McLaurin series for f(x) = x2.ex is …..

f(x,y) = x2 y – 4 x y3 + ex+ y                  evaluate          f(x,...

f(x,y) = x2 y – 4 x y3 + ex+ y                  evaluate          f(x, x2) – f(1,1) Define a saddle point in mathematical terms.

find the maclaurin series for f(x)= (eX)-(e-x)/(2)

find the maclaurin series for f(x)= (eX)-(e-x)/(2)

f (x) = ex/x2 Find the Domain of f(x) Does the function have x- or y-...

f (x) = ex/x2 Find the Domain of f(x) Does the function have x- or y- intercept of f(x)? Find the vertical and horizontal asymptotes. Find f'(x) and f''(x) . Find the critical points, find the interval where f(x) is increasing and decreasing, the interval where f(x) is concave up and down and the inflection points.

Let f(x) = 1 + x − x2 +ex-1. (a) Find the second Taylor polynomial T2(x)...

Let f(x) = 1 + x − x2 +ex-1. (a) Find the second Taylor polynomial T2(x) for f(x) based at b = 1. b) Find (and justify) an error bound for |f(x) − T2(x)| on the interval [0.9, 1.1]. The f(x) - T2(x) is absolute value. Please answer both questions cause it will be hard to post them separately.

Consider the power series f(x) =x + x2/2 + x3/3 + x4/4 +··· (a) What is...

Consider the power series f(x) =x + x2/2 + x3/3 + x4/4 +··· (a) What is the interval of convergence of this series? (b) Differentiate this series term by term and compare the result to one of the series that we found in the lecture to find the closed form of the series f(x).

Find the power series representation for the function: f(x) = x2 / (1+2x)2 Determine the radius...

Find the power series representation for the function: f(x) = x2 / (1+2x)2 Determine the radius of convergence.

Expand f(x) = ex over the interval [-1, 1] using the complex representation of the Fourier...

Expand f(x) = ex over the interval [-1, 1] using the complex representation of the Fourier series. Bonus: Express the solution in question 5 in terms of real functions.

f(x)=x2+9 and g(x)=x2-8, find the following functions. a. (f * g) (x); b. (g * f)(x)...

f(x)=x2+9 and g(x)=x2-8, find the following functions. a. (f * g) (x); b. (g * f)(x) c. (f * g)(4); d. (g * f)(4)

Consider the Rosenbrock function, f(x) = 100(x2 - x12)2 + (1 -x1)2. Let x*=(1,1), the minimum...

Consider the Rosenbrock function, f(x) = 100(x2 - x12)2 + (1 -x1)2. Let x*=(1,1), the minimum of the function. Let r(x) be the second order Taylor series for f(x) about the base point x*, r(x) will be a quadratic, and therefore can be written: r(x) = A11(x1-x1*)2 + 2A12(x1-x1*)(x2-x2*) + A22(x2-x2*)2 + b1(x1-x1*) + b2(x2-x2*) + c Find all the coefficients in the formula for r(x) - What is A11, A12, A22, b1, b2, and c?

Given f′(x) = (9-x)2/ (x2+9)2 and f′′(x) = (2x(x2-27)/ (x2+ 9)3 , answer the following ques-...

Given f′(x) = (9-x)2/ (x2+9)2 and f′′(x) = (2x(x2-27)/ (x2+ 9)3 , answer the following ques- tions: (a) Find the interval where f(x) is increasing and decreasing. (b) At what values of x do the local maximum and local minimum occur? (c) Find the intervals of concavity. (d) At what values of x do the inflection points occur?