Day 10: Linear Algebra

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Announcements:
- Your assignment returned:
  - 1.1bd, p. 38
  - 1.4
  - 1.8
    - Sorry: this was not stated too well. It was very confusing.
    - I want you to practice drawing vectors into the coordinate system.
    - Don't draw illegal axes.
- You have an assignment due today. I'll have it back, on my door, by tomorrow morning. Grading
  - 2.10be
  - 2.18
  - 2.26
- There will be a test this Friday, over the material of Chapter One.
Back to Section One.III.1 and III.2 for a recap: Linear systems.Reduced Echelon Form.Gauss-Jordan Reduction and Linear systems.Reduced Echelon Form.Row Equivalence
- Summary and major points:
  - The process of Gauss reduction is not-unique. However we have seen that it preserves the solution set of a linear system. Hence, every reduced augmented matrix system represents an equivalent system, from the standpoint of the solutions.
  - This section shows us how to reduce to a single elementary form (Gauss-Jordan form) that exposes the solution in a nice way.
  - Motivation: actually the first time Zach got up to solve a system, he reduced it all the way to Gauss-Jordan form -- to a diagonal matrix, containing just ones on the diagonal, and we noticed then that we could just read off the solution that way. That's what we're doing in this section -- just pushing on with our row-reductions until we get it in "Zach-form".
- Definitions of this section:
  - Gauss-Jordan reduction
    the matrix has only ones for leading entries in rows, and each leading one is alone in its column.
    In a way, it "represents" its column.
  - Gauss-Jordan reduction leads to an augmented system in reduced echelon form:
    - The solution can be just read off...
    - We can also see the dimension of the solution easily (back to Jenny's question regarding 2.29, p. 19) -- the example I gave was an example in Gauss-Jordan form.
    - But it requires more (and often unnecessary) arithmetic -- sometimes you just want to backsolve ASAP, and not sit around admiring your solution's "exposure"....
  - row equivalent matrices -- interchangeable by elementary row operations
  - row equivalence classes.
- Theorems (Lemmas only in the first section, and primarily lemmas in the second -- they're moving us toward proving a theorem -- 2.6 Theorem, p. 57: each matrix is row equivalent to a unique reduced echelon form matrix)
  - Elementary row operations are reversible.
  - Between matrices, "reduces to" is an equivalence relation.
    An equivalence relation is one such that
    1. A is equivalent to itself (reflective)
    2. A is equivalent to B iff B is equivalent to A (symmetric)
    3. If A is equivalent to B and B is equivalent to C, then A is equivalent to C (transitive)
  - (Linear Combination Lemma) A linear combination of linear combinations is a linear combination.
  - Where one matrix reduces to another, each row of the second is a linear combination of the rows of the first.
  - In an echelon form matrix, no nonzero row is a linear combination of the other rows.
  - If two echelon form matrices are row equivalent then the leading entries in their first rows lie in the same column. The same is true of all the nonzero rows -- the leading entries in their second rows lie in the same column, etc.
  - Here's the big theorem: Each matrix is row equivalent to a unique reduced echelon form matrix.
- Examples that illustrate the concepts in this section:
  - 1.7c, p. 51
  - 1.8c
  - 1.10
  - 1.11b
  - 2.10cd, p. 59
  - 2.12a
  - 2.16
  - 2.18b
  - 2.23
What questions do you have in preparation for the exam?
In Chapter Two, we begin to study a very general, abstract notion: a vector space. Our author makes a compelling argument that studying general things is sometimes better than studying specific things. And so we are going to study this general notion, the vector space.
- What is a vector space (over )?
  A vector space is given by a collection of axioms: statements that one accepts, without question. First of all, a vector space is
  1. a set of vectors, subject to
  2. two operations: ${+,\cdot}$ (vector addition and scalar multiplication).
  Now here are the rules:
  1. The set of vectors is closed under addition: that is, the sum of vectors from the set is again a vector in the set.
  2. Addition of vectors is commutative.
  3. Addition of vectors is associative.
  4. There is a zero vector in the set.
  5. There are additive inverses for each vector.
  6. The set of vectors is closed under scalar multiplication.
  7. Distributive laws apply:
    1. ${(r+s)\cdot\overline{v}=r\cdot\overline{v}+s\cdot\overline{v}}$ ,
    2. ${r\cdot(\overline{u}+\overline{v})=r\cdot\overline{u}+r\cdot\overline{v}}$ ,
  8. ${(rs)\cdot\overline{v}=r\cdot(s\cdot\overline{v})}$
  9. ${1\cdot\overline{v}=\overline{v}}$
- Now we want to look at some examples of vector spaces.
  - vectors! (in the sense that we've been studying vectors so far). Example 1.3, p. 78 verifies this.
  - functions
  - trivial vector space (with just one vector, the zero vector)
  - 2x2 matrices
- Examples:
  1. 1.18
  2. 1.19
  3. 1.20
  4. One lemma is proven in this section, and it's worth looking at: 1.17, p. 85.

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