Mine is 10 minus one minus two minus one, 235 78 times the generic victor. And so he would put the first vector we want on 45 69 three minus two, one for minus one. The comes of this, this the rows of these matrix of coefficients are made by the vectors B one, B, two, B three. And in the matrix representation of the system, what we have is that the matrix of coefficients is formed by the counts of? Uh huh. So this translates to solve a system of linear equations. So that means that this vector X satisfy the condition that X. Then this vector we would we only need to to use the generators is enough to use the generators of this based off of you because well all all all the vectors will be greeted as a linear combinations of these four vectors here. What we need to consider here is a generic vector X. So the point of this exercise is to first we need to find two pictures that generated space and then check if those are linear in the so to do that. The view, this definition of our tonality means that X. Will be any vector in this case in our five that satisfy the condition that X is orthogonal to be for all the B. So let's remember the definition for the eternal compliment. So um here we got these four vectors and we know that they expand this space. And what we need to do is find the or the basis for the eternal compliment. So these vectors will generate and will span the super space dog of our five. So for this exercise we got 54 vectors in R.
0 Comments
Leave a Reply.AuthorWrite something about yourself. No need to be fancy, just an overview. ArchivesCategories |