Learn How To Find The Derivative Of The Inverse Hyperbolic Cosecant Function

d/dx (csch^-1 x)

– 1 / | x | √(x^2 + 1)

We can start by using the definition of the hyperbolic cosecant inverse function:

csch^-1 x = ln (x + sqrt(x^2 + 1))

Then, we can use the chain rule to find the derivative with respect to x:

d/dx (csch^-1 x) = d/dx [ln (x + sqrt(x^2 + 1))]

Using the chain rule, we can write this as:

d/dx [ln u] = 1/u * du/dx

where u = x + sqrt(x^2 + 1).

Taking the derivative of u with respect to x, we have

du/dx = 1 + (x / sqrt(x^2 + 1))

Therefore,

d/dx (csch^-1 x) = 1 / (x + sqrt(x^2 + 1)) * (1 + x / sqrt(x^2 + 1))

Simplifying this expression gives:

d/dx (csch^-1 x) = 1 / (x^2 + sqrt(x^2 + 1) * x)

More Answers:
The Value Of Cos(0) And Its Role In Trigonometry
The Basics: Why Sin(0) Equals 0 Explained With A Right-Triangle
Mastering Derivatives: Step-By-Step Guide To Finding The Derivative Of Coth⁻¹X

Error 403 The request cannot be completed because you have exceeded your quota. : quotaExceeded

Share:

Recent Posts

Mathematics in Cancer Treatment

How Mathematics is Transforming Cancer Treatment Mathematics plays an increasingly vital role in the fight against cancer mesothelioma. From optimizing drug delivery systems to personalizing

Read More »