Can you solve Dongle's Difficult Dilemma? - Dennis E. Shasha

2,155,328 views ・ 2021-04-26

TED-Ed


Please double-click on the English subtitles below to play the video.

00:06
According to legend, when this planet was young and molten,
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three galactic terraformers shaped it into a paradise.
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When their work was done, they sought out new worlds,
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but left the source of their power behind:
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three powerful golden hexagons,
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hidden within dungeons full of traps and monsters.
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If one person were to bring all three hexagons together,
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they could reinvent the world however they saw fit.
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That was thousands of years ago.
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Today, you’ve learned of Gordon, an evil wizard dead set on collecting the hexagons
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and enslaving the world to his will.
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So you set off on a quest to get them first,
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adventuring through fire, ice, and sand.
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Yet each time, you find that someone else got there first.
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01:00
Not Gordon, but a merchant named Dongle.
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At the end of the third dungeon. you find a note inviting you to Dongle’s castle.
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You show up with a wallet bursting with the 99 gems
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you’ve collected in your travels,
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arriving just moments before Gordon, who also has 99 gems.
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Dongle has not only collected the golden hexagons,
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but he’s used them to create 5 silver hexagons,
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just as powerful as their golden counterparts.
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Why did Dongle do all this?
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Because there’s one thing he loves above all else: auctions.
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You and the evil wizard will compete to win the hexagons,
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starting with the three golden ones,
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making one bid for each item as it comes up.
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The winners of ties will alternate, starting with you.
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Whoever first collects a trio of either golden or silver hexagons
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can use their power to recreate the world.
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You’ve already bid 24 gems on the first,
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when you realize that your rival has a dastardly advantage:
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a mirror that lets him see what you’re bidding.
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He bids zero, and you win the first hexagon outright.
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What’s your strategy to win a matching trio of hexagons before your rival?
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Pause here to figure it out for yourself.
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Answer in 3
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Answer in 2
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Answer in 1
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Dongle’s dangled a difficult dilemma.
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Do you spend big to try to win the golden hexagons outright?
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Save as much as possible for silver? Or something in-between?
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Gordon can use his magic mirror and 99 gems
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to make sure that no matter what you bid on the second gold,
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he can bid one more and block you.
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So the real question is— how can you force Gordon to spend enough on the golds
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to guarantee that you’ll win on the silvers?
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03:01
Here’s a hint.
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Let’s say at the start of the silver auctions
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you had a one gem advantage, such as 9 to 8.
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You need to win three auctions,
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so could you divide your gems into three groups of three and win?
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For simplicity, let’s assume a set of rules that’s worse for you,
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where Gordon wins every tie.
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If you bid 3 each time, the best he could do
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is win two silver hexagons, and have two gems left—
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which you’ll beat with three bids of 3.
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Any one-gem advantage where your starting total is divisible by three
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will lead to victory by the same logic.
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So knowing that, how can you force Gordon's hand in the gold auctions
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so you go into silver with an advantage?
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Let’s first imagine that Gordon lets you win the second gold auction
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by betting some amount X with a tie.
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You could then bid everything you have left on the third gold hexagon,
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and he'd have to match you to block.
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So if you could bid 51 on the third gold,
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you'd go into silver with a 51 to 48 advantage, which you know you can win.
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Solving for X reveals that in order to have 51 on round three,
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you should bid at most 24 on round two.
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But what about the other possibility,
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where Gordon wins the second gold against your bid of 24—
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would this strategy still work?
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The least he could bid to win the second gold is 25,
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making the total 75 to Gordon’s 74.
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No one would then bid on round three,
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since you’ve each blocked the other from getting three golds.
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After that, you could bid 25 every time to win three silvers.
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The bidding war was close,
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but your ingenuity kept you one link ahead in the chain of inference,
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and the silver tri-source is yours.
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Now... what will you do with it?
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