You can
put this solution on YOUR website! Given ln(x)^(ln(x))=4
Let y = ln x, the equation becomes
y^y = 4,
But y^y = 2^2, [This is the point: to take advantage 4 = 2^2]
so y = 2 = ln x,
We get x = e^2
It seems a little tricky. While there is no other good
ways even though I have tried to take ln , log2 , etc.
Your idea is good, but not working for solving this tricky problem.
Kenny
You can
put this solution on YOUR website!Let me take a shot at this, since I found TWO solutions for it.
Using the second law of logarithms, i.e.
, this can be written
or
Take the square root of each side of the equation:
or
In each case above, raise both sides as a power of e:
or
or
The only question that remains is are these solutions both acceptable. As far as I can tell, the value of
never makes the ln of a negative, so BOTH answers should be included in the solution.
R^2 at SCC
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