Nanomedicine can offer impressive resolutions for various life threatening diseases in child (nano drug addicted next generation). Monteiro-Riviere NA, Nemanich RJ, Inman AO, Wang YYY, Riviere JE. Saner: Composing Static and Dynamic Analysis to Validate Sanitization in Web Applications.  Karl Forster, Lockstep Systems, Inc., "Why Firewalls Fail to Protect Web Sites," webagain/why-firewalls-fail.pdf, 2007. Ristic, "Web Application Firewalls Primer," (IN)SECURE, vol. Nanomedicine is an important and rapidly growing field, which is emerging from the application of nanotechnology to healthcare. Van Der Houwen, (1986) The Numerical Solution of Volterra Equations, C. Zau, (2006), hp Discontinuous Galerkin time-stepping for volterra integro-differential equations, SIAM J. For example com/cgi-bin/admin.jsp~ returns source code. Here hacking attempts that every serious business application should be able  B. Key words: DNA, Nanomedicine, nanoparticles, nanotubes, nanobiosensor, nanorobotics, nanomaterials Reference 1. Carbon nanotubes protect DNA strands during cellular delivery. Multiwalled carbon nanotube interactions with human epidermal keratinocytes. Nanomedicine is defined as the monitoring, repair, construction and control of human biological systems at the molecular level, using engineered nanodevices and nanostructures. In the longer term, perhaps 10–20 years the earliest molecular machine systems and nanorobots may join the medical armamentarium, finally giving physicians the most potent tools imaginable to conquer human disease, ill-health, and aging.
Hence, the best solution would be to finds the steps to solve that are web-based (firewall) independent for protecting against vulnerabilities in web applications. 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. 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.