cschx
The term “cschx” refers to the hyperbolic cosecant function
The term “cschx” refers to the hyperbolic cosecant function. In mathematical terms, the hyperbolic cosecant function of a real number “x” is defined as the reciprocal of the hyperbolic sine function, denoted as csch(x), or written as:
csch(x) = 1 / sinh(x)
Here, sinh(x) represents the hyperbolic sine function.
The hyperbolic sine function, sinh(x), is defined as:
sinh(x) = (e^x – e^(-x)) / 2
In this equation, e is the mathematical constant known as Euler’s number (approximately equal to 2.71828).
By calculating the hyperbolic cosecant of a given value of “x”, you would substitute the value of “x” into the formula:
csch(x) = 1 / sinh(x)
This will yield the corresponding value of the hyperbolic cosecant of “x”.
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