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Transcript
DRIVING FORCES FOR THE TRANSPORT PHENOMENA What is the driving force for momentum transport? Velocity Gradient!!! What is the driving force for heat transfer? Temperature Gradient!!! What is the driving force for mass transport? Concentration Gradient!!! MOMENTUM BALANCE • A small control volume of fluid is chosen. • Choose a coordinate system. • Momentum balance for this system is written to develop a DIFFERENTIAL EQUATION. • Use BOUNDARY CONDITIONS to obtain algebraic relations from the solutions of the differential equations • Solve the algebraic relations to determine engineering characteristics of the system such as velocity distributions Æshear stress at the fluid-solid interface. THE MOMENTUM BALANCE FOR STEADY STATE FLOW rate of momentum in - rate of momentum out + sum of forces acting on the system = 0 Stress components acting on a small element. Equilibrium leads to symmetry in off-diagonal stress components. FLOW OF A FALLING FILM FLOW OF A FALLING FILM Rate of momentum in across surface at x (momentum transport due to viscosity) (LW)(τxz)|x Rate of momentum out across surface at x+∆x (momentum transport due to viscosity) (LW)(τxz)|x+∆x Rate of momentum in across surface at z = 0 (due to fluid motion) Rate of momentum out across surface at z = L (due to fluid motion) Gravity force acting on fluid (W∆xvz)(ρvz)|z=0 (W∆xvz)(ρvz)|z=L (LW∆x)(ρg cosβ) FLOW OF A FALLING FILM 0 0 (LW)(τxz)|x - (LW)(τxz)|x+∆x + (W∆xvz)(ρvz)|z=0 - (W∆xvz)(ρvz)|z=L + (LW∆x)(ρg cosβ) = 0 If the equation is divided by LW∆x and if ∆X is infinitely smallÆ lim ∆Χ → 0 τ xz x + ∆x - τ xz ∆X x = d τ xz dx = ρ g cos β The equation is integrated to yield τxz = ρgx cosβ + C1 This equation gives the momentum flux or alternatively the shear-stress distribution. FLOW OF A FALLING FILM The equation is integrated to yield τxz = ρgx cosβ + C1 How to find the value of the integration constant, C1? Use Boundary Condition(s) !!! At x = 0, τxz = 0 Æ C1 = 0 The momentum flux is τxz = ρgx cosβ FLOW OF A FALLING FILM If the fluid is Newtonian and laminar then τxz = −η dvz / dx Substituting this expression for τxz, dvz / dx = - ρgx cosβ / η vz = - (ρg cosβ) x2 / 2η + C2 Use Boundary Condition(s) to determine the integration constant!!! At x = δ, vz = 0 Æ C2 = (ρg cosβ) δ2 / 2η ∴the velocity distribution is vz = [(ρgδ2cosβ) / 2η] [1−(x/δ)2] PARABOLIC FLOW OF A FALLING FILM The maximum velocity vzmax = (ρgδ2cosβ) / 2η The average velocity 2 2 x g 1 ρ g δ cos β ρ δ cos β v z = ∫ v z dx = 1 − dx = ∫ δ 0 2η 3η 0 δ δ δ The volume flow rate, Q, ρ gW δ 3 cos β Q = v z (W δ ) = 3η
