14-240/Tutorial-November11

DBN: Classes: 2014-15: 14-240 / Navigation Welcome to Math 240! (additions to this web site no longer count towards good deed points) # Week of... Notes and Links 1 Sep 8 About This Class, What is this class about? (PDF, HTML), Monday, Wednesday 2 Sep 15 HW1, Monday, Wednesday, TheComplexField.pdf,HW1_solutions.pdf 3 Sep 22 HW2, Class Photo, Monday, Wednesday, HW2_solutions.pdf 4 Sep 29 HW3, Wednesday, Tutorial, HW3_solutions.pdf 5 Oct 6 HW4, Monday, Wednesday, Tutorial, HW4_solutions.pdf 6 Oct 13 No Monday class (Thanksgiving), Wednesday, Tutorial 7 Oct 20 HW5, Term Test at tutorials on Tuesday, Wednesday 8 Oct 27 HW6, Monday, Why LinAlg?, Wednesday, Tutorial 9 Nov 3 Monday is the last day to drop this class, HW7, Monday, Wednesday, Tutorial 10 Nov 10 HW8, Monday, Tutorial 11 Nov 17 Monday-Tuesday is UofT November break 12 Nov 24 HW9 13 Dec 1 Wednesday is a "makeup Monday"! End-of-Course Schedule, Tutorial F Dec 8 The Final Exam Register of Good Deeds Add your name / see who's in!

Boris

Useful Definitions

Let ${\displaystyle V}$ be a finite dimensional vector space over a field ${\displaystyle F}$, ${\displaystyle B=\{v_{1},v_{2},v_{3},...,v_{n}\}}$ be an ordered basis of ${\displaystyle V}$ and ${\displaystyle v\in V}$. Then ${\displaystyle v=\displaystyle \sum _{i=1}^{n}c_{i}v_{i}}$ where ${\displaystyle c_{i}\in F}$. Then the coordinate vector of ${\displaystyle v}$ relative to ${\displaystyle B}$ is the column vector ${\displaystyle {\begin{pmatrix}c_{1}\\c_{2}\\c_{3}\\...\\c_{n}\end{pmatrix}}}$.

Let ${\displaystyle W}$ be a finite dimensional vector space over the same field ${\displaystyle F}$ and ${\displaystyle K=\{v_{1},v_{2},v_{3},...,v_{m}\}}$ be an ordered basis of ${\displaystyle W}$. Define a linear transformation ${\displaystyle T:V\to W}$. Then ${\displaystyle T(v_{j})=\displaystyle \sum _{i=1}^{m}c_{ij}T(v_{j})}$ where ${\displaystyle c_{ij}\in F}$. Then the matrix representation of ${\displaystyle T}$ in the ordered bases ${\displaystyle B,K}$ is the matrix ${\displaystyle {\begin{pmatrix}c_{11}&c_{12}&c_{13}&...&c_{1n}\\c_{21}&c_{22}&c_{23}&...&c_{2n}\\c_{31}&c_{32}&c_{33}&...&c_{3n}\\c_{21}&c_{22}&c_{23}&...&c_{2n}\\...&...&...&...&...\\c_{m1}&c_{m2}&c_{m3}&...&c_{mn}\end{pmatrix}}}$.

Boris's Problems

Let ${\displaystyle B}$ be the standard ordered basis of ${\displaystyle P_{n}(F)}$ and ${\displaystyle K}$ be the standard ordered basis of ${\displaystyle F}$.

Q1. What is the coordinate vector of ${\displaystyle x^{2}+x^{5}}$ relative to ${\displaystyle B}$?

Q2. Let ${\displaystyle T:P_{n}\to F}$ be a linear transformation that is defined by ${\displaystyle T(f(x))=f(0)}$. What is the matrix representation of ${\displaystyle T}$ in ${\displaystyle B,K}$?

Nikita