Abstract
Among many contributions to science, Pierre-Simon Laplace developed his famous Transform as Jean-Baptiste Joseph Fourier with his very famous Fourier Transform. In this article a method is presented to easily solve the Fourier and Laplace Transform and their inverses. This General Formula is applicable to integrals that contain an exponential function multiplied by a derivable Function. Functions such as the Normal, Gamma and Beta could be solved too with some mathematical artifices. The methodology is presented step by step in this article.
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