Please turn in only the problems indicated with an asterisk (*).
Your proofs should be
presented in complete English sentences using proper grammar,
spelling and
punctuation. Submitted work should consist of clean copy with no
scratch marks.
Do not submit pages that have been torn
from a spiral notebook.
Staple and number the pages in each homework assignment.
It is recommended that you write your final copy in pencil
thorougly removing any errors with a
good eraser or type it using a computer. If you choose to write
your final copy in ink, take care to avoid mistakes. Don't submit
homework that is difficult to read or contains errors that have
been poorly erased or scratched out.
Do not submit your rough copy: it will not be graded.
Homework #1 Due Feb 8
6.1 -- 6, 10*
6.2 -- 2*, 4
6.3 -- 5, 6*, 7, 8, 9, 10*, 12
Homework #2 Due Feb 15
6.4 -- 6, 7*, 8, 11
6.5 -- 1*, 5*, 7, 8
6.6 -- 2*, 7, 9, 10
Extra Credit #1 Due Feb 20
6.4 -- 11*
6.5 -- 8*
6.6 -- 10*
Homework #3 Due Feb 29
7.1 -- 2, 3*, 6, 7*, 8
7.2 -- 1, 2*, 3, 6, 8*, 9
7.3 -- 3abc*, 5
Homework #4 Due Apr 2 [solutions]
1.3 -- 1*, 2*
2.2 -- 1*, 7*
3.2 -- 1*, 5*
Homework #5 Due Apr 21
4.2 -- 2a*
4.3 -- 1a*,b, 2*, 4abc, 5a*,b,c*
Prove or disprove*: Let S be a closed, bounded, Jordan
measurable subset of Rn, and let f be continuous and
g be Riemann integrable on S. Then fg is Riemann
integrable on S.
Last updated:
Wed Feb 15 09:29:15 PST 2006