## Profil

###### À propos

The MULTIINT command enables you to numerically evaluate an integral with any number of integrands and the number of integration regions, using the default error bounds for the results. It can be applied to ordinary, periodic, or infinitely repeatable functions with any prescribed number of integrands. The MULTIINT command is used with the OMNIINT, PPERIINT, and POWERINT commands, and with the SIMPINT and EXPINT commands. You may define the integration limits, exponents, periods, and/or amplitude of each integrands using any of the following method: Press DEFINES and define INTEGRANDS, INTEGRATIONS, INTEGRATIONREGS, INTEGRATIONSREGMS, INTEGRATIONSBOUNDARY, EXPERIMENTALS, DEFAULTBOUNDS, and INTEGRAINTERNALS (if none of these optional options is specified, the default values are used). Press DEFINE, ENTER, and define the required constants. For further information on the process of defining constants and constraints, see the help file MULTIINT.H. Examples: Step 1: DEFINE INTEGRATIONSREGMS(3,6,4) and define the limits and amplitudes of each integrand. Step 2: NOMULTIINT, NOMULTIINT, NOMULTIINT, OMNIINT, and OMNIINT Step 3: Omni(0,8), Omni(1,9), Omni(2,10), Omni(3,6), Omni(4,7) and Omni(5,8) Numerical Solutions Library : This collection has programs in which the ordinary differential equations, systems of equations and the integrals are solved using the following four main approaches: Using Mathematical Implicits Creating IMPLICIT functions Using Linearization Using the MANIPULATION language. In addition to these, the IMPLICIT is defined as a superclass of the IMPLICIT function which makes it possible to implement the functions WITHOUT Linearization, Linearization of Systems of Equations and Manipulation. In some applications that is not possible. The IMPLICIT class contains the following subclasses: Without Linearization With Linearization Without Linearization of Systems of Equations Solver, SolverIntegral, SolverUserDefined, Solver a5204a7ec7

The idea behind integrating more than one function is simple. We will see that in most cases, if the functions are independent, the solution of one function with respect to time will automatically yield the solution of any function with respect to the same parameter. In such case, the integration itself is relatively easy and often is done using some form of integration by parts. However, there are cases where a nonlinear function depends on a function that is integrated with respect to some parameter. In such cases, we would need to employ the following trick in order to compute the integration. Let y= f(x,y(t)) be a function and g(x, t) = x y(t) be another function. Let us integrate this function and define G(x, t) = x f(x,y(t)) - x y(t) = u(x, t) + p(x, t) . Then, we can see that u(x, t) = x f(x, y(t)) and p(x, t) = x y(t) - x f(x, y(t)) . An attempt can now be made to integrate this expression and we are now back to the previous case. In case of linear dependency, it is sufficient to scale the dependent variable by a factor and the integration of g can be computed using the same arguments. A comprehensive literature review can be found in the Technical bulletin on Differential Equations and their Applications: FDM Proceedings, Volume 2, Number 3, April 2010. The Mixed Series Description: In case of Multiple Integration, the specification of the constants is generally very important. The Mixed Series program will use the bounds on these constants to decide the size and type of the series and it will determine the number of terms required to attain the specified error. A comprehensive literature review can be found in the Technical bulletin on Differential Equations and their Applications: FDM Proceedings, Volume 2, Number 3, April 2010. The Mathematics Miscellany: A common need among students of Mathematics is to convert a real value to another base such as binary, octal, or hexadecimal. As an example, a student of Mathematics may wish to know how large a 32 bit integer is in binary, or how many times this value is repeated in 24 hour time (which is equal to 72 decimal). We have developed a program, M

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