Abstract:
This study focused on solving Fuzzy wave equation by using Fuzzy Double Laplace Transform
method. Fuzzy wave equations focused a major role in various areas of sciences such as mathe matics, physics, statistics, engineering and social sciences. These are important for studying and
solve a large proportion of the problems in many topics in applied mathematics. Usually in many
applications all the system’s parameters are represented by fuzzy rather than crisp numbers, and
hence it is important to develop mathematical models and analytical procedures that would appro priately treat general fuzzy Laplace Transform Method (FLTM) and solve them. The fuzzy laplace
transform techniques for resolving fuzzy wave equations are examined in this work. These analyt ical techniques have been described and solved. By resolving several problem of effective of fuzzy
wave equation was solved non-linearity FWE of the derivative dominating crisp coefficient non linear from the corresponding FWE equation. Based on the analytical findings, it is clear that the
suggested approaches are effective to solve FWE and provide precise answer. Consequently, the
researcher deduced that the suggested techniques have great potential more effective to solve potent
than alternative Fuzzy Double Laplace Transform approaches in terms of yielding relatively modest
errors.
