Abstract
In general the growth of fungi needs to be resolved until its goal becomes a correction and thus, we minimize cost, effort, time and money. There-fore, we arrived at a mathematical solution using some techniques. In this paper, we studied its growth behavior and the effect of each branch on the fungus, then we combined a number of branches represented as mathematical model as partial differential equations (PDEs), approximate numerical solutions, and some math-ematical steps, such as non-dimensionalisation, finding stability or steady state and representing it on phase plane, we found approximate results for these types using MATLAB’s codes such as Pplane8 and Pdepe [1,7].
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