13. Finally, recall from class that the so-caled hyperbolic sine and cosine functions are defined in terms of exponential functions, i.e. sin A(2) and e +e cos A(2) = t Prove that (ein bl2

Question 13

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10. Let f(z) be an always negative function with the property that f'(z) <0 for any z. a) Let g(z) = (f(z))?. For what values of z will g(z) be increasing? Think about the connection between increasing/decreasing functions and the algebraic sign of their corresponding derivatives. b) Let h(z) = f(f(x)). For what values of z will h(z) be decreasing? 11. Does the natural exponential function f(z) =e admit any inflection points? Explain why or why not. 12. Now, recall our discussions with respect to indefinite and definite integrals, and do the following: a) State the most general antiderivative of f(z) =², i.e. compute the indefinite integral b) Even more generally, state c) Now, express ya by means of a rational exponent and compute d) What do you think happens when n=-1, in other words what is e) Apply the Fundamental Theorem of Calculus in order to evaluate the definite integral: 13. Finally, recall from class that the so-called hyperbolic sine and cosine functions are defined in terms of exponential functions, i.e. sin h(z) = 2 and cos h(2) = +c Prove that (cos h(z))² – (sin h(z))² = 1