![]() ![]() The book contains a detailed account of numerical solutions of differential equations of elementary problems of physics using Euler and second order Runge-Kutta methods and Mathematica 6.0. Differentiation and integration using Mathematica.Ħ.4. Solution of a system of linear equations using Mathematica.Ħ.3. Dealing with complex numbers using Mathematica.Ħ.2. Miscellaneous use of Mathematica in computational physics.Ħ.1. ![]() ![]() ![]() The Runge-Kutta solution of radioactive decay law using Mathematica 6.0Ħ. Euler solution of radioactive decay law using Mathematica 6.0.ĥ.3. The differential equation for radioactive decay.ĥ.2. Radioactive decay : numerical solution of differential equations using Euler and second order Runge-Kutta methods using Mathematica.ĥ.1. Runge-Kutta solution of damped harmonic oscillation using Mathematica 6.0ĥ. Euler solution of damped harmonic oscillation using Mathematica 6.0.Ĥ.3. Damped harmonic oscillator : the differential equations of motion.Ĥ.2. Damped harmonic oscillator : numerical solution of differential equations using the Euler and second order Runge-Kutta methods using Mathematica.Ĥ.1. Runge-Kutta solution of simple harmonic oscillation using Mathematica 6.0Ĥ. Euler solution of simple harmonic oscillation using Mathematica 6.0.ģ.3. Motion under Hooke's law force : the differential equations of motion.ģ.2. Simple harmonic oscillator : numerical solution of differential equations using the Euler and second order Runge-Kutta methods using Mathematica.ģ.1. Runge-Kutta solution of free fall using Mathematica 6.0ģ. Euler solution of free fall using Mathematica 6.0.Ģ.3. Motion under constant force : the differential equations of motion.Ģ.2. Motion under constant force : numerical solution of differential equations using Euler and second order Runge-Kutta methods using Mathematica.Ģ.1. Second order Runge-Kutta solution of the differential equationĢ. Euler solution of differential equation.ġ.2. Numerical solution of differential equations using Euler and second order Runge-Kutta methods.ġ.1. ![]()
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