ArcCoth
Elementary Functions
ArcCoth[
z
]
Representations through equivalent functions
With related functions
Involving sinh
^{-1}
Involving coth
^{-1}
(
z
^{1/2}
) (68 formulas)
Involving coth
^{-1}
(
z
^{1/2}
) and sinh
^{-1}
(
i
(1+
z
)/1-
z
) (4 formulas)
Involving coth
^{-1}
(
z
^{1/2}
) and sinh
^{-1}
(
i
(
z
+1)/
z
-1) (4 formulas)
Involving coth
^{-1}
(
z
^{1/2}
) and sinh
^{-1}
(2
z
^{1/2}
/1-
z
) (5 formulas)
Involving coth
^{-1}
(
z
^{1/2}
) and sinh
^{-1}
(2
z
^{1/2}
/
z
-1) (5 formulas)
Involving coth
^{-1}
(
z
^{1/2}
) and sinh
^{-1}
(1/(
z
-1)
^{1/2}
) (3 formulas)
Involving coth
^{-1}
(
z
^{1/2}
) and sinh
^{-1}
(1/
z
-1
^{1/2}
) (4 formulas)
Involving coth
^{-1}
(
z
^{1/2}
) and sinh
^{-1}
(
z
^{1/2}
/(1-
z
)
^{1/2}
) (4 formulas)
Involving coth
^{-1}
(
z
^{1/2}
) and sinh
^{-1}
((-
z
)
^{1/2}
/(
z
-1)
^{1/2}
) (4 formulas)
Involving coth
^{-1}
(
z
^{1/2}
) and sinh
^{-1}
(
z
/1-
z
^{1/2}
) (3 formulas)
Involving coth
^{-1}
(
z
^{1/2}
) and sinh
^{-1}
((-(1-
z
)
^{1/2}
-1)
^{1/2}
/(2
^{1/2}
(1-
z
)
^{1/4}
)) (4 formulas)
Involving coth
^{-1}
(
z
^{1/2}
) and sinh
^{-1}
((1-(1-
z
)
^{1/2}
)
^{1/2}
/(2
^{1/2}
(1-
z
)
^{1/4}
)) (3 formulas)
Involving coth
^{-1}
(
z
^{1/2}
) and sinh
^{-1}
((-((1-
z
)
^{1/2}
+1)/(2(1-
z
)
^{1/2}
))
^{1/2}
) (5 formulas)
Involving coth
^{-1}
(
z
^{1/2}
) and sinh
^{-1}
(((1-(1-
z
)
^{1/2}
)/(2(1-
z
)
^{1/2}
))
^{1/2}
) (3 formulas)
Involving coth
^{-1}
(
z
^{1/2}
) and sinh
^{-1}
((-(1-
z
)
^{1/2}
-(-
z
)
^{1/2}
)
^{1/2}
/(2
^{1/2}
(1-
z
)
^{1/4}
)) (5 formulas)
Involving coth
^{-1}
(
z
^{1/2}
) and sinh
^{-1}
(((-
z
)
^{1/2}
-(1-
z
)
^{1/2}
)
^{1/2}
/(2
^{1/2}
(1-
z
)
^{1/4}
)) (4 formulas)
Involving coth
^{-1}
(
z
^{1/2}
) and sinh
^{-1}
((-((1-
z
)
^{1/2}
+(-
z
)
^{1/2}
)/(2(1-
z
)
^{1/2}
))
^{1/2}
) (4 formulas)
Involving coth
^{-1}
(
z
^{1/2}
) and sinh
^{-1}
((((-
z
)
^{1/2}
-(1-
z
)
^{1/2}
)/(2(1-
z
)
^{1/2}
))
^{1/2}
) (4 formulas)