This paper presents a deterministic compartmental model of (SLIRBP) to investigate the activities of bacteriophage on the growth of vibrio-cholera. The model which incorporated the growth rate of vibrio- cholera was analyzed mathematically. It shows that the model has a disease free equilibrium (DFE) which is locally asymptotically stable whenever the associated reproduction number of the model is less than unity. We solved the model numerically using Runge-Kutta of order (4). It is shown that as growth rate of the virus increases in the population with phage virus, the recovered population increases, while the infected and exposed population decreases.The results were presented graphically
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