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InverseJacobiCS






Mathematica Notation

Traditional Notation









Elliptic Functions > InverseJacobiCS[z,m] > Integral representations > On the real axis > Of the direct function





http://functions.wolfram.com/09.39.07.0003.01









  


  










Input Form





InverseJacobiCS[z, m] == ((Sqrt[1 - m + z^2] JacobiND[InverseJacobiCS[z, m], m])/Sqrt[1 + z^2]) Integrate[1/(Sqrt[t^2 + 1] Sqrt[t^2 - m + 1]), {t, z, Infinity}] /; !Exists[\[Tau], {Element[\[Tau], Reals], 0 < \[Tau] < 1}, Im[(z + Tan[(Pi \[Tau])/2])^2 + 1] == 0 && (z + Tan[(Pi \[Tau])/2])^2 + 1 < 0 && Im[(z + Tan[(Pi \[Tau])/2])^2 - m + 1] == 0 && (z + Tan[(Pi \[Tau])/2])^2 - m + 1 < 0]










Standard Form





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MathML Form







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</ci> </bvar> <bvar> <list> <apply> <in /> <ci> &#964; </ci> <reals /> </apply> <apply> <lt /> <cn type='integer'> 0 </cn> <ci> &#964; </ci> <cn type='integer'> 1 </cn> </apply> </list> </bvar> <apply> <and /> <apply> <eq /> <apply> <imaginary /> <apply> <plus /> <apply> <power /> <apply> <plus /> <ci> z </ci> <apply> <tan /> <apply> <times /> <pi /> <ci> &#964; </ci> <apply> <power /> <cn type='integer'> 2 </cn> <cn type='integer'> -1 </cn> </apply> </apply> </apply> </apply> <cn type='integer'> 2 </cn> </apply> <cn type='integer'> 1 </cn> </apply> </apply> <cn type='integer'> 0 </cn> </apply> <apply> <lt /> <apply> <plus /> <apply> <power /> <apply> <plus /> <ci> z </ci> <apply> <tan /> <apply> <times /> <pi /> <ci> &#964; </ci> <apply> <power /> <cn type='integer'> 2 </cn> <cn type='integer'> -1 </cn> </apply> </apply> </apply> </apply> <cn type='integer'> 2 </cn> </apply> <cn type='integer'> 1 </cn> </apply> <cn type='integer'> 0 </cn> </apply> <apply> <eq /> <apply> <imaginary /> <apply> <plus /> <apply> <power /> <apply> <plus /> <ci> z </ci> <apply> <tan /> <apply> <times /> <pi /> <ci> &#964; 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Rule Form





Cell[BoxData[RowBox[List[RowBox[List["HoldPattern", "[", RowBox[List["InverseJacobiCS", "[", RowBox[List["z_", ",", "m_"]], "]"]], "]"]], "\[RuleDelayed]", RowBox[List[FractionBox[RowBox[List[RowBox[List["(", RowBox[List[SqrtBox[RowBox[List["1", "-", "m", "+", SuperscriptBox["z", "2"]]]], " ", RowBox[List["JacobiND", "[", RowBox[List[RowBox[List["InverseJacobiCS", "[", RowBox[List["z", ",", "m"]], "]"]], ",", "m"]], "]"]]]], ")"]], " ", RowBox[List[SubsuperscriptBox["\[Integral]", "z", "\[Infinity]"], RowBox[List[FractionBox["1", RowBox[List[SqrtBox[RowBox[List[SuperscriptBox["t", "2"], "+", "1"]]], " ", SqrtBox[RowBox[List[SuperscriptBox["t", "2"], "-", "m", "+", "1"]]]]]], RowBox[List["\[DifferentialD]", "t"]]]]]]]], SqrtBox[RowBox[List["1", "+", SuperscriptBox["z", "2"]]]]], "/;", RowBox[List["!", RowBox[List[SubscriptBox["\[Exists]", RowBox[List["\[Tau]", ",", RowBox[List["{", RowBox[List[RowBox[List["\[Tau]", "\[Element]", "Reals"]], ",", RowBox[List["0", "<", "\[Tau]", "<", "1"]]]], "}"]]]]], RowBox[List["(", RowBox[List[RowBox[List[RowBox[List["Im", "[", RowBox[List[SuperscriptBox[RowBox[List["(", RowBox[List["z", "+", RowBox[List["Tan", "[", FractionBox[RowBox[List["\[Pi]", " ", "\[Tau]"]], "2"], "]"]]]], ")"]], "2"], "+", "1"]], "]"]], "\[Equal]", "0"]], "&&", RowBox[List[RowBox[List[SuperscriptBox[RowBox[List["(", RowBox[List["z", "+", RowBox[List["Tan", "[", FractionBox[RowBox[List["\[Pi]", " ", "\[Tau]"]], "2"], "]"]]]], ")"]], "2"], "+", "1"]], "<", "0"]], "&&", RowBox[List[RowBox[List["Im", "[", RowBox[List[SuperscriptBox[RowBox[List["(", RowBox[List["z", "+", RowBox[List["Tan", "[", FractionBox[RowBox[List["\[Pi]", " ", "\[Tau]"]], "2"], "]"]]]], ")"]], "2"], "-", "m", "+", "1"]], "]"]], "\[Equal]", "0"]], "&&", RowBox[List[RowBox[List[SuperscriptBox[RowBox[List["(", RowBox[List["z", "+", RowBox[List["Tan", "[", FractionBox[RowBox[List["\[Pi]", " ", "\[Tau]"]], "2"], "]"]]]], ")"]], "2"], "-", "m", "+", "1"]], "<", "0"]]]], ")"]]]]]]]]]]]]










Date Added to functions.wolfram.com (modification date)





2007-05-02