Manuals/calci/BESSELK

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BESSELK(x,n)

Where $x$ is the value at which to evaluate the function
$n$ is the integer which is the order of the Bessel Function

Description

This function gives the value of the modified Bessel function when the arguments are purely imaginary.
Bessel functions is also called cylinder functions because they appear in the solution to Laplace's equation in cylindrical coordinates.
Bessel's Differential Equation is defined as:

$x^{2}{\frac {d^{2}y}{dx^{2}}}+x{\frac {dy}{dx}}+(x^{2}-\alpha ^{2})y=0$ where $\alpha$ is the Arbitrary Complex number.

But in most of the cases α is the non-negative real number.
The solutions of this equation are called Bessel Functions of order $n$ .
Bessel functions of the first kind, denoted as $J_{n}(x)$ .
The Bessel function of the first kind of order can be expressed as:

J_{n}(x)=\sum _{k=0}^{\infty }{\frac {(-1)^{k}}{k!\Gamma (n+k+1)}}.({\frac {x}{2}})^{n+2k}

The Bessel function of the second kind $Y_{n}(x)$ .
The Bessel function of the 2nd kind of order can be expressed as: $Y_{n}(x)=\lim _{p\to n}{\frac {J_{p}(x)Cos(p\pi )-J_{-p}(x)}{Sin(p\pi )}}$
So the form of the general solution is $y(x)=c1I_{n}(x)+c2K_{n}(x)$ .

where: $I_{n}(x)=i^{-n}J_{n}(ix)$ and

K_{n}(x)=\lim _{p\to n}{\frac {\pi }{2}}{\frac {I_{-p}(x)-I_{p}(x)}{Sin(p\pi )}}

are the modified Bessel functions of the first and second kind respectively.

This function will give the result as error when:

1.  $x$  or  $n$  is non numeric 
2.  $n<0$ , because  $n$  is the order of the function.

Examples

BESSELK(5,2) = 0.0040446134
BESSELK(0.2,4) = 29900.2492
BESSELK(10,1) = 0.000155369
BESSELK(2,-1) = NAN

See Also

References

Bessel Function

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