EBoard 32: Binary search trees, continued
Warning This class is being recorded (and transcribed) (assuming Teams succeeds).
Approximate overview
- Administrivia
- Questions
- Binary search trees
- Lab
Administrivia
- Please return cards, boards, and markers to the back of the room
when you finish class today.
- New policy: Overspent tokens and missing labs/reflections cannot drop you
below a B-.
- New policy: Up to six missing labs/reflections permitted.
- I was unsuccessful at getting grading done this weekend. I apologize.
It’s high on my priority list.
- Starting Wednesday, we are doing a week of hash tables (yay!); start
with a reading by Osera.
Upcoming Token activities
Academic
- Tuesday, 2023-11-14, Noon, Day PDR: CS Table: Cell Phone Addiction.
- Wednesday, 2023-11-15, 4pm, HSSC Kernel: Madison Van Oort ’08 speaks
on Frictions in the Future of Work.
- Thursday, 2023-11-16, 11-noon, JRC 101: Convocation: Richard Robinson
on Nanoparticles 101.
- Thursday, 2023-11-16, 4:15pm, HSSC Kernel: CS Poster Session.
Cultural
Peer
- Monday, 2023-11-13, 4-6pm, 3D Printing Workshop, Stew Makerspace
- Tuesday, 2023-11-4, 4-6pm, 3rd floor HSSC, somewhere: Wilson Catalyst
- Thursday, 2023-11-4, 7-9pm, 3rd floor HSSC, somewhere: Wilson Catalyst
- Saturday, 2023-11-18, 1pm, Osgood: Swimming vs Augustana.
- Language study! Talk to your colleague.
Wellness
Misc
- Monday, 2023-11-13, 4-5:30pm, HSSC N1112: Politics of AI Info Session.
- Subject yourself to a study of types.
Other good things (no tokens)
Upcoming work
- MP8 pre-assessment due Sunday
- PM’s reading on Hash tables due Tuesday night
- MP8 due Thursday.
- MP8 post-assessment due Friday
- MP9 assigned Friday (JSON)
Questions
Registration
Trees/BSTs
Administrative
When will we get MP1 redos back?
I’ll check with the graders.
Where are the LAs?
Coming soon. All take-home. All open-ended. All infinite (well,
arbitrarily finite) redos.
MP8
Other
Binary Search Trees
Um, Aardvark, Penguin, Cat, Panda, Frog, Elk, Squid, Dog, Jellyfish
How do we remove things?
- Leaves: Easy. Just remove the link to the child.
- Interior nodes with only one child: Build the link over the node.
- Interior nodes with two children.
- Rebuild the tree (expensive)
- What’s more efficient (remaining \(O(height)\))?
- Delete the rightmost thing in the left subtree (or the leftmost
thing in the right subtree) and put its value in the current node.
- Historically: “And rebalance, if we can do it efficiently” (301)
Lab
Same places, same partners.
“Wow, writing set recursively is much easier than writing it iteratively.”