please help me! Thanks in advance
3)
Now,
Also,
Hence Proved.
please help me! Thanks in advance Problem 3: Show U = Y-EIYIX) satisfies ElUX] = 0...
please help me! Thanks in advance Problem 3: Show U = Y-EIYIX) satisfies ElUX] = 0 and ElU2IX) = Var(Y|X) Problem 3: Show U = Y-EIYIX) satisfies ElUX] = 0 and ElU2IX) = Var(Y|X)
Can someone help me with this problem please? 1.4 Let u(x, y) = h(Vx2 + y2) be a solution of the minimal surface equation. (a) Show that h(r) satisfies the ODE rh" +h'(1 + (h')2) = 0. (b) What is the general solution to the equation of part (a)?
please help me! Thanks in advance :)
please help me. Thanks in advance 7. Suppose the random variable U has uniform distribution on [0, 1]. Then a second random variable T is chosen to have uniform distribution on [0, U]. Calculate P(T > 1/2).
Please do by hand. Thanks in advance. 1. Let X and Y be random variables with Var(X) = 4, Var(Y) = 9, and Var(X Y) = 10. What is Cov(X, Y)?
Can u guys hlep me answer each of those questions please Thanks in advance. could you guys do them step by step and explain which rules u guys are used as you guys are doing the problems. please. (9) Find the derivative of each of the following: (a) y = 3,5-1 – VI + V2 (d) y = sin-(In x) (8) y = In V272422+3 In 2x – 1 x2 + 2x + 3 (j) y=7" + x1 (b) -...
Please do by hand. Thanks in advance. 2. Let X and Y be two random variables. If Var(X) = 4, Var(Y) = 16, and Cov(X,Y) = 2, then what is Var(3Y - 2x)?
Solid works problem. Please help me with the following solid works problem. Please show dimensions(this means label the dimensions of the vase), Label the vase similar to how its labeled in figures 1 and 2 shown in the photo below. THANKS IN ADVANCE! Solid works problem. Please help me with the following solid works problem. Please show dimensions, similar to figure 1 and 2. THANKS IN ADVANCE! (10 points) Using SolidWorks (or other solid modeler of your choice), reproduce a...
mechanical engineering analysis help, please show all work, thanks. Problem 3. Show that the solution of the partial differential equation (Laplace equation), Wxx(x,y) + wyy(x, y) = 0, with the four boundary conditions: w(x,0) = 0, w(x,1) = 0, w(0,y) = 0 and w(1, y) = 24 sin ny, can be obtained as w(x,y) = 2 sinh Tx. sin ny.
please do this problem in matlab and show me the code. Thanks. please do this problem in matlab and show me the code. Thanks. please do this problem in matlab and show me the code. Thanks. please do this problem in matlab and show me the code. Thanks. please do this problem in matlab and show me the code. Thanks.please do this problem in matlab and show me the code. Thanks. please do this problem in matlab and show me...