<html><head><title>Kapitel 7. Satskontrollfunktioner</title><link rel="stylesheet" href="common/kde-default.css" type="text/css"><meta name="generator" content="DocBook XSL Stylesheets V1.48"><meta name="keywords" content="KDE, LabPlot, diagram"><meta http-equiv="Content-Type" content="text/html; charset=iso-8859-1"><meta name="GENERATOR" content="KDE XSL Stylesheet V1.13 using libxslt"><link rel="home" href="index.html" title="Handbok för LabPlot"><link rel="up" href="index.html" title="Handbok för LabPlot"><link rel="previous" href="advanced_topics.html" title="Kapitel 6. Avancerade ämnen"><link rel="next" href="parser-gsl.html" title="GSL-specialfunktion"></head><body bgcolor="white" text="black" link="#0000FF" vlink="#840084" alink="#0000FF"><table border="0" cellpadding="0" cellspacing="0" width="100%"><tr class="header"><td colspan="2"> </td></tr><tr id="logo"><td valign="top"><img src="common/kde_logo.png" alt="KDE -         The K Desktop Environment" width="296" height="79" border="0"></td><td valign="middle" align="center" id="location"><h1>Satskontrollfunktioner</h1></td></tr></table><table width="100%" class="header"><tbody><tr><td align="left" class="navLeft" width="33%"><a accesskey="p" href="advanced_topics.html">Föregående</a></td><td align="center" class="navCenter" width="34%"> </td><td align="right" class="navRight" width="33%"> 
		      <a accesskey="n" href="parser-gsl.html">Nästa</a></td></tr></tbody></table><div class="chapter"><div class="titlepage"><div><h2 class="title"><a name="parser"></a>Kapitel 7. Satskontrollfunktioner</h2></div></div><p>LabPlot's satskontrollerare tillåter dig att använda följande funktioner: </p><div class="sect1"><div class="titlepage"><div><h2 class="title" style="clear: both"><a name="parser-normal"></a>Standardfunktion</h2></div></div><div class="informaltable"><table width="100%" border="1"><colgroup><col><col></colgroup><thead><tr><th>Funktion</th><th>Beskrivning</th></tr></thead><tbody><tr><td>acos(x)</td><td>Arcus cosinus</td></tr><tr><td>acosh(x)</td><td>Arcus cosinus hyperbolicus</td></tr><tr><td>asin(x)</td><td>Arcus sinus</td></tr><tr><td>asinh(x)</td><td>Arcus sinus hyperbolicus</td></tr><tr><td>atan(x)</td><td>Arcustangens</td></tr><tr><td>atan2(y,x)</td><td>arcustangensfunktion med två variabler </td></tr><tr><td>atanh(x)</td><td>Arctangens hyperbolicus</td></tr><tr><td>beta(a,b)</td><td>Beta</td></tr><tr><td>cbrt(x)</td><td>Kubrot</td></tr><tr><td>ceil(x)</td><td>Avkorta uppåt till heltal</td></tr><tr><td>chbevl(x, coef, N)</td><td>Beräkna Chebyshevserier</td></tr><tr><td>chdtrc(df,x)</td><td>Komplementerad 'Chi'-två</td></tr><tr><td>chdtr(df,x)</td><td>'Chi'-två fördelning</td></tr><tr><td>chdtri(df,y)</td><td>Invers 'Chi'-två</td></tr><tr><td>cos(x)</td><td>Cosinus</td></tr><tr><td>cosh(x)</td><td>Cosinus hyperbolicus</td></tr><tr><td>cosm1(x)</td><td>cos(x)-1</td></tr><tr><td>dawsn(x)</td><td>Dawson's integral</td></tr><tr><td>ellie(phi,m)</td><td>Ofullständig elliptisk integral (E)</td></tr><tr><td>ellik(phi,m)</td><td>Ofullständig elliptisk integral (E)</td></tr><tr><td>ellpe(x)</td><td>Fullständig elliptisk integral (E)</td></tr><tr><td>ellpk(x)</td><td>Komplett elliptisk integral (K)</td></tr><tr><td>exp(x)</td><td>Exponential, basen e</td></tr><tr><td>expm1(x)</td><td>exp(x)-1</td></tr><tr><td>expn(n,x)</td><td>Exponentiell integral</td></tr><tr><td>fabs(x)</td><td>Absolutvärde</td></tr><tr><td>fac(i)</td><td>Fakultet</td></tr><tr><td>fdtrc(ia,ib,x)</td><td>Komplementerad F</td></tr><tr><td>fdtr(ia,ib,x)</td><td>F-fördelning </td></tr><tr><td>fdtri(ia,ib,y)</td><td>Invers F-fördelning</td></tr><tr><td>gdtr(a,b,x)</td><td>Gammafördelning</td></tr><tr><td>gdtrc(a,b,x)</td><td>Komplementerad gamma</td></tr><tr><td>hyp2f1(a,b,c,x)</td><td>Gauss hypergeometriska funktion</td></tr><tr><td>hyperg(a,b,x)</td><td>'Confluent' hypergeometrisk 1F1</td></tr><tr><td>i0(x)</td><td>Modifierad Bessel, ordning 0</td></tr><tr><td>i0e(x)</td><td>Exponentiellt skalad i0</td></tr><tr><td>i1(x)</td><td>Modifierad Bessel, ordning 1</td></tr><tr><td>i1e(x)</td><td>Exponentiellt skalad i1</td></tr><tr><td>igamc(a,x)</td><td>Komplementerad gammaintegral</td></tr><tr><td>igam(a,x)</td><td>Ofullständig gammaintegral</td></tr><tr><td>igami(a,y0)</td><td>Invers gammaintegral</td></tr><tr><td>incbet(aa,bb,xx)</td><td>Ofullständif betaintegral</td></tr><tr><td>incbi(aa,bb,yy0)</td><td>Invers betaintegral</td></tr><tr><td>iv(v,x)</td><td>Modifierad Bessel, icke-heltals ordning</td></tr><tr><td>j0(x)</td><td>Bessel, ordning 0</td></tr><tr><td>j1(x)</td><td>Bessel, ordning 1</td></tr><tr><td>jn(n,x)</td><td>Bessel, ordning n</td></tr><tr><td>jv(n,x)</td><td>Bessel, icke-heltalsordning</td></tr><tr><td>k0(x)</td><td>Mod. Bessel, 3:je slaget, ordning 0</td></tr><tr><td>k0e(x)</td><td>Exponentiellt skalad k0</td></tr><tr><td>k1(x)</td><td>Mod. Bessel, 3:je slaget, ordning 1</td></tr><tr><td>k1e(x)</td><td>Exponentiellt skalad k1</td></tr><tr><td>kn(nn,x)</td><td>Mod. Bessel, 3:je slaget, ordning n</td></tr><tr><td>lbeta(a,b)</td><td>Naturlig logaritm av |beta|</td></tr><tr><td>ldexp(x,exp)</td><td>Multiplicera flyttal med heltalspotens av 2</td></tr><tr><td>log(x)</td><td>Logaritm, basen e</td></tr><tr><td>log10(x)</td><td>Logaritm, basen 10</td></tr><tr><td>logb(x)</td><td>radixoberoende exponent</td></tr><tr><td>log1p(x)</td><td>log(1+x)</td></tr><tr><td>ndtr(x)</td><td>Normalfördelning</td></tr><tr><td>ndtri(x)</td><td>Invers normalfördelning</td></tr><tr><td>pdtrc(k,m)</td><td>Komplementerad Poisson</td></tr><tr><td>pdtr(k,m)</td><td>Poissonfördelning</td></tr><tr><td>pdtri(k,y)</td><td>Invers Poissonfördelning</td></tr><tr><td>pow(x,y)</td><td>Potensfunktion</td></tr><tr><td>psi(x)</td><td>Psi (digamma) funktion</td></tr><tr><td>rgamma(x)</td><td>Reciprok Gamma</td></tr><tr><td>rint(x)</td><td>Avrunda till närmaste heltal</td></tr><tr><td>sin(x)</td><td>Sinus</td></tr><tr><td>sinh(x)</td><td>Sinus hyperbolicus</td></tr><tr><td>spence(x)</td><td>Dilogaritm</td></tr><tr><td>sqrt(x)</td><td>Kvadratrot</td></tr><tr><td>stdtr(k,t)</td><td>Student's t-fördelning</td></tr><tr><td>stdtri(k,p)</td><td>Invers student's t-fördelning</td></tr><tr><td>struve(v,x)</td><td>Struvefunktion</td></tr><tr><td>tan(x)</td><td>Tangens</td></tr><tr><td>tanh(x)</td><td>Tangens hyperbolicus</td></tr><tr><td>true_gamma(x)</td><td>true_gamma(x)</td></tr><tr><td>y0(x)</td><td>Bessel, andra slaget, ordning 0</td></tr><tr><td>y1(x)</td><td>Bessel, andra slaget, ordning 1</td></tr><tr><td>yn(n,x)</td><td>Bessel, andra slaget, ordning n</td></tr><tr><td>yv(v,x)</td><td>Bessel, icke-heltalsordning</td></tr><tr><td>zeta(x,y)</td><td>Riemann's Zeta-funktion </td></tr><tr><td>zetac(x)</td><td>Två-argument zeta funktion</td></tr></tbody></table></div></div></div><table width="100%" class="bottom-nav"><tr><td width="33%" align="left" valign="top" class="navLeft"><a href="advanced_topics.html">Föregående</a></td><td width="34%" align="center" valign="top" class="navCenter"><a href="index.html">Hem</a></td><td width="33%" align="right" valign="top" class="navRight"><a href="parser-gsl.html">Nästa</a></td></tr><tr><td width="33%" align="left" class="navLeft">Avancerade ämnen </td><td width="34%" align="center" class="navCenter"><a href="index.html">Upp</a></td><td width="33%" align="right" class="navRight"> GSL-specialfunktion</td></tr></table></body></html>