Problem

One way to define hyperbolic functions is by means of differential equations. Consider t...

One way to define hyperbolic functions is by means of differential equations. Consider the equation y’’ – y = 0. The hyperbolic cosine, cosh t, is defined as the solution of this equation subject to the initial values: and The hyperbolic sine, sinh t, is defined as the solution of this equation subject to the initial values: and

(a) Solve these initial value problems to derive explicit formulas for cosh t, and sinh t. Also show that cosh t.

(b) Prove that a general solution of the equation y’’ – y = 0 is given by y = c1 cosh t + c2 sinh t .

(c) Suppose a, b, and c are given constants for which ar 2 + br + c = 0 has two distinct real roots. If the two roots are expressed in the form and , show that a general solution of the equation

(d) Use the result of part (c) to solve the initial value problem: -17/2.

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