Difference between revisions of "Coth"
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The hyperbolic cotangent is defined by | The hyperbolic cotangent is defined by | ||
− | $$\mathrm{coth}(z)=\dfrac{1}{\tanh(z)},$$ | + | $$\mathrm{coth}(z)=\dfrac{1}{\tanh(z)}=\dfrac{\mathrm{cosh}(z)}{\mathrm{sinh}(z)},$$ |
where $\tanh$ denotes the [[Tanh|hyperbolic tangent]] function. | where $\tanh$ denotes the [[Tanh|hyperbolic tangent]] function. | ||
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=Properties= | =Properties= | ||
− | + | [[Derivative of coth]]<br /> | |
− | + | [[Antiderivative of coth]]<br /> | |
− | + | [[Relationship between coth and csch]]<br /> | |
− | + | [[Relationship between coth and cot]]<br /> | |
− | + | [[Relationship between cot and coth]]<br /> | |
− | + | [[Relationship between csc, Gudermannian, and coth]]<br /> | |
+ | [[Relationship between coth, inverse Gudermannian, and csc]]<br /> | ||
+ | [[Pythagorean identity for coth and csch]]<br /> | ||
+ | [[Coth of a sum]]<br /> | ||
+ | [[z coth(z) = 2z/(e^(2z)-1) + z]]<br /> | ||
+ | [[z coth(z) = sum of 2^(2n)B_(2n) z^(2n)/(2n)!]]<br /> | ||
+ | [[z coth(z) = 2 Sum of (-1)^(n+1) zeta(2n) z^(2n)/pi^(2n)]]<br /> | ||
+ | |||
+ | =Videos= | ||
+ | [https://www.youtube.com/watch?v=Pz7BDxef3HU Calculus I - Derivative of Hyperbolic Cotangent Function coth(x) - Proof] | ||
=See Also= | =See Also= | ||
[[Arccoth]] | [[Arccoth]] | ||
− | + | =References= | |
+ | * {{BookReference|Handbook of mathematical functions|1964|Milton Abramowitz|author2=Irene A. Stegun|prev=Sech|next=Relationship between sinh and sin}}: $4.5.6$ | ||
+ | |||
+ | {{:Hyperbolic trigonometric functions footer}} | ||
[[Category:SpecialFunction]] | [[Category:SpecialFunction]] |
Latest revision as of 05:53, 4 March 2018
The hyperbolic cotangent is defined by $$\mathrm{coth}(z)=\dfrac{1}{\tanh(z)}=\dfrac{\mathrm{cosh}(z)}{\mathrm{sinh}(z)},$$ where $\tanh$ denotes the hyperbolic tangent function.
Domain coloring of $\mathrm{coth}$.
Properties
Derivative of coth
Antiderivative of coth
Relationship between coth and csch
Relationship between coth and cot
Relationship between cot and coth
Relationship between csc, Gudermannian, and coth
Relationship between coth, inverse Gudermannian, and csc
Pythagorean identity for coth and csch
Coth of a sum
z coth(z) = 2z/(e^(2z)-1) + z
z coth(z) = sum of 2^(2n)B_(2n) z^(2n)/(2n)!
z coth(z) = 2 Sum of (-1)^(n+1) zeta(2n) z^(2n)/pi^(2n)
Videos
Calculus I - Derivative of Hyperbolic Cotangent Function coth(x) - Proof
See Also
References
- 1964: Milton Abramowitz and Irene A. Stegun: Handbook of mathematical functions ... (previous) ... (next): $4.5.6$