User:Editeur24/hyperbolic

hyperbolic functions

Examples Hyperbolic functions are widely used in engineering. The equation for a catenary, the shape of a rope suspended from two ends, is f(x) = a cosh(x/a) - a if the ends are x = - b and x = + b at equal heights and the lowest point is f(x) = 0. Suppose the constant is a = 10. The value x = 0 is where the rope hangs lowest, since it reaches its minimum where f'(x) = 0 and if f'(x) = 10 sinh(x/10) [1/10] = sinh(x/10) = 0 we need sinh(x) = 0. We can calculate how much lower the middle is than the ends using f(b) = 10 cosh(b/10) - 10, so if b = 5, the height of each end is f(5) = 1.28.^[1]

The equation for the velocity in meters per second of an idealized surface wave travelling across a lake is

v={\sqrt {\left({\frac {g\lambda }{2\pi }}\right)\tanh \left({\frac {2\pi d}{\lambda }}\right)}},

where g = 9.8 m/s $^{2}$ is gravity's acceleration, $\lambda$ is the wavelength from crest to crest in meters, and d is the depth of undisturbed water in meters.^[2] Thus, if the wavelength is 12 meters and the velocity is 4 meters per second, we can find the depth of the lake from

4={\sqrt {\left({\frac {9.8\cdot 12}{2\pi }}\right)(\tanh \left({\frac {2\pi d}{12}}\right)}},

which implies that

d=\left({\frac {6}{\pi }}\right)(\tanh ^{-1}\left({\frac {8\pi }{29.4}}\right)\approx 2.4\;meters.

^ Adapted from | "The Hanging Cable Problem for Practical Applications," Neil Chatterjee & Bogdan G. Nita, Atlantic Electronic Journal of Mathematics, 4(1): 70-77 (Winter 2010).
^ Calculus: Early Transcendentals, 2nd Edition, by William Briggs, Lyle Cochran, Bernard Gillett & Eric Schulz, p. 501.

[1] Adapted from | "The Hanging Cable Problem for Practical Applications," Neil Chatterjee & Bogdan G. Nita, Atlantic Electronic Journal of Mathematics, 4(1): 70-77 (Winter 2010).

[2] Calculus: Early Transcendentals, 2nd Edition, by William Briggs, Lyle Cochran, Bernard Gillett & Eric Schulz, p. 501.

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