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#11
Well, I'm partial to squares (4, 9, etc.) because of the open locker problem*, among other reasons.

Also, DNA is base 4, so it's sort of built-in. Tongue

* Take 100 school lockers (numbered 1-100). Open every one. Close every second one. Toggle (open or close) every third one, etc. Which lockers are left open at the end?
"Bad news, bad news came to me where I sleep / Turn turn turn again" - Bob Dylan
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#12
Ah.



Any defenders for the poor base-3 system?
Quote:In Jr. High School, I would take a gummi bear, squeeze its ears into points so it looked like Yoda, and then I would say to it "Eat you, I will!". And of course then I would it eat.
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#13
Quote:Any defenders for the poor base-3 system?


Problem: Break a 40 kg weight into 4 pieces such that those pieces can then be used to measure any (integer) weight from 1 to 40 kg using a balance.

Solution uses balanced ternary (digits: -1, 0, +1).

- Madhav.
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#14
Quote:* Take 100 school lockers (numbered 1-100). Open every one. Close every second one. Toggle (open or close) every third one, etc. Which lockers are left open at the end?
What exactly do you mean by "etc."?

- Madhav.
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#15
Quote:What exactly do you mean by "etc."?


Hm, do you stop after 50? Or continue til 100?

Quote:Solution uses balanced ternary (digits: -1, 0, +1).


What exactly do you mean by that? (I have no clue.)
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#16
Given he was talking about squares, I assume he goes up to 100. If the problem were to continue "for every number n from 3 to 100,, go through and toggle every locker that is a multiple of n", then the lockers open at the end would be lockers which are squares, 1, 4, 9, 16, 25, 36, 49, 64, 81, 100.
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#17
Quote:What exactly do you mean by that? (I have no clue.)


Balanced ternary Heart (there's actually a level in my upcoming set with it as a theme...lol)

It's base 3, but the digits are -1, 0, 1 instead of 0, 1, 2.
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#18
I'm going to be completely honest here:

I have no idea what the heck base systems are Thumbs up
CC1
JoshL1 / JoshL2 / JoshL3 / JoshL4 / JoshL5 / JoshL6 / JoshL7 / WoCCLP3 / TradingPlaces / WoCC1 / JoshL8(?)
JCCLP1 / JCCLP2 / JCCLP3 / JoshL0
JoshL / JCCLPRejects

Total: 1,463 (with no repeats)

CC2
Flareon1 / Flareon2
FlareonRejects

Total: 85+

Flareon Flareon Flareon Flareon Flareon
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#19
Quote:Hm, do you stop after 50? Or continue til 100?


If I remember the problem correctly, you keep going until 100.



Quote:I have no idea what the heck base systems are Thumbs up


You're not missing out on much. Teeth
Quote:In Jr. High School, I would take a gummi bear, squeeze its ears into points so it looked like Yoda, and then I would say to it "Eat you, I will!". And of course then I would it eat.
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#20
Quote:I have no idea what the heck base systems are Thumbs up


It's not hard. We use the decimal or base 10 system. In this system there are 10 digits, 0 through 9, representing each number less than 10. Each number N is represented by a list of digits, which are determined by finding d_1, d_2 etc. such that N = d_1 + 10*d_2 + 100*d_3 + 1000*d_4 + ... and so on until we reach a power of 10 larger than N. We write numbers using this series of digits in opposite order from how I wrote them there.

Ex: 1028 is 1*1000 + 0*100 + 2*10 + 8

In an alternative base system it's the same thing, only 10 is replaced by some other number, and there are a different number of digits, which may be represented by some smaller set of numbers or it might have 0-9 plus extra symbols if the base is larger than 10.

Ex: In base 2, one has the digits 0 and 1 representing the numbers less than 2. A number can be represented in binary with digits d_1, d_2 etc. such that N = d_1 + 2*d_2 + 4*d_3 + 8*d_4 + ... and so on until we reach a power of 2 greater than N. Remember that these d's are required to be 0 or 1, they are not allowed to be anything else.

234 in binary, for example, would be 1*128 + 1*64 + 1*32 + 0*16 + 1*8 + 0*4 + 1*2 + 0*1, so we would write it as 11101010.

The base 2 system is very popular because it is used by computers to represent numbers, because computers store and operate on data as a series of on/off states, which are made to represent numbers in binary.
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