PDF4PRO ⚡AMP

Modern search engine that looking for books and documents around the web

Example: tourism industry

Problems and solutions - MIT Mathematics

CHAPTER 5 Problems and solutions1. Problems Chapter from first principles that ifVis a vector space (overRorC) then for any setXthe space( )F(X;V) ={u:X V}is a linear space over the same field, with pointwise operations . a vector space andS Vis a subset which is closedunder addition and scalar multiplication:( )v1,v2 S, K= v1+v2 Sand v1 SthenSis a vector space as well (called of course a subspace). Vbe a linear subspace of a vector space show that therelation onV( )v1 v2 v1 v2 Sis an equivalence relation and that the set of equivalence classes, denoted usuallyV/S,is a vector space in a natural case you do not know it, go through the basic theory offinite- dimensional vector spaces. Define a vector spaceVto be finite-dimensionalif there is an integerNsuch that anyNelements ofVare linearly dependent ifvi Vfori= 1.

Problem 5.3. If SˆV be a linear subspace of a vector space show that the relation on V (5.3) v 1 ˘v 2 ()v 1 v 2 2S is an equivalence relation and that the set of equivalence classes, denoted usually V=S;is a vector space in a natural way. Problem 5.4. In case you do not know it, go through the basic theory of nite-dimensional vector spaces.

Loading..

Tags:

  Problem, Dimensional

Information

Domain:

Source:

Link to this page:

Please notify us if you found a problem with this document:

Spam in document Broken preview Other abuse

Transcription of Problems and solutions - MIT Mathematics

Related search queries