%% 
%%  Ein Beispiel der DANTE-Edition
%%  Mathematiksatz mit LaTeX
%%  3. Auflage
%%  Beispiel 11-03-1 auf Seite 242.
%%  Copyright (C) 2018 Herbert Voss
%% 
%%  It may be distributed and/or modified under the conditions
%%  of the LaTeX Project Public License, either version 1.3
%%  of this license or (at your option) any later version.
%%  See http://www.latex-project.org/lppl.txt for details.
%% 
%% ==== 
% Show page(s) 1
%% 
%% 
\documentclass[10pt]{exaartplain}
\pagestyle{empty}
\setlength\textwidth{352.81416pt}
\setlength\parindent{0pt}
%StartShownPreambleCommands
\usepackage{unicode-math,rotating,array,booktabs}
\newcommand\defmathfont[2]{\setmathfont[version=#1]{#2}}
\defmathfont{LM}{latinmodern-math.otf}%{CC6666}
\defmathfont{XITS}{xits-math.otf}%{CCCC66}
%\defmathfont{STIX}{STIXMath-Regular.otf}%{AA66CC}
\defmathfont{Cambria}{Cambria Math}%{66CCCC}
\defmathfont{Asana}{Asana-Math.otf}%{6666CC}
\defmathfont{Pagella}{texgyrepagella-math.otf}%{AA6666}
\defmathfont{DejaVu}{texgyredejavu-math.otf}%{AACC66}
\defmathfont{Minion}{Minion Math}%{AACC66}
%\defmathfont[math-style=upright]{Euler}{euler.otf}%{CC66CC}
%%
\defmathfont{Bonum}{texgyrebonum-math.otf}%{AACC66}
\defmathfont{Schola}{texgyreschola-math.otf}%{AACC66}
\defmathfont{Termes}{texgyretermes-math.otf}%{AACC66}
\defmathfont{STIXII}{STIX2Math.otf}%{AA66CC}
\defmathfont{Libertinus}{libertinusmath-regular.otf}%{AACC66}
\defmathfont{Hellenic}{GFSNeohellenicMath.otf}%{AACC66}
\defmathfont{Lucida}{LucidaBrightMathOT.otf}%{AACC66}
\defmathfont{Fira}{FiraMath-Regular.otf}%{AACC66}
\def\rb#1{\rlap{\rotatebox{45}{#1}}}
%StopShownPreambleCommands
\begin{document}
\tabcolsep=2pt
\begin{tabular}{*8c}\toprule
%\rb{Computer Modern} &
\rb{Euler} & \rb{Asana} & \rb{XITS} % & \rb{STIX}
  & \rb{STIX2} & \rb{Cambria} & \rb{Lucida} & \rb{LM} & \rb{Minion}\\\toprule
\setmathfont[math-style=upright]{Neo Euler}$\displaystyle\sqrt[a]{b}$
       & \mathversion{Asana}$\displaystyle\sqrt[a]{b}$
       & \mathversion{XITS}$\displaystyle\sqrt[a]{b}$
    %   & \mathversion{STIX}$\displaystyle\sqrt[a]{b}$
       & \mathversion{STIXII}$\displaystyle\sqrt[a]{b}$
       & \mathversion{Cambria}$\displaystyle\sqrt[a]{b}$
       & \mathversion{Lucida}$\displaystyle\sqrt[a]{b}$
       & \mathversion{LM}$\displaystyle\sqrt[a]{b}$
       & \mathversion{Minion}$\displaystyle\sqrt[a]{b}$
\\
\setmathfont[math-style=upright]{Neo Euler}$\displaystyle\int\limits_1^{\infty}\frac1{x^2}\symup dx$
                                   & \mathversion{Asana}$\displaystyle\int\limits_1^{\infty}\frac1{x^2}\symup dx$
                                   & \mathversion{XITS}$\displaystyle\int\limits_1^{\infty}\frac1{x^2}\symup dx$
%       & \mathversion{STIX}$\displaystyle\int\limits_1^{\infty}\frac1{x^2}\symup dx$
       & \mathversion{STIXII}$\displaystyle\int\limits_1^{\infty}\frac1{x^2}\symup dx$
       & \mathversion{Cambria}$\displaystyle\int\limits_1^{\infty}\frac1{x^2}\symup dx$
       & \mathversion{Lucida}$\displaystyle\int\limits_1^{\infty}\frac1{x^2}\symup dx$
       & \mathversion{LM}$\displaystyle\int\limits_1^{\infty}\frac1{x^2}\symup dx$
       & \mathversion{Minion}$\displaystyle\int\limits_1^{\infty}\frac1{x^2}\symup dx$
\\\midrule
\rb{Pagella} & \rb{DejaVu}  & \rb{Bonum}  & \rb{Schola}  & \rb{Termes}  & \rb{Libertinus}
    & \rb{Hellenic} & \rb{Fira}\\\midrule
        \mathversion{Pagella}$\displaystyle\sqrt[a]{b}$
       & \mathversion{DejaVu}$\displaystyle\sqrt[a]{b}$
       & \mathversion{Bonum}$\displaystyle\sqrt[a]{b}$
       & \mathversion{Schola}$\displaystyle\sqrt[a]{b}$
       & \mathversion{Termes}$\displaystyle\sqrt[a]{b}$
       & \mathversion{Libertinus}$\displaystyle\sqrt[a]{b}$
       & \mathversion{Hellenic}$\displaystyle\sqrt[a]{b}$
       & \mathversion{Fira}$\displaystyle\sqrt[a]{b}$
\\
        \mathversion{Pagella}$\displaystyle\int\limits_1^{\infty}\frac1{x^2}\symup dx$
       & \mathversion{DejaVu}$\displaystyle\int\limits_1^{\infty}\frac1{x^2}\symup dx$
       & \mathversion{Bonum}$\displaystyle\int\limits_1^{\infty}\frac1{x^2}\symup dx$
       & \mathversion{Schola}$\displaystyle\int\limits_1^{\infty}\frac1{x^2}\symup dx$
       & \mathversion{Termes}$\displaystyle\int\limits_1^{\infty}\frac1{x^2}\symup dx$
       & \mathversion{Libertinus}$\displaystyle\int\limits_1^{\infty}\frac1{x^2}\symup dx$
       & \mathversion{Hellenic}$\displaystyle\int\limits_1^{\infty}\frac1{x^2}\symup dx$
       & \mathversion{Fira}$\displaystyle\int\limits_1^{\infty}\frac1{x^2}\symup dx$
\\
\bottomrule
\end{tabular}
\end{document}