Search engine for discovering works of Art, research articles, and books related to Art and Culture
Javascript must be enabled to continue!
Solutions of Ordinary Differential Equations using Differential Transform Method
View through CrossRef
Differential Transform Method is a semi-analytical numerical technique that depends on Taylor’s series for the resolution of ordinary Differential Equations. This technique useful to obtain the series solutions of ordinary Differential Equations. Differential Transform method provides the solutions in the form of a polynomial. In this paper, we study Differential Transform Method , Its theorems, properties and examples. The Differential Transform method is a monotonous procedure for attaining the analytic solutions of ordinary Differential Equations
Science Research Society
Title: Solutions of Ordinary Differential Equations using Differential Transform Method
Description:
Differential Transform Method is a semi-analytical numerical technique that depends on Taylor’s series for the resolution of ordinary Differential Equations.
This technique useful to obtain the series solutions of ordinary Differential Equations.
Differential Transform method provides the solutions in the form of a polynomial.
In this paper, we study Differential Transform Method , Its theorems, properties and examples.
The Differential Transform method is a monotonous procedure for attaining the analytic solutions of ordinary Differential Equations.
Related Results
Research on a Class of First-Order Nonlinear Nonhomogeneous Variable Coefficient Ordinary Differential Equations Based on Elastic Transformation
Research on a Class of First-Order Nonlinear Nonhomogeneous Variable Coefficient Ordinary Differential Equations Based on Elastic Transformation
This paper mainly studies the problem of solving a class of first-order
nonlinear non-homogeneous ordinary differential equations with variable
coefficients, which can be transform...
Soham Transform in Fractional Differential Equations
Soham Transform in Fractional Differential Equations
Objectives: Soham transforms is one of the appropriate tools for solving fractional differential equations that are flexible enough to adapt to different purposes. Methods: Integra...
Pengaruh Motivasi Belajar dan Penguasaan Tata Bahasa terhadap Pemahaman Membaca Teks Eksplanasi Bahasa Indonesia Siswa SMA Negeri
Pengaruh Motivasi Belajar dan Penguasaan Tata Bahasa terhadap Pemahaman Membaca Teks Eksplanasi Bahasa Indonesia Siswa SMA Negeri
<p><span style="left: 189.033px; top: 857.126px; font-size: 16.6px; font-family: sans-serif; transform: scaleX(0.858626);">Penelitian ini bertujuan untuk mengetahui pen...
Mathematics in Chemical Engineering
Mathematics in Chemical Engineering
Abstract
The article contains sections titled:
...
Hybrid Integral Transform Techniques for the Solution of Third-Order Nonlinear Ordinary Differential Equations
Hybrid Integral Transform Techniques for the Solution of Third-Order Nonlinear Ordinary Differential Equations
Third-order nonlinear ordinary differential equations frequently arise in the mathematical modeling of complex engineering and physical phenomena; however, exact analytical solutio...
An operative approach to solve Homogeneous differential--anti-differential equations
An operative approach to solve Homogeneous differential--anti-differential equations
In this work, we extend the theory of differential equations through a
new way. To do this, we give an idea of differential–anti-differential
equations and dene ordinary as well as...
A New Integral Transform “Rishi Transform” with Application
A New Integral Transform “Rishi Transform” with Application
In this paper, authors propose a new integral transform “Rishi Transform” with application to determine the exact (analytic) solution of first kind Volterra integral equation (V.I....
Exploring a Novel Multi-Stage Differential Transform Method Coupled with Adomian Polynomials for Solving Implicit Nonlinear ODEs with Analytical Solutions
Exploring a Novel Multi-Stage Differential Transform Method Coupled with Adomian Polynomials for Solving Implicit Nonlinear ODEs with Analytical Solutions
In engineering, physics, and other fields, implicit ordinary differential equations are essential to simulate complex systems. However, because of their intrinsic nonlinearity and ...