Xxx ferdi 2014

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National Nanotechnology Initiative: research and development FY 2002. Key words: Chebyshev-collocation, Integrodifferentials, Trial solution Reference 1. and Xufeng S., (2009) Numerical solution of Integro-differential equations by using CAS wavelets operational matrix of integration., Applied math. In the mid-term, biotechnology will make possible even more remarkable advances in molecular medicine including microbiological engineered organisms. Abstract: Nanomedicine is the process of diagnosing, treating, and preventing disease and traumatic injury, of relieving pain, and of preserving and improving human health, using molecular tools and molecular knowledge of the human body. The behaviour of solution for different degrees (N) of the trial solution is carefully studied and illustrative examples are included to demonstrate the validity and applicability of the techniques. Abstract: In this paper, we consider the solution of first and second order Linear integro-differential by the use of trial solution formulated as Chebyshev form of Fourier cosine series. Brunner,(2004), Collocation methods for Volterra Integral and related Functional Differential equations, Cambridge University Press, Cambridge UK. The formulation was also found to be feasible for the regular production.

A Nik long (2009) Legendre multi-wavelets direct method for linear integrodifferengial equations, Applied maths sciences, vol. The aim of nanomedicine is the improvement of healthcare for the benefit of the patient. Nanomedicine ranges from the medical applications of nanomaterials to nanoelectronic biosensors and even possible future applications of molecular nanotechnology. Nanotechnology: convergence with modern biology and medicine. Development of biosensors for cancer clinical testing.

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