If you're joining the class late, please print and fill this out and give it to me in class.
Name:
What times would you most like a Wednesday office hour? (Please give several possibilities.)
For each statement or concept following, indicate your level of familiarity with it. (Even the false statements may be familiar...)
| Old hat | Somewhat familiar | Heard of it | No clue here | |
|---|---|---|---|---|
| "Linear transformations correspond 1:1 to matrices" | . | . | . | . |
| "Every real vector space is isomorphic to R to the n, for some n" | . | . | . | . |
| "Let T:V to V, C a cube in V of volume 1. Then volume(T*C) = | det T |." | . | . | . | . |
| Jordan canonical form | . | . | . | . |
| vector spaces over {0,1} with 1+1=0 | . | . | . | . |
| "Hermitian matrices have real eigenvalues and are diagonalizable" | . | . | . | . |
| the quotient space V/W of a vector space V by a subspace W | . | . | . | . |
| "The projective plane is the affine plane plus the line at infinity" | . | . | . | . |
| "Row vectors are naturally dual to column vectors" | . | . | . | . |
| the quaternions {a+bi+cj+dk : a,b,c,d real} | . | . | . | . |
Recall that the transpose M^T of a matrix is defined by "M^T's i,j entry is M's j,i entry".
| Let A be the 3x2 matrix |
| and B the 3x2 matrix |
| so A^T = |
|
Show your work in the following (on the back of the sheet if need be):
1. What is det (A^T * B)?
2. What is det (A * B)?
3. What is det (A * B^T)?
Anything else I should know about your mathematical background?