Problem 2 Show that e) Hint: If you cannot get the desired estimate directly, try using...
Problem 2 Show that (a2 +2)2 J B2(0) Hint: If you cannot get the desired estimate directly, try using domain decomposition.] 10 marks Problem 2 Show that (a2 +2)2 J B2(0) Hint: If you cannot get the desired estimate directly, try using domain decomposition.] 10 marks
There's another hint underneath it says "Recall that B2(0) is the unit disk of radius 2 in R2 " I sort of understand it but not sure where to start. Problem 2 Show that1 B2(0) Hint: If you cannot get the desired estimate directly, try using domain decomposition.] 10 marks Problem 2 Show that1 B2(0) Hint: If you cannot get the desired estimate directly, try using domain decomposition.] 10 marks
5. Suppose XExp(A). (a) [5 pts) Show that E(X) 1/A. Hint: You can directly use the definition and properties of a gamma function.] (b) [5 pts] Prove that P(X > t +s | X > s) = P(X > t) for s, t > 0, [Hint: You can directly use the tail probablity P(X >) e for 0.]
5. Suppose X ~Exp(A). (a) [5 pts] Show that E(X) 1/A. [Hint: You can directly use the definition and properties of a gamma function.] (b) [5 pts] Prove that P(x >t+ |xs) P(x > t) for s,t>0. [Hint: You can directly use the tail probability P(X > x) = e-k for x > 0.
5. Suppose XExp(A). (a) [5 pts] Show that E(X) 1/A. [Hint: You can directly use the definition and properties of a gamma function.]
can I get some help I'll try for many hours but still get it wrong. thanks Section 6.3 Step Function: Problem 14 Previous Problem Problem List Next Problem (1 point) Compute the inverse Laplace transform of P(a)= 3 " f(t) = [e"(t-4)-e (2(1-4)]u(t-4) (Notation: write uſt-c) for the Heaviside step function e(t) with step at t = c.) If you don't get this in 2 tries, you can get a hint. Hint: Preview My Answers Submit Answers You have attempted...
2. Show that the closed ball of radius 1 centered at 0 in Loo cannot be covered Hint: Think about the result by finitely many closed balls of radius of Problem 14 in Section 7.1.) 2. Show that the closed ball of radius 1 centered at 0 in Loo cannot be covered Hint: Think about the result by finitely many closed balls of radius of Problem 14 in Section 7.1.)
Using Laplace Equation PDE 42.(a) Solve for u(r, e): That is, the region is an annulus betweenr 1 andr 2. HINT: First draw a picture of it, to get a look at the problem. Now, you should be able to readily get Then, see that you have 27-periodicity, so K n (n-1, 2, ) and D-0, so u (r, θ) A' + B' In r + an infinite series with r's and θ's in it. But look at your picture:...
e a continuous random variable with E(X)-11 and try to estimate μ using these two estinators from a random sample X1, . . . , Xn: For what a and b are both estimators unbiased and the relative efficiency of to μ2 is 45n?
help please! Team Name: Draw the mechanism to show how you get the desired product(s). heat