Abstract
The effect of temperature dependent viscosity on laminar mixed convection boundary layer flow and heat transfer on a continuously moving vertical surface is studied. The fluid viscosity is assumed to vary as an inverse linear function of temperature. Local similarity solutions are obtained for the boundary layer equations subject to isothermally moving vertical surface with uniform speed. The effect of various governing parameters, such as Prandtl number
Pr, the mixed convection parameter
λ
=
S
Gr
x
/
Re
x
2
, and the viscosity/temperature parameter
θ
r
which determine the velocity and temperature distributions, the local heat transfer coefficient, and the local shear stress coefficient at the surface are studied. Significant changes are obtained in dimensionless local heat transfer and shear stress coefficient at the surface when the magnitude of
θ
r
has small values for each
λ. Critical values of
λ are obtained for predominate natural convection and buoyancy shear stress for assisting and opposing flow for various
θ
r
.