According to Newton, the viscous force acting between liquid layers of area A and velocity gradient `(Deltav)/(Deltaz)` is given by `F =- eta A (dv)/(dz)`, where `eta` is constant called

According to Newton, the viscous force acting between liquid layers of area A and velocity gradient (Deltav)/(Delta z) is given by F = -eta A (dv)/(dz) , where eta is constant called coefficient of viscosity . The dimensional formula of its

According to Newton, the viscous force acting between liquid layers of area A and velocity gradient Deltav//Deltaz is given by F=-etaA(Deltav)/(Deltaz) where eta is constant called coefficient of viscosity. The dimension of eta is :

Viscous force acting between two layers of liquid having area A and velocity gradient (Deltav)/(Deltaz) is given by F = etaA(Deltav)/(Deltaz) . Find dimension of eta .

The viscous force acting between 2 layers of a liquid is given by (F)/(A) = eta(dv)/(dz) = This F/A may be called

The viscous force acting between two layers of a liquid is given by F/A=eta(dv)/(dz) . This F/A may be called

The viscous force acting between two layers of a liquid is given by F/A=eta(dv)/(dz) . This F/A may be caled

When a liquid flows in a tube, there is relative motion between adjacent layers of the liquid. This force is called the viscous force which tends to oppose the relative motion between the layers of the liquid. Newton was the first person to study the factors that govern the viscous force in a liquid. According to Newton’s law of viscous flow, the magnitude of the viscous force on a certain layer of a liquid is given by F = - eta A (dv)/(dx) where A is the area of the layer (dv)/(dx) is the velocity gradient at the layer and eta is the coefficient of viscosity of the liquid. The dimensional formula for the coefficient of viscosity is :