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|
| mon |
1/5 |
no school |
|
| tue |
1/6 |
|
Schedule
verification |
| wed |
1/7 |
|
Advanced Data Structures ch 21 |
| thur |
1/8 |
|
Trees, Binary Search Trees,
Heaps and min heaps, Radix sorts |
| fri |
1/9 |
|
pgm 1 ex p21.1 unique words will
be in a file called treewords.txt |
|
|
|
|
| mon |
1/12 |
|
pgm 1 |
| tue |
1/13 |
|
pgm 1 |
| wed |
1/14 |
|
pgm 1 |
| thur |
1/15 |
|
pgm 1 |
| fri |
1/16 |
|
pgm 1 due Schram
15 due |
|
|
|
|
| mon |
1/19 |
no school |
|
| tue |
1/20 |
|
pgm 2 ex p21.8 IntTree |
| wed |
1/21 |
|
pgm 2 |
| thur |
1/22 |
|
pgm 2 |
| fri |
1/23 |
|
pgm 2 due |
|
|
|
|
| mon |
1/26 |
|
pgm 3 ex p 21.14 tree print |
| tue |
1/27 |
|
pgm 3 |
| wed |
1/28 |
web |
pgm 3 |
| thur |
1/29 |
|
pgm 3 |
| fri |
1/30 |
|
pgm 3 Schram
20 due |
|
|
|
|
| mon |
2/2 |
|
pgm 4 21.19 Min heap |
| tue |
2/3 |
|
pgm 4 |
| wed |
2/4 |
e rel |
pgm 4 |
| thur |
2/5 |
|
pgm 4 due |
| fri |
2/6 |
|
pgm 5 animated
heapsort Schram
ch 18 and r21.1, r21.2,r21.4,r21.6, r21.9, r21.15 due |
|
|
|
|
| mon |
2/9 |
|
pgm 5 |
| tue |
2/10 |
|
pgm 5 |
| wed |
2/11 |
web |
review |
| thur |
2/12 |
|
test
ch 21 |
| fri |
2/13 |
|
pgm 5 |
|
|
|
|
| mon |
2/16 |
No school |
|
| tue |
2/17 |
|
pgm 6 Radix sort.
Using big-O notation, evaluate the efficiency of the radix sort for
a data |
| wed |
2/18 |
|
set of 5 digit
numbers. Compare to selection
sort and quick sort. Are there
any |
| thur |
2/19 |
|
cases where the
radix sort is more efficient? Which
cases and why. |
| fri |
2/20 |
|
pgm 6 |
|
|
|
|
| mon |
2/23 |
|
pgm 6 |
| tue |
2/24 |
|
pgm 6 |
| wed |
2/25 |
web |
pgm 6 |
| thur |
2/26 |
|
pgm 6
due |
| fri |
2/27 |
|
pgm 7 proj 15.1 web
page reader Schram 21 due |
|
|
|
|
| mon |
3/2 |
|
pgm 7 |
| tue |
3/3 |
E Rel |
pgm 7 |
| wed |
3/4 |
|
pgm 7 |
| thur |
3/5 |
|
review pgm 7
due |
| fri |
3/6 |
|
test
ch 15 and 21 |
|
|
|
|
| mon |
3/9 |
|
GridWorld Case
Study, overview, code walk thru |
| tue |
3/10 |
|
GWCS 1 read pp 1-12
dyk set 2(all), p12 ex 3 and 4 |
| wed |
3/11 |
web |
GWCS 1 |
| thur |
3/12 |
|
GWCS 1 |
| fri |
3/13 |
|
GWCS 2 read pp
13-24, dyk sets 3-6, |
|
|
|
p24 (with a
partner)design and run jumper class Schram
24 MC due |
|
|
|
|
| mon |
3/16 |
|
GWCS 2 |
| tue |
3/17 |
|
GWCS 2 |
| wed |
3/18 |
web |
GWCS 2 |
| thur |
3/19 |
|
GWCS 3 read 25-32,
dyk sets 7-9, p32 ex 3 and 6 and design own critters |
| fri |
3/20 |
|
GWCS 3 |
|
|
|
|
| mon |
3/23 |
ghsgt |
GWCS 3 |
| tue |
3/24 |
ghsgt |
GWCS 4 |
| wed |
3/25 |
ghsgt |
GWCS 4 |
| thur |
3/26 |
ghsgt |
GWCS 4 |
| fri |
3/27 |
web |
Schram
24 FRQ due |
|
|
|
|
| mon |
3/30 |
|
GWCS 5 read pp33-38 dyk 10-12,
p38 ex 1-3 |
| tue |
3/31 |
|
GWCS 5 |
| wed |
4/1 |
|
GWCS 5 |
| thur |
4/2 |
|
GWCS 5 |
| fri |
4/3 |
web |
GWCS 5
Schram
25 MC due |
|
|
|
|
| mon |
4/6 |
|
spring break |
| tue |
4/7 |
|
spring break |
| wed |
4/8 |
|
spring break |
| thur |
4/9 |
|
spring break |
| fri |
4/10 |
|
spring break |
|
|
|
|
| mon |
4/13 |
|
GWCS 6 tba |
| tue |
4/14 |
|
GWCS 6 |
| wed |
4/15 |
|
GWCS 6 |
| thur |
4/16 |
|
GWCS 6 |
| fri |
4/17 |
|
GWCS 6 |
|
|
|
|
| mon |
4/20 |
|
review |
| tue |
4/21 |
|
GW
TEST |
| wed |
4/22 |
web |
ap review |
| thur |
4/23 |
|
2004 q 1, 2 |
| fri |
4/24 |
|
2004 q
4 2005 q 2 |
|
|
|
|
| mon |
4/27 |
|
Schram
ch 25 FRQ due |
| tue |
4/28 |
|
2005 q 3, 4 |
| wed |
4/29 |
web |
2006 q 1, 2 |
| thur |
4/30 |
|
2006 q 3 2007 q 1 |
| fri |
5/1 |
|
2007 q 2, 3 |
|
|
|
|
| mon |
5/4 |
|
review |
| tue |
5/5 |
|
AP
COMPUTER SCIENCE EXAM( morning) |
| wed |
5/6 |
|
pgm 8 Chat |
| thur |
5/7 |
|
pgm 8 |
| fri |
5/8 |
web |
pgm 8 |
|
|
|
|
| mon |
5/11 |
|
pgm 8 |
| tue |
5/12 |
|
pgm 8 |
| wed |
5/13 |
web |
all programs due |
| thur |
5/14 |
|
sr
finals 6,7 |
| fri |
5/15 |
|
sr
finals 3,4,5 |
|
|
|
|
| mon |
5/18 |
|
sr
finals 1,2 |
| tue |
5/19 |
web |
exemptions |
| wed |
5/20 |
|
finals
3, 4, 5 |
| thur |
5/21 |
|
finals
1, 2 |
| fri |
5/22 |
|
finals
6, 7 |
|
|
|
|
|
|