In this study a relation between the Laplace transform and the generalized Hankel-Clifford transform is established. The relation between distributional generalized Hankel-Clifford transform and distributional one sided Laplace transform is developed. The results are verified by giving illustrations. The relation between fractional Laplace and fractional generalized Hankel-Clifford transformation is also established. Further inversion theorem considering fractional Laplace and fractional generalized Hankel-Clifford transformation is proved in Zemanian space.
In this paper, two integers with two radices and the sum of the integers in the mixed radix form is represented. In the second part of the paper, more than two radices are taken and obtained the sum of the integers. Also a MATLAB code is generated to obtain the mixed radix form of the number. The extension of the same procedure is done for n-integers and nradices. The application of the mixed radix system is used in signal, image processing for data compression and many other computer applications.
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