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  • Hey, this is Presh Talwakar.

  • Martin is a gardener in Mathland.

  • There are 100 poisonous flowers in his garden

  • that he wants to destroy.

  • On their own,

  • the flowers do not change in number.

  • Martin has a spray to kill the poisonous flowers,

  • but the spray works only in a specific way.

  • The spray has settings to destroy exactly 3,

  • 5, 14, or 17 flowers instantly.

  • The spray only works if

  • there are at least as many flowers as the setting.

  • If there are two flowers, for example,

  • the setting for 3 does nothing.

  • Furthermore, if at least one flower survives

  • after he sprays them,

  • the flowers instantly grow back

  • based on how many died.

  • If 3 die, then 12 grow back.

  • If 5 die, then 17 grow back.

  • If 14 die, then 8 grow back.

  • If 17 die, 2 grow back.

  • If the number of flowers is ever exactly zero,

  • then the flowers never grow back.

  • Can Martin ever get rid of the

  • poisonous flowers in his garden?

  • You can assume he has an unlimited amount of spray.

  • Can you figure it out?

  • Give this problem a try, and when you're ready,

  • keep watching the video for the solution.

  • So, from the initial 100 flowers,

  • you can try experimenting the different combinations

  • of the flowers you can spray,

  • and keep track of how many flowers remain.

  • But no matter how you try,

  • you're not gonna be able to get rid of all the flowers.

  • We can understand why

  • by thinking forward and reasoning backwards.

  • So in order for Martin to succeed,

  • there needs to be 3, 5, 14, or 17 flowers

  • just before the last time he sprays the flowers.

  • This means from the initial 100 flowers,

  • Martin has to decrease the number of flowers

  • by exactly 97, 95, 86, or 83 flowers.

  • Let's consider the net change after each setting of the spray.

  • If he uses a setting of 3,

  • he kills 3, but 12 grow back,

  • which leads to plus 9 flowers.

  • For the setting of 5,

  • there is a net change of plus 12 flowers.

  • For 14 setting,

  • he decreases the number of flowers by 6,

  • and for the 17 setting,

  • he decreases the number of flowers by 15.

  • On each setting of the spray,

  • Martin can only change the number of flowers

  • by +9, +12, -6, or -15,

  • and there's a pattern to these numbers.

  • They are all multiples of 3.

  • Since Martin only changes the number of flowers

  • by a multiple of 3,

  • the number of flowers has to change by 3x

  • for certain integer values of x.

  • Now, since the numbers 97, 95, 86, and 83 are not multiples of 3,

  • that means Martin is not capable

  • of decreasing the initial number

  • by exactly any of those numbers.

  • Therefore, we can conclude

  • Martin can never get rid of

  • all of the poisonous flowers.

  • Did you figure it out?

  • Thanks for watching this video. Please subscribe to my channel.

  • I make videos on math and game theory.

  • You can catch me on my blog, "Mind Your Decisions,"

  • which you can follow on Facebook, Google+, and Patreon.

  • You can catch me on social media: @preshtalwalkar,

  • and if you like this video, please check out my books.

  • There are links in the video description.

Hey, this is Presh Talwakar.

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A2 初級

あなたは毒のある花の謎を解くことができますか? (Can You Solve The Poisonous Flowers Riddle?)

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    小爸 に公開 2021 年 01 月 14 日
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