Jul 11, 2020 · I know how to find the Taylor expansion of both $\sinh x$ and $\cosh x$, but how would you find the Taylor expansion of $\tanh x$. It seems you can't just divide both the Taylor …

I heard teachers say [cosh x] instead of saying "hyperbolic cosine of x". I also heard [sinch x] for "hyperboic sine of x". Is this correct? How would you pronounce tanh x? Instead of saying "

Assuming the numbers are stored in fixed point with an 8 bit fractional part then the approximation to $\tanh (x)$ should work to the limit implied by the resolution, or for arguments $\tanh^ {-1} …

Feb 26, 2018 · The tanh function on the other hand, has a derivativ of up to 1.0, making the updates of W and b much larger. This makes the tanh function almost always better as an …

Jan 29, 2018 · It is known that $$ \tan z=\operatorname {i}\tanh (\operatorname {i}z). $$ So, from the derivative polynomial of the tangent function $\tan z$, we can derive the derivative …

Generally speaking, $\tanh$ has two main advantages over a sigmoid function: It has a slightly bigger derivative than the sigmoid (at least for the area around 0), which helps it to cope a bit …

However, this is wrong, as the actual solution is: $$\tanh (-3)=-\dfrac {e^3-1} {e^3+1}$$ What have I done that is unacceptable, hence making my solution wrong? How is the actual solution …

Aug 15, 2016 · Explore the mathematical similarities between the error function and hyperbolic tangent, including their properties and applications in various fields.

First of all notice that to keep consistency $$\tanh\theta = \dfrac {e^x-e^ {-x}} {e^x+e^ {-x}}$$ Should have been $$\tanh (x) = \dfrac {e^x-e^ {-x}} {e^x+e^ {-x}}$$ Same with your other two …

Find the solutions of $\tanh (z)=i$ in the form of $ (x +iy)$ [closed] Ask Question Asked 8 years, 7 months ago Modified 8 years, 7 months ago