Problem 4. (10 pts) Consider the function g(x) = 2x3 – 4x2 + 8. (a) Give...
Weekly Problem Set 2 1. Consider the function Ex)=x". [10 pts] a) Write out the limit definition of E (2). b) Use a table or a graph to find E '(2). Give your answer rounded to the 3 decimals. c) Give the equation of a line tangent to E(x) through the point (2, 4).
Problem No. 1.4 /10 pts 5x1+ 4x2+2x3=-5 5 x1-8x2+8x33 5x1-8x2 + 8X3 4x2 2x33 Solve the given system using elementary row operations. Do not use matrices.
1. Consider the problem minimize f (x1, x2) = x} + 2x3 – 21 – 4x2 + 2. (a) (4 points) Find all of the points (21, x2)T that satisfy the first-order necessary condition (FONC). (b) (4 points) For each of the points in the above question, identify whether it a local minimizer, local maximizer, or saddle point. (c) (2 points) Is there a global minimizer?
help with questions 1-4
Show all work - give exact simplified values for all answers For questions 1 and 2, algebraically find the given limit, if it exists. (8 pts each) 1. 3x 2. 4x2 - 9x - 9 lim lim *4- x2 + 9 *23 2x3 - 7x2 +9 3. (8 pts) Differentiate the given function. Completely factor your final answer. y = 7e-*cos x 4. (9 pts) Find the equation of the tangent line to the graph of...
21. 8 pts For the function g(x) = = 4x2-1 214x A. Find the horizontal asymptote. B. Find the vertical asymptote(s). 0. Find the x intercept(s). D. Solve g(x) <0. Use interval notation. E. Graph g(x)
Problem 4 (20 PTS) For the given function: 2(,y) = re (1) (8 PTS) Determine 2x , zy, Zry, and Zyz. (2) (4 PTS) State whether the conclusion of Clairaut's theorem holds for z(x, y) and explain your answer. (3) (8 PTS) Determine and write down the equation of the tangent plane to the surface : at the point P(1,0,1). Give the equation in standard form, i.e. in the form Ax+By+C2 = D.
#use MATLAB script1) Calculate the following for the function f(x) = e-4x- 2x3 a. Calculate the derivative of the function by hand. Write a MATLAB function that calculates the derivative 05. of this function and calculate the derivative at x = 0.5. b. Develop an M- to evaluate the cetered finite-difference approximation (use equation below), at x = 0.5. Assume that h = 0.1. c. Repeat part (b) for the second-order forward and backward differences. Again Assume that h = 0.1. d. Using the results...
Consider the function x) = 6x + x2 and the point P(-2,-8) on the graph of f (a) Graph f and the secant lines passing through P(-2, -8) and Q(x, f(x)) for x-values of -3, -2.5, -1.5 -10 -8 68 10 -10 -8 2 46 810 -2 -8 8 10 8 10 -10-8 -10-8 -8 (b) Find the slope of each secant line (line passing through Q(-3, f(x))) (line passing through Q(-2.5, f(x))) (line passing through Q(-1.5, f(x))) (c) Use...
Question 4 10 pts #3. Consider the function f(x) = 2 3 (a) (5pts) Find a power series for f(x) centered at 0. (b) (5pts) Determine the interval of convergence of f(x). Upload Choose a File Question 5 10 pts #4. (a) (5pts) Find the Taylor series for f(x) = cos x, centered at 0. (Note: You can refer to the textbook.) (b) (5pts) Using (a), find the Maclaurin series for g(x) = cos(a). Write the first five terms of...
please answer each part with steps included!
3. (10 points) Consider the function f(t) = 32 - 10, and notice that its positive zero is == V10. In this problem, you will use Calculus to estimate 10 to several decimal places. (A) (2 points) Since 3=V9 is close to V10, it is a good place to start. Write down the tangent line to y=f(x) at a = 3. (b) (2 points) Now find the intercept of the tangent line to...