How do I find out whether f(x)=tanh (hyperbolic tangent) defined on f: R->R is increasing or...

Let f : R → R be defined by f(x) = x^3 + 3x, for all...

Let f : R → R be defined by f(x) = x^3 + 3x, for all x. (i) Prove that if y > 0, then there is a solution x to the equation f(x) = y, for some x > 0. Conclude that f(R) = R. (ii) Prove that the function f : R → R is strictly monotone. (iii) By (i)–(ii), denote the inverse function (f ^−1)' : R → R. Explain why the derivative of the inverse function,...

Prove that the function f : R \ {−1} → R defined by f(x) = (1−x)...

Prove that the function f : R \ {−1} → R defined by f(x) = (1−x) /(1+x) is uniformly continuous on (0, ∞) but not uniformly continuous on (−1, 1).

Let f : R → R + be defined by the formula f(x) = 10^2−x ....

Let f : R → R + be defined by the formula f(x) = 10^2−x . Show that f is injective and surjective, and find the formula for f −1 (x). Suppose f : A → B and g : B → A. Prove that if f is injective and f ◦ g = iB, then g = f −1 .

3. For each of the piecewise-defined functions f, (i) determine whether f is 1-1; (ii) determine...

3. For each of the piecewise-defined functions f, (i) determine whether f is 1-1; (ii) determine whether f is onto. Prove your answers. (a) f : R → R by f(x) = x^2 if x ≥ 0, 2x if x < 0. (b) f : Z → Z by f(n) = n + 1 if n is even, 2n if n is odd.

- Suppose f is a function such that f′(x) = (x+ 1)(x−2)2(x−3), so that f has...

- Suppose f is a function such that f′(x) = (x+ 1)(x−2)2(x−3), so that f has the critical points x=−1,2,3. Determine the open intervals on which f is increasing/decreasing. - Let f be the same function as in Problem 9. Determine which, if any, of the critical points is the location of a local extremum, and indicate whether each extremum is a maximum or minimum. Im confused on how to figure out if a function is increasing and decreasing and...

Consider the function f defined on R by f(x) = ?0 if x ≤ 0, f(x)...

Consider the function f defined on R by f(x) = ?0 if x ≤ 0, f(x) = e^(−1/x^2) if x > 0. Prove that f is indefinitely differentiable on R, and that f(n)(0) = 0 for all n ≥ 1. Conclude that f does not have a converging power series expansion En=0 to ∞[an*x^n] for x near the origin. [Note: This problem illustrates an enormous difference between the notions of real-differentiability and complex-differentiability.]

Prove: If D = Q\{3}. R = Q\{-3}, and f:D-> R is defined by f(x) =...

Prove: If D = Q\{3}. R = Q\{-3}, and f:D-> R is defined by f(x) = 1+3x/3-x for all x in D, then f is one-to-one and onto.

1. Let f be the function defined by f(x) = x 2 on the positive real...

1. Let f be the function defined by f(x) = x 2 on the positive real numbers. Find the equation of the line tangent to the graph of f at the point (3, 9). 2. Graph the reflection of the graph of f and the line tangent to the graph of f at the point (3, 9) about the line y = x. I really need help on number 2!!!! It's urgent!

For the function f(x)=x^3+5x^2-8x , determine the intervals where the function is increasing and decreasing and...

For the function f(x)=x^3+5x^2-8x , determine the intervals where the function is increasing and decreasing and also find any relative maxima and/or minima. Increasing ____________________ Decreasing ___________________ Relative Maxima _______________ Relative Minima _______________

] Consider the function f : R 2 → R defined by f(x, y) = x...

] Consider the function f : R 2 → R defined by f(x, y) = x ln(x + 2y). (a) Find the gradient of f(x, y) at the point P(e/3, e/3). (b) Use the gradient to find the directional derivative of f at P(e/3, e/3) in the direction of the vector ~u = h−4, 3i. (c) Find a unit vector (based at P) pointing in the direction in which f increases most rapidly at P.