Abstract:
Flow in a closed conduit is regarded as open channel flow, if it has a free surface.
This study considers unsteady non-uniform open channel flow in a closed conduit
with circular cross-section. We investigate the effects of the flow depth, the cross
section area of flow, channel radius, slope of the channel, roughness coefficient
and energy coefficient on the flow velocity as well as the depth at which flow
velocity is maximum. The Saint-Venant partial differential equations of continuity
and momentum governing free surface flow in open channels are highly nonlinear
and therefore do not have analytical solutions. The Finite Difference
Approximation method is used to solve these equations because of its accuracy,
stability and convergence. The results are presented graphically. It is established
that for a given flow area, the velocity of flow increases with increasing depth and
that the velocity is maximum slightly below the free surface. Moreover, increase in
the slope of the channel and energy coefficient leads to an increase in flow velocity
whereas increase in roughness coefficient, flow depth, radius of the conduit and
area of flow leads to a decrease in flow velocity.
