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HLAVIČKOVÁ, I. PIDDUBNA, G.
Product type
software
Abstract
A scalar potential of a vector field F is a scalar function f such that grad(f)=F. The potential of a vector field is in a close relationship with the independence of the oriented line integral on the integration path. Namely, if F is a conservative (potential) vector field, i.e. if it has a potential, then the line integral of F does not depend on the integration path but only on the end points of the line. This means that the work done when moving a particle from a point A to a point B is independent of the path chosen. A vector field is conservative if it has a zero rotation. The potential has a great importance in the description of electric and magnetic fields. With help of our program, the scalar vector potential of a given vector field F is computed. The vector field can be two or three-dimensional. First, it is verified that F is conservative. Then the potential is found. Finally, the user can evaluate line integrals of F with help of the potential.
Keywords
vector field potential, line integral
Create date
30. 6. 2012
Location
Server UMAT FEKT VUT v Brně, Technická 8, 616 00 Brno
Possibilities of use
K využití výsledku jiným subjektem je vždy nutné nabytí licence
Licence fee
Poskytovatel licence na výsledek nepožaduje licenční poplatek
www
http://matika.umat.feec.vutbr.cz/software/maplenet/ScalarPotentialOfVectorField.html