Getting analytical and mathematical solutions for issues involving difficult geometries, loading and material properties, it is usually unacceptable. Analyticalsolutions that are given by a location in a body. This analyticalsolution usually needs standard or partial differential equations that are not obtained. Hence there is the need to rely on numerical strategies, like finite component strategies for acceptable solutions. Most sensible issues involve sophisticated domains (both material and material constitution), hundreds and non-linearities that forbid the event of analytical solutions exploitation numerical strategies. A numerical method, with the arrival of computer, is often used for the investigation and analysis of the results of varied parameters of the system on analyzed. It is price effective and saves time and material resources compared to the multitude of physical experiments required to realize a similar level of the understanding. The ability of numerical strategies and electronic computation, make incorporation of all relevant options during a mathematical model of a physical method not attainable without fear concerning its solutions by precise means. Those who are fast to use a computer program rather than think about the problem to be analyzed may find it difficult to interpret the input file to the computer program, a decent understanding of the underlyingtheoiy of the matter still as numerical methodology is needed.