by one of the following options

For the reaction, AB(g)hArr A(g)+B(g), AB" is "33% dissociated at a total pressure of 'p' Therefore, 'p' is related to K_(p) by one of the following options