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For What Value Of X Is X! = Ln(X)?
For what value of x is x! = ln(x)?
from experimentation:
f 5.2903160
_1.39938e_5 less than 0
f 5.2903161
1.03394e_6 more than 0
Where f is function x! - ln(x)
So apart from x=0, there is also a result for x between 5.2903160
and 5.2903161 where f(x') = 0.
Is there a formula to calculate the value of x' exactly?
Does the value x' have any "special significance"?
I assume that after x', there are no further occurrences of x where f(x)=0?
from experimentation:
f 5.2903160
_1.39938e_5 less than 0
f 5.2903161
1.03394e_6 more than 0
Where f is function x! - ln(x)
So apart from x=0, there is also a result for x between 5.2903160
and 5.2903161 where f(x') = 0.
Is there a formula to calculate the value of x' exactly?
Does the value x' have any "special significance"?
I assume that after x', there are no further occurrences of x where f(x)=0?
Answers
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You can do a Taylor expansion for ln(x) but I can't immediately remember what the situation is regarding x! except that there is Stirling's approximation for large values of x
Have you tried plotting the two functions and seeing where they cross. I think they cross only once or twice. I know you say you found 2 but I am not sure what the first one was since ln(0) is undefined
Have you tried plotting the two functions and seeing where they cross. I think they cross only once or twice. I know you say you found 2 but I am not sure what the first one was since ln(0) is undefined
Well there is a way to extend it, for sure, but it's usually written differently as the Gamma function, with Γ(n + 1) = n! and Γ(z) defined for all real numbers other than -1, -2, -3 etc.
To JD: Logarithms and exponentials are the exact opposites of each other. So log_a (a^x) = x, for all x, where a is the base of the logarithm.
To JD: Logarithms and exponentials are the exact opposites of each other. So log_a (a^x) = x, for all x, where a is the base of the logarithm.
I've messed around for ages and I don't think I can either find a derive a closed solution to x' as you've defined it. It's "close" to several different combinations of some integer divided by pi to some power, but I think in each case that's luck, and anyway it's never exact.
So I'm guessing the answer to your question is "no". But it is the only positive value of x that works.
So I'm guessing the answer to your question is "no". But it is the only positive value of x that works.
ff - if I understand correctly, the numerics are all sorted, ie the numerical solution for x has been found (about x=5.290316 to 7sf). The question was if there is a closed-form expression for this x, eg in terms of the square root of some integer, or pi to some power, or log of something, or the like. I don't think there is, or at least I'm not aware of it.
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