3. It is known that the test MSE has the U-shape curve, then given a value xo, please show the eq...
3. It is known that the test MSE has the U-shape curve, then given a value xo, please show the equation of the test MSE, and prove how you derive this equation 3. It is known that the test MSE has the U-shape curve, then given a value xo, please show the equation of the test MSE, and prove how you derive this equation
show work please 6. Given an indifference curve U. = 100 = F S (F>O and S>0) of the indifference a) Use the implicit function rule to derive the slope curve. b) At S = 144, Calculate the slope.
3. (5 marks) Let U be a random variable which has the continuous uniform distribution on the interval I-1, 1]. Recall that this means the density function fu satisfies for(z-a: a.crwise. 1 u(z), -1ss1, a) Find thc cxpccted valuc and the variancc of U. We now consider estimators for the expected value of U which use a sample of size 2 Let Xi and X2 be independent random variables with the same distribution as U. Let X = (X1 +...
Consider the following AS-AD model. Please note that I have given you the AD curve explicitly and simplified many of the expressions you saw in lecture and previous HW (i.e. no z, I already solved for the relationship between unemployment and output, etc.). Aggregate demand: Y = 200 − 10P Wage setting relationship: w = P e (1 − u) Price setting relationship: P = 1.1w Output and the unemployment rate: u = 1 − Y 110 1. Derive the...
3. Suppose that the Phillips curve is given by: It = TE + a - but, where is the inflation rate, Ti is the expected inflation, ut is the rate of unemployment and, a and b are two positive parameters. Suppose that a fraction 1 € (0,1) of wage contracts are indexed to inflation and Ti = litt + (1 - 1) Tt-1. (a) Derive the new equation for the Phillips curve. [2 marks] (b) Derive an algebraic expression for...
Please find value of matrix L and U using LU factorization of given matrix. please show and explain each step. Io lo ILI O I Lo los
*Show ALL work, answer is given already* 3) For the hypothesis test Ho: u = 5 against Hi: u < 5 with variance unknown and n = 12, approximate the P-value for each of the following test statistics. to = 2.05 0.95 sps 0.975 to = -1.84 0.025 sps 0.05 to = 0.4 0.6 sps 0.75
please explain in details and please show how u did it .thank u Part III. (3 points) Redraw the diagram describing a competitive firm, and answer the questions below. think Price 0 11. After labeling each curve, select/mark how much the profit-maximizing firm should produce. (1 point) 12. Identify/draw the area showing total profit at the level of output selected in #11 (1 point) JOT SHARE 13. In the long run, if the firms stays in the market, it will...
Suppose an indifference curve is given by the equation U=2*C*T. Assume that initially the consumer owns the bundle C = 20, T = 2. What is the Utility value along this indifference curve? Show your calculations! Other than point, (C, T) = (20, 2), list 3 other points on this indifference curve. Graph the indifference curve including the point (C, T) = (20, 2) and the 3 points you listed in part b. Place T on the vertical axis and...
PLEASE SHOW ALL WORKING. MAKE SURE ITS NEAT PLEASE. WILL GIVE GOOD RATINGS IF EVERYTHING MAKES SENSE AND IN GOOD SHAPE 02 A 3-point bend test is performed on a rectangular beam of steel as shown in figure Q2. Equation Q2.1 shows how the vertical displacement () varies with position along the beam (x). Equation Q2.2 indicates how the second moment of inertia depends on the breadth (b) and height (h) of the rectangular cross-section. Eq.2.1 bh 12 Eq.2.2 Using...