Abstract
Population dynamics is the branch of mathematics that studies the size and age composition of populations as dynamical systems, the biological and environmental processes driving them such as birth and death rates and by immigration and emigration. In this paper, We are discussed how to read mathematical models and how to analyze them with the ultimate aim that we can critically judge the assumptions and the contributions of such models whenever we encounter them in your future biological research. Mathematical models are used in all areas of biology. All models in this paper are formulated in ordinary differential equations (ODEs). These will be analyzed by computing steady states. We developed the differential equations by ourselves following a simple graphical procedure, depicting each biological process separately. Experience with an approach for writing models will help us to evaluate models proposed by others.
How to cite this paper
Comparing theoretical and practical solution of the first order first degree ordinary differential equation of Population model
Abdullah Bin Masud1, Foyez Ahmed1
1Department of Computer Science & Engineering, Shanto-Mariam University of Creative Technology, Dhaka-1230, Bangladesh
Corresponding author: Abdullah Bin Masud, Department of Computer Science & Engineering, Shanto-Mariam University of Creative Technology, Dhaka-1230, Bangladesh
How to cite this paper: Masud, A.B. & Ahmed, F. (2018) Comparing theoretical and practical solution of the first order first degree ordinary differential equation of Population model. Journal of Applied Mathematics and Computation, 2(2), 58-66.
http://dx.doi.org/10.26855/jamc.2018.02.004
