Hyperbolic secant
Writing functions:
sech(x)
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A hyperbolic secant is a mathematical function that is defined as the inverse of a cosecant function. It has the following definition:
sech(x) = 1 / cos(x),
where cos(x) is the hyperbolic cosine, which is also one of the hyperbolic functions.
Hyperbolic resonance is widely used in mathematical calculations, physics, engineering and other fields of science. Its main application is in the calculation of resistances, amplitudes and phases of wave processes, as well as in solving differential equations and other mathematical problems.
Due to its versatility and accuracy, the hyperbolic secant is an indispensable tool for specialists working in the field of exact sciences and engineering. Its use allows calculations to be performed with great accuracy and efficiency, which makes it one of the most important mathematical functions in the modern world.
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