Show that if f is an arithmetic function that is invertible for the Dirichlet convolution and...

Find the inverse Laplace transform of the function by using the convolution theorem. F(s) = 1...

Find the inverse Laplace transform of the function by using the convolution theorem. F(s) = 1 (s + 4)2(s2 + 4) ℒ−1{F(s)}(t) = t 0       dτ

Prove Dirichlet Function is not continuous everywhere using the claims: f is not continuous at c...

Prove Dirichlet Function is not continuous everywhere using the claims: f is not continuous at c in D if (x_n) is in D and (x_n) converge to c, then (f(x_n)) does not converges to f(c).

Use the Convolution Theorem to compute the inverse transform of the following: a. F(s)= (2 /...

Use the Convolution Theorem to compute the inverse transform of the following: a. F(s)= (2 / ( s^(2)(s2 +1) )). e. F(s)= e^(−3s)/(s^2)

1. (a) Let f(x) = exp(x),x ∈ R. Show that f is invertible and compute the...

1. (a) Let f(x) = exp(x),x ∈ R. Show that f is invertible and compute the derivative of f−1(y) in terms of y. [5] (b) find the Taylor series and radius of convergence for g(x) = log(1+ x) about x = 0. [6]

show that f: R^2->R^2 be f(x,y)= (cosx + cosy, sinx + siny). show that f is...

show that f: R^2->R^2 be f(x,y)= (cosx + cosy, sinx + siny). show that f is locally invertible near all points (a,b)such that a-bis not = kpi where k in z and all other points have no local inverse exists  

determine whether function f is invertible: f'(x)=x^2+1 f'(x)=x^2-1 f'(x)=sinx f'(x)=pi/2+tan^-1(x)

determine whether function f is invertible: f'(x)=x^2+1 f'(x)=x^2-1 f'(x)=sinx f'(x)=pi/2+tan^-1(x)

1. Consider the function f(x) = x 3 + 7x + 2. (a) (10 pts) Show...

1. Consider the function f(x) = x 3 + 7x + 2. (a) (10 pts) Show that f has an inverse. (Hint: Is f increasing?) (b) (10 pts) Determine the slope of the tangent line to f −1 at (10, 1). (Hint: The derivative of the inverse function can be found using the chain rule.)

(a) Show that the function f(x)=x^x is increasing on (e^(-1), infinity) (b) Let f(x) be as...

(a) Show that the function f(x)=x^x is increasing on (e^(-1), infinity) (b) Let f(x) be as in part (a). If g is the inverse function to f, i.e. f and g satisfy the relation x=g(y) if y=f(x). Find the limit lim(y-->infinity) {g(y)ln(ln(y))} / ln(y). (Hint : L'Hopital's rule)

1.4.3. Let T(x) =Ax+b be an invertible affine transformation of R3. Show that T ^-1 is...

1.4.3. Let T(x) =Ax+b be an invertible affine transformation of R3. Show that T ^-1 is also affine.

Consider f(x) = (3x+4)/(2x-3) a) Show f(x) is 1-1 by showing that if f(a) = f(b),...

Consider f(x) = (3x+4)/(2x-3) a) Show f(x) is 1-1 by showing that if f(a) = f(b), then a=b b) Find g= f^(-1) ; the inverse function for f(x)