robert Ihnot said:Sterling's formula says limit [tex]n!=\frac{n^n}{e^n}\sqrt{2n\pi}[/tex] We need only substitute X for n, since the function is continuous for positive X, to work your problem.
George Jones said:A standard extension of factorial to all real numbers except the negative integers is by way of the gamma function. Then [itex]\Gamma (x + 1) = x![/itex]. One way to derive Stirling's formula is by using the standard integral representation of the gamma function. A couple of the steps are, however, not completely obvious.
Regards,
George
Yes and its usually expressed in terms of digamma function.roger said:Does the extension to real numbers excluding negative, mean that the factorial becomes 'continuous' so that a derivative exists ?
The limit of (x e^x) / (x^x *x^1/2) as x approaches infinity is infinity.
To calculate the limit of (x e^x) / (x^x *x^1/2), you can use L'Hôpital's rule or algebraic manipulation to simplify the expression before taking the limit.
No, the limit of (x e^x) / (x^x *x^1/2) is not a finite number. It is either infinity or undefined, depending on the values of x.
The limit of (x e^x) / (x^x *x^1/2) has applications in calculus and can help us understand the behavior of functions as x approaches infinity.
No, the limit of (x e^x) / (x^x *x^1/2) is undefined at x=0. This is because the denominator becomes 0, making the expression indeterminate.