Today's puzzle
Feb. 16th, 2004 01:56 pm![[personal profile]](https://www.dreamwidth.org/img/silk/identity/user.png){kind=small}
sinjunSince I posted yesterday's earlier, here's the one on my calendar for today:
Find the number that best completes the sequence below.
1 4 16 ? 256
Find the number that best completes the sequence below.
1 4 16 ? 256
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no subject
Date: 2004-02-16 11:05 am (UTC)no subject
Date: 2004-02-16 11:08 am (UTC)(Solved before I saw Wibble's response)
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Date: 2004-02-16 11:09 am (UTC)Hmph. Why are all the numerical puzzles ridiculously easy while language ones take a bit of an effort? The calendar is biased, I tell ya. :)
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Date: 2004-02-16 11:47 am (UTC)no subject
Date: 2004-02-16 12:38 pm (UTC)no subject
Date: 2004-02-16 12:38 pm (UTC)Did you get the word puzzle?
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Date: 2004-02-16 12:49 pm (UTC)So, you know, I do /know/ the answer...but it wouldn't be very fair for me to post it, now would it? @#;+)
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Date: 2004-02-16 12:58 pm (UTC)That happens. But there will be other word puzzles I'm sure. ;)
no subject
Date: 2004-02-16 04:14 pm (UTC)All it is is the previous number multipled by 4. :-)
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Date: 2004-02-16 05:10 pm (UTC)1^2 = 1
2^2 = 4
4^2 = 16
8^2 = 64
16^2 = 256
Perhaps a better puzzle would've been to find both explanations for the sequence. ;o)
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Date: 2004-02-16 05:13 pm (UTC)Re:
Date: 2004-02-16 05:18 pm (UTC)If you double the root, because you're squaring, it's always going to be a four-fold increase.
I guessed 64 right away, and had to spend a minute thinking about /why/ it would be 64. There's just something about those powers of 2...
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Date: 2004-02-16 05:23 pm (UTC)To wit:
Key in a random number: 7,545,154,872,145 x 9 = 67,906,393,849,305. Add each of those numbers up and you get 72, and 7 + 2 = 9.
Of course, this was demonstrated in a simpler manner by just taking things like 5 x 9 = 45, and 4 + 5 = 9. ;-)
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Date: 2004-02-16 05:29 pm (UTC)