NUMERICAL SOLUTION TO MATHEMATICAL MODELS OF INFECTIOUS DISEASES
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Abstract
The Dynamics of infectious diseases are vital in the disease control in populations. The mathematical methods that describe these diseases models often are insoluble hence, the need for numerical approximations. Stage two Runge-Kutta methods are used to integrate the system of differential equations that evolves in the model formulation of the infectious diseases being studied.
The stability analysis of Runge-Kutta method is done using boundary bars plot. The solution and plots are carried out using MATHEMATICA program.
The stability analysis of Runge-Kutta method is done using boundary bars plot. The solution and plots are carried out using MATHEMATICA program.
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