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說明 | 1 online resource (46 pages) |
文字 | text |
無媒介 | computer |
成冊 | online resource |
附註 | Source: Masters Abstracts International, Volume: 81-12 |
| Advisor: O'Connor, Brian M |
| Thesis (M.S.)--Tennessee Technological University, 2020 |
| Includes bibliographical references |
| In this thesis, we will explore approximating convolution integrals for Laplace and exponential Fourier transformations. For Laplace transforms, we will use the composite Simpson's Rule to make approximations firstly for convolutions with known results to compare and provide validity and then again for some without known results. For the exponential Fourier type, we first use the composite Simpson's Rule on a known result using different methods (two changes of variable and truncation) and compare to the known results to validate using the methods for convolution integrals without known results. Then, we will compare all methods per integral together |
| Electronic reproduction. Ann Arbor, Mich. : ProQuest, 2021 |
| Mode of access: World Wide Web |
主題 | Applied mathematics |
| Mathematics |
| Approximating convolution integrals |
| Electronic books. |
| 0364 |
| 0405 |
ISBN/ISSN | 9798645473655 |