Math 361, Spring 2017, Assignment 9
From cartan.math.umb.edu
Carefully define the following terms, then give one example and one non-example of each:
- Vector space (over a field $F$).
- Subspace (of a vector space).
- Subspace generated (a.k.a. spanned) by a set $S$.
- Linear relation (in a set $S$).
- Linearly independent.
- Basis.
- $\mathrm{dim}_F V$ (a.k.a. the dimension of $V$ over $F$).
- $[E:F]$ (a.k.a. the degree of $E$, regarded as an extension of $F$).
Carefully state the following theorems (you do not need to prove them):
- Theorem concerning the existence of bases.
- Theorem relating the cardinalities of two bases for the same vector space.
- Theorem relating bases to unique expansion of vectors as linear combinations.
- Dimension Formula.
- Corollary of the Dimension Formula analogous to Lagrange's Theorem in group theory.
- Corollary concerning subextensions of field extensions of prime degree.
- Theorem characterizing algebraic elements in terms of finite-dimensional subextensions.
- Theorem concerning sums, products, and inverses of algebraic elements.
Solve the following problems:
- Section 30, problems 1, 4, 5, 6, 7, and 8.
- Section 31, problems 1, 3, 5, 7, 22, 23, 24, 25, and 29.
Questions
The first homework question talks about bases for $\mathbb{R}^2$ no two of which have a vector in common. I am not sure where to start to find the three bases. Is the next several question ask a given basis for the indicated vector space over the field. Not sure where to start, with those questions.
