The potential energy function for a diatomic molecule is `U(x) =(a)/(x^(12)) - (b)/(x^(6))`. In stable equilibrium, the distance between the particles is .

If r is the interatomic distance, a and b are positive constants, U denotes potential energy which is a function dependent on r as follows : U=(a)/(r^(10) )-(b)/(r^(5)) . The equilibrium distance between two atoms is

The potential energy function for the force between two atoms in a diatomic molecule is approximate given by U(r) = (a)/(r^(12)) - (b)/(r^(6)) , where a and b are constants and r is the distance between the atoms. If the dissociation energy of the molecule is D = [U (r = oo)- U_("at equilibrium")],D is

The potential energy between two atoms in a molecule is given by, U_((x))=(a)/x^(12)-(b)/x^(6) , where a and b are positive constant and x is the distance between the atoms. The atoms is an stable equilibrium, when-

The potential energy function for the force between two in a diatomic molecule can approximately be expressed as U(x)=(a)/(x^(12))-(b)/(x^(4)) , where a and b are positive constants, and x is the distance between the atoms. Answer the following question by selecting most appropriate alternative. The dissociation energy of the molecule is (initially molecule is at rest at equilibrium)

The potential energy between two atoms in a molecule is given by U(x)= (1)/(x^(12))-(b)^(x^(6)) , where a and b are positive constants and x is the distance between the atoms. The atom is in stable equilibirum when

The potential energy function for the force between two in a diatomic molecule can approximately be expressed as U(x)=(a)/(x^(12))-(b)/(x^(4)) , where a and b are positive constants, and x is the distance between the atoms. Answer the following question by selecting most appropriate alternative. The graph between potential energy vs x will be

The potential energy between two atoms in a molecule is given by U=ax^(2)-bx^(2) where a and b are positive constants and x is the distance between the atoms. The atom is in stable equilibrium when x is equal to :-

The potential energy funtions for the force between two along in a distance molecule is approximatily given by U(x) = (a)/(x^(12)) - b)/(x^(6)) where a and b are constant and x is the distance between the aloms , if the discision energy of the molecale is D = [U(x = oo) - U atequlibrium ] , D is