For the equilibrium
`PCI_(5(g)) harr PCI_(3(g)) + CI_(2(g)) , K_c=(alpha^2)/((1-alpha)V)`
temperature remaining constant,

K_(p) = 1, For the equilibrium CaCO_(3(s)) hArr CaO_((s)) + CO_(2(g)) . The temperature of the reaction can be given as :

For the equilibrium SO_(2)Cl_(2(g)) hArr SO_(2(g)) + Cl_(2(g)) . What is the temperature at which (K_(p)(atm))/(K_(c)(M)) = 3 ?

For the reaction PCl_(5(g)) hArr PCl_(3(g)) + Cl_(2(g)) the forward reaction at constant temperature is favoured by

For the reaction CO_((g)) + Cl_(2(g)) hArr COCl_(2(g)). The K_(p)//K_(c) is equal to

Consider the following equilibrium PCl(g) hArr PCl_(3)(g) + Cl_(2)(g) in a closed container. At a fixed temperature, the volume of the reaction container is halved. For this change, which of the following statements holds true regarding the equilibrium constant (K_(p)) and degree of dissocitation (alpha) ?

For the equilibrium AB_((g)) harr A_((g)) +B_((g)) , at a given temperaturer (1)/(3) rd of AB is dissociated then (P)/(K_(P)) will be numerically equal to ____

For the reaction CO_((g))+CI_(2(g)) harr COCI_(2(g)) . The K_p // K_c is equal to

Two systems, PCI_(5(g)) harr PCI_(3(g)) + Cl_(2(g)) and COCl_(2(g)) harr CO_((g)) + Cl_(2(g)) are simultaneously in equilibrium in a vessel at constant volume. If some CO is introduced into the vessel, then at the new equilibrium, the concentration of:

PCl_(5) dissociates as follows in a closed reaction vessel PCI_(5(g)) harr PCl_(3(g)) + Cl_((g)) . If total pressure at equilibrium of the reaction mixture is P and degree of dissociation of PCl_(5) is x, the partial pressure of PCI_(3) will be