# Bessel function (zeros)

## Calculates the positive zeros of the Bessel functions Jv(x) and Yv(x).

order v
 v≦200
ordinal number s
 of zeros(s=1,2,..)
 6dgt10dgt14dgt18dgt22dgt26dgt30dgt34dgt38dgt42dgt46dgt50dgt
 $\normal Bessel\ functions\ of\\\ the\ 1st\ kind\ J_\nu(x)\ and\ 2nd\ kind\ Y_\nu(x)\\[10](1)\ x^2y''+xy'+(x^2-\nu^2)y=0\\\hspace{25} y=c_1J_\nu(x)+c_2Y_\nu(x)\\[10](2)\ J_\nu(x)={\large\sum_{\small k=0}^{\small\infty}\frac{(-1)^k}{k!\Gamma(k+\nu+1)}(\frac{x}{2})^{\nu+2k}}\\\hspace{30} Y_\nu(x)={\large\frac{J_\nu(x)cos(\nu\pi)-J_{-\nu}(x)}{sin(\nu\pi)}}\\(3)\ {\large e^{\frac{x}{2}(t-{\large\frac{1}{t}})}}={\large\sum_{\small n=-\infty}^{\small\infty}}J_n(x)t^n,\hspace{20} n=integer\\$
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