pls solve asap .. thanks A spin-particle is fixed in space with the Hamiltonian H = as, + b($+$3), where a and b are constants and as usual, Sx, Sy, S, are the operators which gives the x-, y-, z-components of the total spin. a) Write the matrix representation of Hamiltonian, H. [6 marks] b) Determine the energy levels of this system. [2 marks] c) List all possible energy levels of this system [2 marks] (Show proper construction of the...
Problem N° 1 114 points] Consider two spinless particles with orbital angular momenta quantum numbers l-1 and 122. If the state of the two- particle system is described by the wave function 4 (a). Find the constant A 12 points]. (b). Find the probability that, as a result of a measurement, the system is found in a state of the form |1 1>121>112 points). Problem N° 1 114 points] Consider two spinless particles with orbital angular momenta quantum numbers l-1...
plz help. thnx The state of a quantum mechanical particle, constrained to move on a circle of radius R in the x-y plane, is given by 4. where ф is the angle that the position vector makes with the x-axis a) Find a value of N which makes the above state normalized b) If Lz is measured, what are the possible outcomes and their corresponding probabilities?
4 Consider the system represented in state variable form 0 x+ 2 y [1-1x +[0]u B C(sl- A) Show that a transfer function is related to the state equation by H(s) a) D, and find the transfer function for the system above. (5 marks) Sketch the Bode plot. b) (5 marks) 4 Consider the system represented in state variable form 0 x+ 2 y [1-1x +[0]u B C(sl- A) Show that a transfer function is related to the state equation...
Question 4 a) Solve the Initial value problem. (PLO-3, CLO-3,C3) Marks-13 (x+1) - ny =e(x+1)n+1, y(0)=1 dx b) Solve the following non-linear first order ordinary differential equation. yp+ (x – y)p- xy = 0 (PLO-4, CLO-4,C4) Marks-12
Need it ASAP Solve y' + 4y = y' + 4y = x under condition y(0) = 2.
b) Consider the system of simultaneous equations for x,y and z: ( x + 2y + z = 3 r-3y+z=1 (2x - y +2 = 4 Use Gaussian elimination to find if these equations are consistent. Pro- vide a geometrie interpretation of the result. (18 marks) [Total 35 marks)
pls solve asap Answer ALL questions. (Jawab SEMUA soalan) Question 1 (10 marks] Soalan 1 [10 markah] 1B) = 3i (6) and C) = -1 1 0-31 Let A = 3 5 0 31 0 -2 questions Answer the following a) Find A B) and AIC). [2 marks] b) Determine the Hermitian conjugate for|B) and C). [2 marks] c) Compute (BIC) and (C|B). What is the relation between them? [3 marks] d) Find the normalized vector for B). [2 marks]...
(introduction to quantum mechanics) , the Hamiltonian matrix is H- 3. In the basis |1) - (a) Find the eigenvalues En and eigenfunctions Ion) of H. (b) The system is in state 2) initially (t 0). Find the state of the system at t in the basis n). (c) Calculate the expectation value of H. Briefly explain your result. Does it depend on time? Why? , the Hamiltonian matrix is H- 3. In the basis |1) - (a) Find the...
1. Solve the system of equations using Laplace Transform(LT): With IV: x(0) 4 With IV :y (0)-5 a. Apply Laplace transform (LT) to the system and solve, by using elimination method, for x(s), and y(s). b. Apply inverse-Laplace transform (L:'T) to the system of s-functions, then solve for x(t), and y(t) 1. Solve the system of equations using Laplace Transform(LT): With IV: x(0) 4 With IV :y (0)-5 a. Apply Laplace transform (LT) to the system and solve, by using...