texmath-0.12.8: test/writer/tex/complex2.test
<<< native
[ EArray
[ AlignCenter , AlignCenter ]
[ [ [ EText TextNormal "Quadratic Equation" ]
, [ EGrouped
[ EIdentifier "x"
, ESymbol Rel "="
, EFraction
NormalFrac
(EGrouped
[ ESymbol Bin "-"
, EIdentifier "b"
, ESymbol Bin "\177"
, ESqrt
(EGrouped
[ ESubsup (EIdentifier "b") (EGrouped []) (ENumber "2")
, ESymbol Bin "-"
, ENumber "4"
, EIdentifier "a"
, EIdentifier "c"
])
])
(EGrouped [ ENumber "2" , EIdentifier "a" ])
]
]
]
, [ [ EText TextNormal "DisplayQuadratic Equation" ]
, [ EGrouped
[ EIdentifier "x"
, ESymbol Rel "="
, EFraction
NormalFrac
(EGrouped
[ ESymbol Bin "-"
, EIdentifier "b"
, ESymbol Bin "\177"
, ESqrt
(EGrouped
[ ESubsup (EIdentifier "b") (EGrouped []) (ENumber "2")
, ESymbol Bin "-"
, ENumber "4"
, EIdentifier "a"
, EIdentifier "c"
])
])
(EGrouped [ ENumber "2" , EIdentifier "a" ])
]
]
]
, [ [ EText TextNormal "Rational Function" ]
, [ EGrouped
[ EIdentifier "f"
, ESymbol Open "("
, EIdentifier "x"
, ESymbol Close ")"
, ESymbol Rel "="
, EFraction
NormalFrac
(EGrouped
[ ENumber "1"
, ESymbol Bin "-"
, ESubsup (EIdentifier "x") (EGrouped []) (ENumber "2")
])
(EGrouped
[ ENumber "1"
, ESymbol Bin "-"
, ESubsup (EIdentifier "x") (EGrouped []) (ENumber "3")
])
]
]
]
, [ [ EText TextNormal "Rational Function" ]
, [ EGrouped
[ EIdentifier "f"
, ESymbol Open "("
, EIdentifier "x"
, ESymbol Close ")"
, ESymbol Rel "="
, EFraction
NormalFrac
(EGrouped
[ ESymbol Open "("
, ENumber "1"
, ESymbol Bin "-"
, ESubsup (EIdentifier "x") (EGrouped []) (ENumber "2")
, ESymbol Close ")"
, ESubsup (EIdentifier "x") (EGrouped []) (ENumber "3")
])
(EGrouped
[ ENumber "1"
, ESymbol Bin "-"
, ESubsup (EIdentifier "x") (EGrouped []) (ENumber "3")
])
]
]
]
, [ [ EText TextNormal "Rational Function" ]
, [ EGrouped
[ EIdentifier "f"
, ESymbol Open "("
, EIdentifier "x"
, ESymbol Close ")"
, ESymbol Rel "="
, EFraction
NormalFrac
(EGrouped
[ ESymbol Open "("
, ENumber "1"
, ESymbol Bin "-"
, ESubsup (EIdentifier "x") (EGrouped []) (ENumber "2")
, ESymbol Close ")"
, ESymbol Open "("
, ESubsup (EIdentifier "x") (EGrouped []) (ENumber "3")
, ESymbol Bin "-"
, ENumber "5"
, EIdentifier "x"
, ESymbol Close ")"
])
(EGrouped
[ ENumber "1"
, ESymbol Bin "-"
, ESubsup (EIdentifier "x") (EGrouped []) (ENumber "3")
])
]
]
]
, [ [ EText TextNormal "Parametrize Rational Function" ]
, [ EGrouped
[ EIdentifier "f"
, ESymbol Open "("
, EIdentifier "x"
, ESymbol Close ")"
, ESymbol Rel "="
, EFraction
NormalFrac
(EGrouped
[ ESymbol Open "("
, ESubsup (EIdentifier "a") (EIdentifier "i") (EGrouped [])
, ESymbol Bin "-"
, ESubsup (EIdentifier "x") (EGrouped []) (ENumber "2")
, ESubsup (ESymbol Close ")") (EGrouped []) (ENumber "5")
])
(EGrouped
[ ENumber "1"
, ESymbol Bin "-"
, ESubsup (EIdentifier "x") (EGrouped []) (ENumber "3")
])
]
]
]
, [ [ EText TextNormal "Stacked exponents" ]
, [ EGrouped
[ EIdentifier "g"
, ESymbol Open "("
, EIdentifier "z"
, ESymbol Close ")"
, ESymbol Rel "="
, ESubsup
(EIdentifier "e")
(EGrouped [])
(EGrouped
[ ESymbol Bin "-"
, ESubsup (EIdentifier "x") (EGrouped []) (ENumber "2")
])
]
]
]
, [ [ EText TextNormal "Stacked exponents" ]
, [ EGrouped
[ EIdentifier "g"
, ESymbol Open "("
, EIdentifier "z"
, ESymbol Close ")"
, ESymbol Rel "="
, ESubsup
(EIdentifier "e")
(EGrouped [])
(EGrouped
[ ESymbol Bin "-"
, ESymbol Open "("
, EIdentifier "z"
, ESymbol Bin "-"
, EIdentifier "a"
, ESubsup (ESymbol Close ")") (EGrouped []) (ENumber "2")
])
]
]
]
, [ [ EText TextNormal "Stacked exponents" ]
, [ EGrouped
[ EIdentifier "g"
, ESymbol Open "("
, EIdentifier "z"
, ESymbol Close ")"
, ESymbol Rel "="
, ESubsup
(EIdentifier "e")
(EGrouped [])
(EGrouped
[ ESymbol Bin "-"
, EUnderover
False
(ESymbol Op "\8721")
(EGrouped [ EIdentifier "i" , ESymbol Rel "=" , ENumber "0" ])
(EIdentifier "\8734")
, ESubsup (EIdentifier "z") (EIdentifier "i") (ENumber "2")
])
]
]
]
, [ [ EText TextNormal "Stacked exponents" ]
, [ EGrouped
[ EIdentifier "g"
, ESymbol Open "("
, EIdentifier "y"
, ESymbol Close ")"
, ESymbol Rel "="
, ESubsup
(EIdentifier "e")
(EGrouped [])
(EGrouped
[ ESymbol Bin "-"
, EUnderover
False
(ESymbol Op "\8721")
(EGrouped [ EIdentifier "i" , ESymbol Rel "=" , ENumber "0" ])
(EIdentifier "\8734")
, ESubsup (EIdentifier "y") (EIdentifier "i") (ENumber "2")
])
]
]
]
, [ [ EText TextNormal "Stacked exponents" ]
, [ EGrouped
[ EIdentifier "g"
, ESymbol Open "("
, EIdentifier "z"
, ESymbol Close ")"
, ESymbol Rel "="
, ESubsup
(EIdentifier "e")
(EGrouped [])
(EGrouped
[ ESymbol Bin "-"
, EUnderover
False
(ESymbol Op "\8721")
(EGrouped [ EIdentifier "i" , ESymbol Rel "=" , ENumber "0" ])
(EIdentifier "\8734")
, ESubsup
(EIdentifier "z")
(EGrouped [])
(EFraction
NormalFrac
(ENumber "2")
(EGrouped [ EIdentifier "a" , ESymbol Bin "-" , EIdentifier "i" ]))
])
]
]
]
, [ [ EText TextNormal "Cross Product" ]
, [ EGrouped
[ EFraction
NormalFrac
(EGrouped
[ ESubsup (EIdentifier "x") (ENumber "1") (EGrouped [])
, ESymbol Bin "-"
, ESubsup (EIdentifier "x") (ENumber "2") (EGrouped [])
])
(EGrouped
[ ESubsup (EIdentifier "x") (ENumber "3") (EGrouped [])
, ESymbol Bin "-"
, ESubsup (EIdentifier "x") (ENumber "4") (EGrouped [])
])
, EFraction
NormalFrac
(EGrouped
[ ESubsup (EIdentifier "x") (ENumber "1") (EGrouped [])
, ESymbol Bin "-"
, ESubsup (EIdentifier "x") (ENumber "4") (EGrouped [])
])
(EGrouped
[ ESubsup (EIdentifier "x") (ENumber "2") (EGrouped [])
, ESymbol Bin "-"
, ESubsup (EIdentifier "x") (ENumber "3") (EGrouped [])
])
]
]
]
, [ [ EText TextNormal "Cross Product" ]
, [ EGrouped
[ ESymbol Open "("
, EFraction
NormalFrac
(EGrouped
[ ESubsup (EIdentifier "x") (ENumber "1") (EGrouped [])
, ESymbol Bin "-"
, ESubsup (EIdentifier "x") (ENumber "2") (EGrouped [])
])
(EGrouped
[ ESubsup (EIdentifier "x") (ENumber "3") (EGrouped [])
, ESymbol Bin "-"
, ESubsup (EIdentifier "x") (ENumber "4") (EGrouped [])
])
, ESymbol Close ")"
, ESymbol Open "("
, EFraction
NormalFrac
(EGrouped
[ ESubsup (EIdentifier "x") (ENumber "1") (EGrouped [])
, ESymbol Bin "-"
, ESubsup (EIdentifier "x") (ENumber "4") (EGrouped [])
])
(EGrouped
[ ESubsup (EIdentifier "x") (ENumber "2") (EGrouped [])
, ESymbol Bin "-"
, ESubsup (EIdentifier "x") (ENumber "3") (EGrouped [])
])
, ESymbol Close ")"
]
]
]
, [ [ EText TextNormal "Cross Product" ]
, [ EGrouped
[ EDelimited
"("
")"
[ Right
(EFraction
NormalFrac
(EGrouped
[ ESubsup (EIdentifier "x") (ENumber "1") (EGrouped [])
, ESymbol Bin "-"
, ESubsup (EIdentifier "x") (ENumber "2") (EGrouped [])
])
(EGrouped
[ ESubsup (EIdentifier "x") (ENumber "3") (EGrouped [])
, ESymbol Bin "-"
, ESubsup (EIdentifier "x") (ENumber "4") (EGrouped [])
]))
]
, EDelimited
"("
")"
[ Right
(EFraction
NormalFrac
(EGrouped
[ ESubsup (EIdentifier "x") (ENumber "1") (EGrouped [])
, ESymbol Bin "-"
, ESubsup (EIdentifier "x") (ENumber "4") (EGrouped [])
])
(EGrouped
[ ESubsup (EIdentifier "x") (ENumber "2") (EGrouped [])
, ESymbol Bin "-"
, ESubsup (EIdentifier "x") (ENumber "3") (EGrouped [])
]))
]
]
]
]
, [ [ EText TextNormal "Cross Product" ]
, [ EFraction
NormalFrac
(EGrouped
[ ESymbol Open "("
, ESubsup (EIdentifier "x") (ENumber "1") (EGrouped [])
, ESymbol Bin "-"
, ESubsup (EIdentifier "x") (ENumber "2") (EGrouped [])
, ESymbol Close ")"
, ESymbol Open "("
, ESubsup (EIdentifier "x") (ENumber "3") (EGrouped [])
, ESymbol Bin "-"
, ESubsup (EIdentifier "x") (ENumber "4") (EGrouped [])
, ESymbol Close ")"
])
(EGrouped
[ ESymbol Open "("
, ESubsup (EIdentifier "x") (ENumber "1") (EGrouped [])
, ESymbol Bin "-"
, ESubsup (EIdentifier "x") (ENumber "4") (EGrouped [])
, ESymbol Close ")"
, ESymbol Open "("
, ESubsup (EIdentifier "x") (ENumber "2") (EGrouped [])
, ESymbol Bin "-"
, ESubsup (EIdentifier "x") (ENumber "3") (EGrouped [])
, ESymbol Close ")"
])
]
]
]
]
>>> tex
\begin{matrix}
\text{Quadratic Equation} & {x = \frac{- b \pm \sqrt{b_{}^{2} - 4ac}}{2a}} \\
\text{DisplayQuadratic Equation} & {x = \frac{- b \pm \sqrt{b_{}^{2} - 4ac}}{2a}} \\
\text{Rational Function} & {f(x) = \frac{1 - x_{}^{2}}{1 - x_{}^{3}}} \\
\text{Rational Function} & {f(x) = \frac{(1 - x_{}^{2})x_{}^{3}}{1 - x_{}^{3}}} \\
\text{Rational Function} & {f(x) = \frac{(1 - x_{}^{2})(x_{}^{3} - 5x)}{1 - x_{}^{3}}} \\
\text{Parametrize Rational Function} & {f(x) = \frac{(a_{i}^{} - x_{}^{2})_{}^{5}}{1 - x_{}^{3}}} \\
\text{Stacked exponents} & {g(z) = e_{}^{- x_{}^{2}}} \\
\text{Stacked exponents} & {g(z) = e_{}^{- (z - a)_{}^{2}}} \\
\text{Stacked exponents} & {g(z) = e_{}^{- \sum\limits_{i = 0}^{\infty}z_{i}^{2}}} \\
\text{Stacked exponents} & {g(y) = e_{}^{- \sum\limits_{i = 0}^{\infty}y_{i}^{2}}} \\
\text{Stacked exponents} & {g(z) = e_{}^{- \sum\limits_{i = 0}^{\infty}z_{}^{\frac{2}{a - i}}}} \\
\text{Cross Product} & {\frac{x_{1}^{} - x_{2}^{}}{x_{3}^{} - x_{4}^{}}\frac{x_{1}^{} - x_{4}^{}}{x_{2}^{} - x_{3}^{}}} \\
\text{Cross Product} & {(\frac{x_{1}^{} - x_{2}^{}}{x_{3}^{} - x_{4}^{}})(\frac{x_{1}^{} - x_{4}^{}}{x_{2}^{} - x_{3}^{}})} \\
\text{Cross Product} & {\left( \frac{x_{1}^{} - x_{2}^{}}{x_{3}^{} - x_{4}^{}} \right)\left( \frac{x_{1}^{} - x_{4}^{}}{x_{2}^{} - x_{3}^{}} \right)} \\
\text{Cross Product} & \frac{(x_{1}^{} - x_{2}^{})(x_{3}^{} - x_{4}^{})}{(x_{1}^{} - x_{4}^{})(x_{2}^{} - x_{3}^{})}
\end{matrix}