This WeekÕs Homework: Make sure you can do but do not turn in: 1.6: 1,2,3,4,5,7,10,24 and 6.2 1,5,7.

Home work to be turned in: Section 1.6 numbers 9,11,12,13 ,14,16,18,19,21,22,27,29,30 and Section 6.2 numbers 1,3,6,14,16,19 along with completing the proof of the following theorem presented in X-session last week.


\begin{theorem} Let $H(x,y)$\ be a bilinear form on the real vector space $V$, t... ...item If $<x,y> = <x,z>$\ for every $x$, then $y=z$. \end{enumerate}\end{theorem}

Proposed Topics For this Week: We will finish our detailed examination of vector spaces with the notion of basis and dimension. By Friday we will move onto linear transformations between vector spaces.

The X-session Topic In x-session we produce some particularly nice bases in the presence of an inner product.


Math 24 Winter 2000
2000-01-12