This course will cover the mathematical theory and analysis of simple games without chance moves.

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来自 Georgia Institute of Technology 的课程

Games without Chance: Combinatorial Game Theory

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This course will cover the mathematical theory and analysis of simple games without chance moves.

从本节课中

Week 4: Numbers and Games

The topics for this fourth week is Simplicity and numbers. How to play win numbers. Students will be able to determine which games are numbers and if so what numbers they are.

- Dr. Tom MorleyProfessor

School of Mathematics

>> Games without chance, welcome back. It's kind of wet here today, I hope you

are having wonderful weather where you are.

No, no, no cards today well. This is the quiz homework.

So I'll, i'll, put up the quiz, and then we'll talk about a little bit directions

for how to turn it in, and how to grade other quizzes and all that good stuff, is

on the course website. So here's a question all about numbers.

So in this quiz there are five questions. And the question, the answers are all

about what numbers are these games. So the first game is this Hackenbush game

with, that consists of, of, of this Hackenbush, this Hackenbush and this red 1

over here. So it's a sum of 3 Hackenbush positions.

This is a number, what number is it? Two, three, and four, are games that are

given in terms of, our notation for left options and right options.

And game number five, here, is, is a sum of, of, of two such things.

So, for this quiz, I'm expecting, for each one of these, a number as the answer.

And they're usually relatively small numbers with relatively small

denominators. I hope you all do well here and, ya'll

come back now, you hear?