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ArcCoth




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Elementary Functions > ArcCoth[z] > Representations through equivalent functions > With related functions > Involving sinh-1





Involving coth-1(1/z1/2) (62 formulas)


>   Involving coth-1(1/z1/2) and sinh-1(i(1+z)/1-z) (4 formulas)
>   Involving coth-1(1/z1/2) and sinh-1(i(z+1)/z-1) (4 formulas)
>   Involving coth-1(1/z1/2) and sinh-1(2 z1/2/1-z) (5 formulas)
>   Involving coth-1(1/z1/2) and sinh-1(2 z1/2/z-1) (5 formulas)
>   Involving coth-1(1/z1/2) and sinh-1(1/(z-1)1/2) (4 formulas)
>   Involving coth-1(1/z1/2) and sinh-1(1/z-11/2) (4 formulas)
>   Involving coth-1(1/z1/2) and sinh-1(z1/2/(1-z)1/2) (3 formulas)
>   Involving coth-1(1/z1/2) and sinh-1((-z)1/2/(z-1)1/2) (4 formulas)
>   Involving coth-1(1/z1/2) and sinh-1(z/1-z1/2) (3 formulas)
>   Involving coth-1(1/z1/2) and sinh-1((-(1-z)1/2-1)1/2/(21/2(1-z)1/4)) (4 formulas)
>   Involving coth-1(1/z1/2) and sinh-1((1-(1-z)1/2)1/2/(21/2(1-z)1/4)) (1 formula)
>   Involving coth-1(1/z1/2) and sinh-1((-((1-z)1/2+1)/(2(1-z)1/2))1/2) (4 formulas)
>   Involving coth-1(1/z1/2) and sinh-1(((1-(1-z)1/2)/(2(1-z)1/2))1/2) (1 formula)
>   Involving coth-1(1/z1/2) and sinh-1((-(1-z)1/2-(-z)1/2)1/2/(21/2(1-z)1/4)) (4 formulas)
>   Involving coth-1(1/z1/2) and sinh-1(((-z)1/2-(1-z)1/2)1/2/(21/2(1-z)1/4)) (4 formulas)
>   Involving coth-1(1/z1/2) and sinh-1((-((1-z)1/2+(-z)1/2)/(2(1-z)1/2))1/2) (4 formulas)
>   Involving coth-1(1/z1/2) and sinh-1((((-z)1/2-(1-z)1/2)/(2(1-z)1/2))1/2) (4 formulas)