Exercise 8: Consider the function f(x) = sech(x) = 1/ cosh(x). (a) Find the domain and range of f. (b) Compute the derivative of f, by the reciprocal rule. (c) Show that f is not injective, but f restricted to the domain [0, 0) is injective with the same range as f. Let g(x)= arcsech(x) be the inverse of f on this domain. (d) Compute the derivative of g(x), by thinking of it as an inverse function: let y arcsech(y). sech(x), so x = (e) Solve for an expression of g(x), using only previously known functions. (f) Compute the derivative of g(x), using the explicit expression found in (e).

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
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d,e,f

Exercise 8: Consider the function f(x) = sech(x) = 1/ cosh(x).
(a) Find the domain and range of f.
(b) Compute the derivative of f, by the reciprocal rule.
(c) Show that f is not injective, but f restricted to the domain [0, 0) is injective with the same range
as f. Let g(x)= arcsech(x) be the inverse of f on this domain.
(d) Compute the derivative of g(x), by thinking of it as an inverse function: let y
arcsech(y).
sech(x), so x =
(e) Solve for an expression of g(x), using only previously known functions.
(f) Compute the derivative of g(x), using the explicit expression found in (e).
Transcribed Image Text:Exercise 8: Consider the function f(x) = sech(x) = 1/ cosh(x). (a) Find the domain and range of f. (b) Compute the derivative of f, by the reciprocal rule. (c) Show that f is not injective, but f restricted to the domain [0, 0) is injective with the same range as f. Let g(x)= arcsech(x) be the inverse of f on this domain. (d) Compute the derivative of g(x), by thinking of it as an inverse function: let y arcsech(y). sech(x), so x = (e) Solve for an expression of g(x), using only previously known functions. (f) Compute the derivative of g(x), using the explicit expression found in (e).
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