Tags: PDE

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  1. Fernando Miranda-Mendoza

    https://www.simiode.org/members/5427

  2. 9-002-S-GroundWaterFlow

    31 Aug 2020 | | Contributor(s):: Jeremy Cristman, Kenneth Luther, Michael Karls

    The goals of this project are to compare a conceptual one-dimensional groundwater flow model to observations made in a laboratory setting, and to discuss the differences. We derive the initial groundwater flow equation, and guide students through a solution. We describe the laboratory set up and...

  3. 9-005-S-InvasiveSpeciesModel

    08 Aug 2019 | | Contributor(s):: Eric Stachura

    This scenario takes students through the development of an invasive species partial differential equation model. Basic models are discussed first, which lead students to eventually develop their own model which takes into account dispersion. Students will explore various Mathematica modules...

  4. Mohammad Ali Ahmadpoor

    I am Ph.D in Mathematics (Harmonic Analysis) who is compatible with Team Works and used to be a Teacher, Educational Consultant and Researcher. I need to be involved in Team Work about Researching...

    https://www.simiode.org/members/3273

  5. 9-001-Text-S-SkinBurnModelNumericalMethods

    18 Aug 2018 | | Contributor(s):: Suruchi Singh

    The heat equation is an important partial differential equation (PDE) which describes the distribution of heat in a given region over time. Here we learn to solve a heat equation numerically. It is difficult to study the behavior of temperature in problems with interfaces analytically so...

  6. 2016-Ghaddar, C. K. - Excel Advanced Solver for Partial Differential Equations

    25 May 2017 | | Contributor(s):: Chahid Ghaddar

    We offer an illustration of PDASOLVE() an Excel Advanced Solver for Partial Differential Equations by Chahid Ghaddar of ExcelWorks (cghaddar@excel-works.com ) along with two articles concerning use of the software. ExcelWorks is in the greater Boston MA USA area and one may read about the author...

  7. 9-012-S-PDEGuitarTuning

    04 Jun 2015 | | Contributor(s):: Brian Winkel

    We present a derivation of  a partial differential equation which models the motion of a string held at both ends, a case of the one-dimensional wave equation. We immediately offer  numerical solutions in a computer algebra system (we use Mathematica, but any...