[" For a solution of two liquid "A" and "],[B," it proves that "P=X_(4)(P_(A)-P_(B)^(0))+P_(B)^(0)" the "],[" solution is "]

In a mixture of closely related liquids (such as benzene and toluence), the Roult's law states that the ratio P_(A) is proportional to the mole fraction of A in the liquid, P_(A)x_(A) . Mixtures that obey the law throughout the composition ranges from pure A to pure B are called ideal solutions . In ideal solution the solute also obeys Roult's law . Then the total pressure is given by P_("total")=P_(A)^(0)x_(A)+P_(B)^(0)x_(B) For the solution which obeys Roult's law , which of the following is incorrect ?

If a,b<0 and 0

If a,b>0 and 0

A and B are two events such that P(A)=0.8, P(B)=0.5 and P(B|A)=0.4, then find P(A|B)

If A and B are events such that P(A) = 0·4, P(B) = 0.8 and P(B/A) = 0·6, then P(A nn B) is :

In a mixture of closely related liquids (such as benzene and toluence), the Roult's law states that the ratio P_(A) is proportional to the mole fraction of A in the liquid, P_(A)x_(A) . Mixtures that obey the law throughout the composition ranges from pure A to pure B are called ideal solutions . In ideal solution the solute also obeys Roult's law . Then the total pressure is given by P_("total")=P_(A)^(0)x_(A)+P_(B)^(0)x_(B) Each of the following solution obeys Raoult's law except

For a mixture of two volatile , completely miscible liquids A and B , with P_(A)^(@)=500 " torr and " P_(B)^(@)=800 torr , what is the composition of last droplet of liquid remaining in equilibrium with vapour ? Provided the initial ideal solution has a composition of x_(A) = 0.6 and x_(B)=0.4

For a mixture of two volatile , completely miscible liquids A and B , with P_(A)^(@)=500 " torr and " P_(B)^(@)=800 torr , what is the composition of last droplet of liquid remaining in equilibrium with vapour ? Provided the initial ideal solution has a composition of x_(A) = 0.6 and x_(B)=0.4