: 3.2.42. Find the Fourier series of the hyperbolic functions cosh m x and sinh m...

The hyperbolic cosine function, cosh x = (1/2) (e^x + e^-x). Find the Taylor series representation...

The hyperbolic cosine function, cosh x = (1/2) (e^x + e^-x). Find the Taylor series representation for cosh x centered at x=0 by using the well known Taylor series expansion of e^x. What is the radius of convergence of the Taylor Expansion?

Given the function f(x) =cosh(x) with period of 2π , determine its Fourier series for interval...

Given the function f(x) =cosh(x) with period of 2π , determine its Fourier series for interval of (-π, π) ( Please write clearly :) )

Are the following functions linearly independent or dependent on the interval (-∞, ∞)? (a) cosh x,...

Are the following functions linearly independent or dependent on the interval (-∞, ∞)? (a) cosh x, sinh x, cosh2x (b) (x-1)2 , (x+1)2 , x Using wrongskian method

Let f(x) = 5x + tanh(x), where tanh x = sinh x /cosh x , and...

Let f(x) = 5x + tanh(x), where tanh x = sinh x /cosh x , and sinh x and cosh x is defined in question 1(b). Given that f(x) is one-to-one, use the linear approximation of( f −1 )(x) around a = 0 to estimate( f −1 )(0.2)

Important Instructions: (1) λ is typed as lambda. (2) Use hyperbolic trig functions cosh(x) and sinh(x)...

Important Instructions: (1) λ is typed as lambda. (2) Use hyperbolic trig functions cosh(x) and sinh(x) instead of ex and e−x. (3) Write the functions alphabetically, so that if the solutions involve cos and sin, your answer would be Acos(x)+Bsin(x). (4) For polynomials use arbitrary constants in alphabetical order starting with highest power of x, for example, Ax2+Bx. (5) Write differential equations with leading term positive, so X′′−2X=0 rather than −X′′+2X=0. (6) Finally you need to simplify arbitrary constants. For...

1) Verify the following identities a) cosh2(x) - sin2h(x) = 1 b) cosh(x+y) = cosh(x) cosh(y)...

1) Verify the following identities a) cosh2(x) - sin2h(x) = 1 b) cosh(x+y) = cosh(x) cosh(y) + sinh(x) sinh(y) 2) Show that d/dx (csch(x)) = -csch(x) coth(x)

Evaluate Integral of ((cosh x) / (9-sinh^2(x))) dx Limits: a=ln7, b= ln9

Evaluate Integral of ((cosh x) / (9-sinh^2(x))) dx Limits: a=ln7, b= ln9

Find the derivative. f(x) = tanh(4 + e5x) Find the derivative. f(x) = x sinh(x) −...

Find the derivative. f(x) = tanh(4 + e5x) Find the derivative. f(x) = x sinh(x) − 4 cosh(x)

Important Instructions: (1) λ is typed as lambda. (2) Use hyperbolic trig functions cosh(x) and sinh(x)...

Important Instructions: (1) λ is typed as lambda. (2) Use hyperbolic trig functions cosh(x) and sinh(x) instead of ex and e−x. (3) Write the functions alphabetically, so that if the solutions involve cos and sin, your answer would be Acos(x)+Bsin(x). (4) For polynomials use arbitrary constants in alphabetical order starting with highest power of x, for example, Ax2+Bx. (5) Write differential equations with leading term positive, so X′′−2X=0 rather than −X′′+2X=0. (6) Finally you need to simplify arbitrary constants. For...

prove that u(x,t)=cosh 2x sinh 8t satisfied one dimensional wave equation

prove that u(x,t)=cosh 2x sinh 8t satisfied one dimensional wave equation