The flow of three-dimensional drops suspended in an inclined channel is studied by numerical simulations at non-zero Reynolds numbers. The flow is driven by the acceleration due to gravity and there is no pressure gradient in the flow direction. The equilibrium position of a drop is studied as a function of the Reynolds number, the Bond number, the inclination angle and the viscosity ratio. More deformable drops reach a steady state equilibrium position that is farther away from the channel floor. The equilibrium position moves away from the channel floor as the Reynolds number is raised. The slip velocity increases as the Reynolds number is raised. The same trend is observed when the inclination angle with respect to horizontal direction increases. The equilibrium position moves toward the channel floor as the viscosity ratio is raised. Simulations of nine drops in a channel, show that is an inverse relationship between fluctuation energy and distribution of drops. The effect of the Reynolds number, the Bond number, the viscosity ratio and the inclination angle on the distribution of drops and the fluctuation energy across the channel are investigated. It is found that drops tend to stay away from the channel floor, when the inclination angle with respect to horizontal direction increases. Drops that are more deformable will further stay away from the channel floor. The fluctuation energy across the channel increases as the Bond number is raised. Simulations at large viscosity ratios show that drops behave like rigid particles. Keywords: Reynolds number, Bond number, Viscosity ratio, inclination angle, Equilibrium position, Fluctuation energy, Slip velocity, Density drop distribution