Dodatkowe przykłady dopasowywane są do haseł w zautomatyzowany sposób - nie gwarantujemy ich poprawności.
Perhaps the most important example of a vector space is the following.
Let to be a basis of as an vector space.
Then, the complex numbers themselves clearly form a vector space.
Here one is working with a vector space over the complex numbers.
Let C be a set in a real or complex vector space.
It is true that every vector space has a basis.
One must also consider the type of field over which the vector space is defined.
Let V be any vector space over the complex numbers.
The Lie group acts on the vector space in a natural way.
See vector space for the definitions of terms used on this page.
A vector space is an external ring over a field.
As it stands, V is only a real vector space.
Let S be a vector space over the real numbers, or, more generally, some ordered field.
The real numbers with the usual order is an ordered vector space.
Suppose is a vector space over a field of characteristic 0.
More formally, a vector space is a special combination of a group and a field.
Therefore is a vector space over Z, the field with two elements.
Let be a field and a vector space over .
A vector space over the complex numbers of dimension 2n r.
The real number vector space 'R'3 has as a spanning set.
This means that all the properties of the vector space are satisfied.
Arrays take Vector space in the number of elements they hold.
The norm is a continuous function on its vector space.
There is an analogy with the theory of vector space dimensions.
Elements of the vector space can also be analyzed statistically.