6
$\begingroup$

What is the highest number that can be got from 4383 by moving exactly 2 matches?

Number 1 has got 2 matches, so I thought it will be 47831 as I remove two matches from second number (3), but it isn't the highest possible.

Format is same like this (1 is only number with only two matches)

image of 4383 with match-sticks

Does anybody know solution?

  • 0
    It's well over a quadtrillion. Pick two matches up, and strike up a spark. Drop those matches onto the other ones and watch them burn. You'll see far too many numerals to gen an accurate reading on what the number is... and there's plenty of exponents there also!2012-05-19

4 Answers 4

4

If you want to play with notation, you could have 4^783 or $438^3$ depending on what you allow.

      _   _  _   |_| _| |_| _|     | _| |_| _|           _   _  _   |_| /\  | |_| _|     |     | |_| _| 

Of course with actual matches, the caret would be squished in between the 4 and the 3. Might be considered cheating because really you should move the whole 4, as I did in the drawing. On the other hand:

             _       _   _  _|   |_| _| |_| _|     | _| |_|  

Only moves 2 matches and would be how you would write $438^3 = 84,027,672$

21

7^983 is the highest number. The 4 changes to a 7, and the 3 changes to a 9.

      _   _  _   |_| _| |_| _|     | _| |_| _|       _   _  _    _ |_| |_| _|     | _| |_| _|     | 
  • 2
    $^{438}3$ ([tetration notation](https://en.wikipedia.org/wiki/Tetration)) is enormously larger than any other answer so far.2015-07-30
9

I am guessing 71393. Rotate the horizontal match of the leading 4 to split it into two ones, and grab one out of the 8 to turn the leading 1 into a 7.

      _   _  _   |_| _| |_| _|     | _| |_| _|   _    _   _  _   | | _| |_| _|   | | _|  _| _| 
8

Tetration notation:

      _   _  _   |_| _| |_| _|     | _| |_| _|        _   _     |_| _| |_| _     | _| |_||_|               | 

or (if that's not a valid $9$),

      _   _     |_| _| |_| _     | _| |_| _|              _| 

$^{438}3= 3^{3^{\cdot^{\cdot^{3^3}}}}$ (an exponential tower with $438\ \ 3$s).

  • 0
    @Rahul -- Thanks -- It can be a $3$ if the $9$ isn't valid. (Either one is enormously larger than any of the other answers.)2015-07-30