' ' 3. The hyperbolic trigonometric functions are defined by sinh(t) , The following identities m...
Compose a module that implements the hyperbolic trigonometric functions based on the definitions sinh(x) = (e – e ) / 2 and cosh(x) = (e + e ) / 2, with tanh(x), coth(x), sech(x), and csch(x) defined in a manner analogous to the standard trigonometric functions. In Python
The hyperbolic cosine and hyperbolic sine functions, f(x) cosh(x) and g(x) sinh(), are analogs of the trigonometric functions cos(x) and sin(z) and come up in many places in mathematics and its applications. (The hyperbolic cosine, for example, describes the curve of a hanging cable, called a catenary.) They are defined by the conditions cosh(0)-l, sinh(O), (cosh())inh("), d(sinh()- csh) (a) Using only this information, find the Taylor polynomial approximation for cosh(x) at0 of COS degree n = 4. (b) Using only...
In class we discussed the relationship between the hyperbolic functions and a hyperbola then showed that it is analogous to that of the trigonometric functions and a circle a. Derive an analogue to the Pythagorean Identities (cos2 x + sin2 x 1, etc. ) for the hyperbolic functions hint: Which hyperbola and which circle? (this will give you the relationship between cosh x and sinh x and the others are then easily found as they were in the case of...