Posts

Coordinate geometry and circles

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 (This is Glen.) As you may have noticed from my previous posts, my go-to method for approaching geometry problems is bashing, normally with coordinates. Anyone who's tried to bash a problem (especially with coordinates) would have probably found out the hard way that circles generally lead to trouble, but years of bashing have led me to devise some tricks to get around this. I'll be writing about them below, along with, as far as possible, some examples which I remember bashing. I'm not typing out solutions for the sake of my sanity, and besides, I think there is value in actually working through the algebra. Instead, I'm just going to sketch an approach which I think is the most efficient. Introduction Bashing apologia Before I get lynched by the Synthetic Mafia, I should probably provide some justification for this post. Why bash? As a cynical member of the Synthetic Mafia might tell you, it's what immoral people do when they fail in thinking about a problem geom

BTS II: An introduction to learning theory

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(David here.) In this blogpost, we'll go off on a tangent and explore what it means to learn from data . In the process, we will get slightly closer (but not quite there) to the context where Rademacher complexity emerges.

Behind the Scenes of SMO Q4, Part 1: the Proposal Backstory

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(David here.) Recently, a problem of mine came out as Q4 on SMO Open 2024. I'll go over how I proposed the problem and the theory behind it, which involves some machine learning ideas (!).

Substituting Zero

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(Pengchong here). While in NS, I've been looking at some topics that I might've encountered back in school but not really gone too deeply into - one of which is real analysis, quite a common starting point for undergrad math. Though for those preparing for olympiads it probably doesn't have a high 'ROI', I think much of this stuff provides plenty of intuition for some olympiad problems I've encountered before. And of course, most importantly, I found it pretty fun (looking at Rudin's classic book, in particular). I'll give a brief introduction to some fundamental analysis concepts using ISL 2020 A8 as the vessel, and as an example of how these concepts can sometimes (though rarely) turn out pretty critical for a 'real' olympiad problem. I've used this problem during a session for this year's IMO team a while back (and actually got this in a mock during my own IMO training). It will only use the very fundamen

To Spoil or Not to Spoil (ft. A7, the most beautiful problem of ISL '23)

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 (Dylan here.) As usual, some non-maths, followed by some maths. I. To Spoil or Not to Spoil? Some context, so everyone is on the same page: To spoil a maths problem is to reveal key ideas, steps, and/or details of its solution to others, without their consent.  The content of the problem that is conveyed is called a spoiler (often confused with the thing at the back of race cars that prevent them from flying!). Spoilers could be as short as one word, a picture, or a non-verbal cue. Spoiling could happen anytime there is more than one person in the same room doing maths. It is very common in an unsupervised classroom of high school students. The questions I wish to answer (or at least, bring up for discussion): Do spoilers help or impede learning?  How is spoiling different from teaching? When is is okay to give up on a maths problem? Why do people spoil maths problems? A. Arguments for and against Okay, so no one is actually debating this. Spoiling olympiad problems, especially in a

Sorting books on a shelf

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(This is Yan Sheng.) The time has come for me to finally write a post about actually solving an olympiad-level problem, in particular the thought process and the winding path that got me to the solution. This came from one of my Discord servers a few months ago: You have a bookshelf of (finitely many) unsorted books. Every minute you are forced to move one book not already in the correct location to its correct (absolute) location, shifting the other books as you do so. This is the only allowed movement. If the books ever become sorted, the world will explode. Will the world explode? (For clarity, all the books have the same thickness, and the bookshelf has exactly enough space for all the books.) Here's an example of the above operation: suppose the bookshelf looks like 312 (i.e., book 3 is in position 1, book 1 in position 2, book 2 in position 3). I can choose to pick up book 2 to move it to position 2, while pushing book 1 to the right, so the bookshelf now looks like