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ABCD is a 4 digit number where A,B,C and D are 4 distinctly separate digits between 1 and 9.
Using any of the following math operations and the digits A,B,C and D exactly once get the number ABCD.
Math operations allowed: + - x / ^ ! Square root and parenthesis. NO concatenation. There are at least 2 solutions. So answer with the use of the least number of math operations gets the tick.
Please no programming.
On par with Bass, with preservation of digit order:
$5^5=3125\implies(3\times1+2)^5=3125$
Another, this time with reverse digit order:
$(6*1*9)^2=2916$
In order and very brief
$4096 = 4^{0^9+6}$
... and also illegal since it contains a zero. Thanks @Bass.
If we are allowed parentheses to mean binomial coefficients:
$6435 = \begin{pmatrix}\begin{pmatrix} 6 \\ 4 \end{pmatrix} \\ 3+5 \end{pmatrix}$
Unless parens count as an operation, this should be optimal:
$(\frac{8}{2}-1)^7 = 2187$
(Of course I'll be keeping an eye out for a solution without parens, and with the digits in the correct order, but that might take a while.)
Here's one without parens, so this is definitely minimal in terms of operations:
$6\times4^5+1 = 6145$
Doesn't have the digit order style points though. After trying pretty much all of the likely candidates, and many unlikely ones too, I'm going to call it: I don't think there is a three operation solution without parens that has the digits in the correct order.
No fancy ordering.
$1296 = 6^{\frac{9-1}{2}}$
How about:
$ 8192 = 2^{{\sqrt{9}}! - 1 + 8} $
Nobody has been using the monadic operations, so I did.
using factorial (!) is a great help to make big numbers using a simple digit num... Based on this, we can find the following answers:
In correct order:
$2163 = (2-1+6!)*3 $
$5167 = 5! + 1 + 6 + 7!$
$4368 = (\sqrt{4}*3)* (6!+8)$
No ordering:
$3625 = (6!+5)*(3+2)$
$5761 =7!+6!+1^5$
