06-240/Term Test: Difference between revisions

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The Test

Front Page

• No outside material other than stationary and a basic calculator is allowed.
• We will have an extra hour of class time in our regular class room on Thursday, replacing the first tutorial hour.
• The final exam date was posted by the faculty - it will take place on Wednesday December 13 from 2PM until 5PM at room 3 of the Clara Benson Building, 320 Huron Street (south west of Harbord cross Huron, home of the Faculty of Physical Education and Health).

Questions Page

Solve the following 5 problems. Each of the problems is worth 20 points. You have an hour and 45 minutes.

Problem 1. Let ${\displaystyle F}$ be a field with zero element ${\displaystyle 0_{F}}$, let ${\displaystyle V}$ be a vector space with zero element ${\displaystyle 0_{V}}$ and let ${\displaystyle v\in V}$ be some vector. Using only the axioms of fields and vector spaces, prove that ${\displaystyle 0_{F}\cdot v=0_{V}}$.

Problem 2.

1. In the field {\mathbb C} of complex numbers, compute ${\displaystyle {\frac {1}{2+3i}}+{\frac {1}{2-3i}}}$      and     ${\displaystyle {\frac {1}{2+3i}}-{\frac {1}{2-3i}}}$.
2. Working in the field ${\displaystyle {\mathbb {Z} }/7}$ of integers modulo 7, make a table showing the values of ${\displaystyle a^{-1}}$ for every ${\displaystyle a\neq 0}$.

Problem 3. Let ${\displaystyle V}$ be a vector space and let ${\displaystyle W_{1}}$ and ${\displaystyle W_{2}}$ be subspaces of ${\displaystyle V}$. Prove that ${\displaystyle W_{1}\cup W_{2}}$ is a subspace of ${\displaystyle V}$ iff ${\displaystyle W_{1}\subset W_{2}}$ or ${\displaystyle W_{2}\subset W_{1}}$.

Problem 4. In the vector space ${\displaystyle M_{2\times 2}({\mathbb {Q} })}$, decide if the matrix ${\displaystyle {\begin{pmatrix}1&2\\-3&4\end{pmatrix}}}$ is a linear combination of the elements of ${\displaystyle S=\left\{{\begin{pmatrix}1&0\\-1&0\end{pmatrix}},\ {\begin{pmatrix}0&1\\0&1\end{pmatrix}},\ {\begin{pmatrix}1&1\\0&0\end{pmatrix}}\right\}}$.

Problem 5. Let ${\displaystyle V}$ be a finite dimensional vector space and let ${\displaystyle W_{1}}$ and ${\displaystyle W_{2}}$ be subspaces of ${\displaystyle V}$ for which ${\displaystyle W_{1}\cap W_{2}=\{0\}}$. Denote the linear span of ${\displaystyle W_{1}\cup W_{2}}$ by ${\displaystyle W_{1}+W_{2}}$. Prove that ${\displaystyle \dim(W_{1}+W_{2})=\dim W_{1}+\dim W_{2}}$.

Solution Set

Students are most welcome to post a solution set here.

1. ${\displaystyle 0_{F}\cdot v=(0_{F}+0_{F})\cdot v}$ (by F3)

  ${\displaystyle (0_{F}+0_{F})\cdot v=0_{F}\cdot v+0_{F}\cdot v}$ (by VS8)
  By VS4, ${\displaystyle \exists \ (0_{F}\cdot v)'s.t.(0_{F}\cdot v)+(0_{F}\cdot v)'=0_{V}}$
  Add ${\displaystyle (0_{F}\cdot v)'}$ to both sides of ${\displaystyle 0_{F}\cdot v=0_{F}\cdot v+0_{F}\cdot v}$
  ${\displaystyle (0_{F}\cdot v)'+(0_{F}\cdot v)=[(0_{F}\cdot v)'+0_{F}\cdot v]+0_{F}\cdot v}$
  ${\displaystyle 0_{V}=0_{V}+0_{F}\cdot v}$ (by construction)
  ${\displaystyle 0_{V}=0_{F}\cdot v}$ (by VS3)