Conservative Vector Field
Vector calculus, Vector field, Gradient, Function (Mathematics), Scalar potential
978-620-0-01710-9
6200017107
80
2011-12-26
34.00 €
eng
https://images.our-assets.com/cover/230x230/9786200017109.jpg
https://images.our-assets.com/fullcover/230x230/9786200017109.jpg
https://images.our-assets.com/cover/2000x/9786200017109.jpg
https://images.our-assets.com/fullcover/2000x/9786200017109.jpg
Please note that the content of this book primarily consists of articles available from Wikipedia or other free sources online. In vector calculus a conservative vector field is a vector field which is the gradient of a function, known in this context as a scalar potential. Conservative vector fields have the property that the line integral from one point to another is independent of the choice of path connecting the two points: it is path independent. Conversely, path independence is equivalent to the vector field being conservative. Conservative vector fields are also irrotational, meaning that they have vanishing curl.
https://morebooks.shop/books/gb/published_by/lect-publishing/189870/products
Theory of probability, stochastics, mathematical statistics
https://morebooks.shop/store/gb/book/conservative-vector-field/isbn/978-620-0-01710-9