gudermanniana - definitie. Wat is gudermanniana
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Wat (wie) is gudermanniana - definitie

Função Gudermanniana; Função de Gudermann

Função gudermanniana         
A função gudermanniana, chamada assim em homenagem a Christoph Gudermann (1798 - 1852), relaciona as funções trigonométricas e as funções hiperbólicas.
gudermanniana      
s.f. -anl.mat a função arco tangente do seno hiperbólico de x
-etim antr. C. Gudermann (1798-1852, matemático al.) + -iana (fem. de -iano )

Wikipedia

Função gudermanniana

A função gudermanniana, chamada assim em homenagem a Christoph Gudermann (1798 - 1852), relaciona as funções trigonométricas e as funções hiperbólicas.

Definição:

   
  
    
      
        
          
            
              
                
                  
                    g
                    d
                  
                
                (
                x
                )
              
              
                
                =
                
                  
                  
                    0
                  
                  
                    x
                  
                
                
                  
                    
                      d
                      p
                    
                    
                      cosh
                      
                      (
                      p
                      )
                    
                  
                
                ,
              
            
            
              
              
                
                =
                arcsin
                
                
                  (
                  
                    tanh
                    
                    (
                    x
                    )
                  
                  )
                
                =
                arccos
                
                
                  (
                  
                    
                      
                        sech
                      
                    
                    (
                    x
                    )
                  
                  )
                
                ,
              
            
            
              
              
                
                =
                arctan
                
                
                  (
                  
                    sinh
                    
                    (
                    x
                    )
                  
                  )
                
                =
                
                  
                    arcsec
                  
                
                
                  (
                  
                    cosh
                    
                    (
                    x
                    )
                  
                  )
                
                ,
              
            
            
              
              
                
                =
                
                  
                    arccot
                  
                
                
                  (
                  
                    
                      
                        csch
                      
                    
                    (
                    x
                    )
                  
                  )
                
                =
                
                  
                    arccsc
                  
                
                
                  (
                  
                    coth
                    
                    (
                    x
                    )
                  
                  )
                
                ,
              
            
            
              
              
                
                =
                2
                arctan
                
                
                  (
                  
                    tanh
                    
                    
                      (
                      
                        
                          x
                          2
                        
                      
                      )
                    
                  
                  )
                
                =
                2
                arctan
                
                (
                
                  e
                  
                    x
                  
                
                )
                
                
                  
                    π
                    2
                  
                
                .
              
            
          
        
        
        
      
    
    {\displaystyle {\begin{aligned}{\rm {gd}}(x)&=\int _{0}^{x}{\frac {dp}{\cosh(p)}},\\&=\arcsin \left(\tanh(x)\right)=\arccos \left({\mbox{sech}}(x)\right),\\&=\arctan \left(\sinh(x)\right)={\mbox{arcsec}}\left(\cosh(x)\right),\\&={\mbox{arccot}}\left({\mbox{csch}}(x)\right)={\mbox{arccsc}}\left(\coth(x)\right),\\&=2\arctan \left(\tanh \left({\frac {x}{2}}\right)\right)=2\arctan(e^{x})-{\frac {\pi }{2}}.\end{aligned}}\,\!}
  

Identidades envolvendo gd(x) :

  
  
    
      
        
          
            
              
                
                  
                    
                      
                        
                          
                            sin
                            
                            (
                            
                              
                                gd
                              
                            
                            (
                            x
                            )
                            )
                          
                          ˙
                        
                      
                    
                  
                
              
              
                
                =
                tanh
                
                (
                x
                )
                ;
                
                cos
                
                (
                
                  
                    gd
                  
                
                (
                x
                )
                )
                =
                
                  
                    sech
                  
                
                (
                x
                )
                ;
              
            
            
              
                tan
                
                (
                
                  
                    gd
                  
                
                (
                x
                )
                )
              
              
                
                =
                sinh
                
                (
                x
                )
                ;
                
                
                sec
                
                (
                
                  
                    gd
                  
                
                (
                x
                )
                )
                =
                cosh
                
                (
                x
                )
                ;
              
            
            
              
                cot
                
                (
                
                  
                    gd
                  
                
                (
                x
                )
                )
              
              
                
                =
                
                  
                    csch
                  
                
                (
                x
                )
                ;
                
                
                csc
                
                (
                
                  
                    gd
                  
                
                (
                x
                )
                )
                =
                coth
                
                (
                x
                )
                ;
              
            
            
              
                
                  

                  
                  
                    
                      .
                    
                  
                
                tan
                
                
                  (
                  
                    
                      
                        
                          
                            gd
                          
                        
                        (
                        x
                        )
                      
                      2
                    
                  
                  )
                
              
              
                
                =
                tanh
                
                
                  (
                  
                    
                      x
                      2
                    
                  
                  )
                
                .
              
            
          
        
        
        
      
    
    {\displaystyle {\begin{aligned}{\color {white}{\dot {\color {black}\sin({\mbox{gd}}(x))}}}&=\tanh(x);\quad \cos({\mbox{gd}}(x))={\mbox{sech}}(x);\\\tan({\mbox{gd}}(x))&=\sinh(x);\quad \;\sec({\mbox{gd}}(x))=\cosh(x);\\\cot({\mbox{gd}}(x))&={\mbox{csch}}(x);\quad \,\csc({\mbox{gd}}(x))=\coth(x);\\{}_{\color {white}.}\tan \left({\frac {{\mbox{gd}}(x)}{2}}\right)&=\tanh \left({\frac {x}{2}}\right).\end{aligned}}\,\!}
  

A função gudermanniana inversa.

   
  
    
      
        
          
            
              
                
                  
                    arcgd
                  
                
                (
                x
                )
              
              
                
                =
                
                  
                    
                      g
                      d
                    
                  
                  
                    
                    1
                  
                
                (
                x
                )
                =
                
                  
                  
                    0
                  
                  
                    x
                  
                
                
                  
                    
                      d
                      p
                    
                    
                      cos
                      
                      (
                      p
                      )
                    
                  
                
                ,
              
            
            
              
              
                
                =
                

                
                
                  
                    arccosh
                  
                
                (
                sec
                
                (
                x
                )
                )
                =
                
                  
                    arctanh
                  
                
                (
                sin
                
                (
                x
                )
                )
                ,
              
            
            
              
              
                
                =
                

                
                ln
                
                
                  (
                  
                    sec
                    
                    (
                    x
                    )
                    (
                    1
                    +
                    sin
                    
                    (
                    x
                    )
                    )
                  
                  )
                
                ,
              
            
            
              
              
                
                =
                

                
                ln
                
                (
                tan
                
                (
                x
                )
                +
                sec
                
                (
                x
                )
                )
                =
                ln
                
                tan
                
                
                  (
                  
                    
                      
                        π
                        4
                      
                    
                    +
                    
                      
                        x
                        2
                      
                    
                  
                  )
                
                ,
              
            
            
              
              
                
                =
                

                
                
                  
                    1
                    2
                  
                
                ln
                
                
                  
                    
                      1
                      +
                      sin
                      
                      (
                      x
                      )
                    
                    
                      1
                      
                      sin
                      
                      (
                      x
                      )
                    
                  
                
                .
              
            
          
        
        
        
      
    
    {\displaystyle {\begin{aligned}{\mbox{arcgd}}(x)&={\rm {gd}}^{-1}(x)=\int _{0}^{x}{\frac {dp}{\cos(p)}},\\&={}{\mbox{arccosh}}(\sec(x))={\mbox{arctanh}}(\sin(x)),\\&={}\ln \left(\sec(x)(1+\sin(x))\right),\\&={}\ln(\tan(x)+\sec(x))=\ln \tan \left({\frac {\pi }{4}}+{\frac {x}{2}}\right),\\&={}{\frac {1}{2}}\ln {\frac {1+\sin(x)}{1-\sin(x)}}.\end{aligned}}\,\!}
  

A derivada da função gudermanniana e sua inversa são:

   
  
    
      
        
          
            d
            
              d
              x
            
          
        
        
          
            gd
          
        
        (
        x
        )
        =
        
          
            sech
          
        
        (
        x
        )
        ;
        
        
          
            d
            
              d
              x
            
          
        
        
          
            arcgd
          
        
        (
        x
        )
        =
        sec
        
        (
        x
        )
        .
        
        
      
    
    {\displaystyle {\frac {d}{dx}}{\mbox{gd}}(x)={\mbox{sech}}(x);\quad {\frac {d}{dx}}{\mbox{arcgd}}(x)=\sec(x).\,\!}