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Full-Text Articles in Education
The Human Computer Interaction Issues Associated With The Creation Of Personalized Role Playing Simulations, Eileen O'Donnell, Catherine Mulwa, Mary Sharp, Vincent Wade
The Human Computer Interaction Issues Associated With The Creation Of Personalized Role Playing Simulations, Eileen O'Donnell, Catherine Mulwa, Mary Sharp, Vincent Wade
Eileen O'Donnell
The human computer interaction issues associated with the creation of personalized role playing simulations are discussed in this paper. This paper is aimed at those who are interested in building authoring applications which enable educators to build role playing simulated e-learning resources to use with their students. One of the main issues which have come to our attention is that many learning designers and educators do not understand what exactly it is we are trying to achieve by creating personalized role playing simulations. Also, how to gauge the pedagogic merits which can be achieved by using these e-learning resources. Potential …
Book Review Of Global Perspectives On Adult Education, Deborah K. Sterner
Book Review Of Global Perspectives On Adult Education, Deborah K. Sterner
Deborah K Sterner
No abstract provided.
Working Themselves Out Of A Job (They Hope) By Enabling Sustainable Change, Leah Neubauer
Working Themselves Out Of A Job (They Hope) By Enabling Sustainable Change, Leah Neubauer
Leah C. Neubauer
No abstract provided.
Preventing Hiv By Teaching Life Skills, Leah Neubauer
Preventing Hiv By Teaching Life Skills, Leah Neubauer
Leah C. Neubauer
No abstract provided.
Approximate Solution Of Fractional Integro-Differential Equations By Taylor Expansion Method, Li Huang
Approximate Solution Of Fractional Integro-Differential Equations By Taylor Expansion Method, Li Huang
Li Huang
In this paper, Taylor expansion approach is presented for solving (approximately) a class of inear fractional integro-differential equations including those of Fredholm and of Volterra types. By means of themth-order Taylor expansion of the unknown function at an arbitrary point, the linear fractional integro-differential equation can be converted approximately to a system of equations for the unknown function itself and its m derivatives under initial conditions. This method gives a simple and closed form solution for a linear fractional integro-differential equation. In addition, illustrative examples are presented to demonstrate the efficiency and accuracy of the proposed method.