probability of finding atom = (1/2L) * sqrt[(L/3)2 + (2L/3)2 + (L/2)2]
= 0.448
A helium atom in an excited state is trapped ina cubical box of side L. The...
5. (25 pts) An electron is trapped inside a rigid box of length L-0.250nm. a) If the electron is initially in the second excited state, what is the wavelength of the emitted photon if the electron jumps to the ground state? b) The wavefunction for the electron in its first excited state is given by-(x)fsin2m excited state is given by ψ(x)--sin what is the probability of finding the electron in the middle region of the rigid box, srsc) Sketch the...
DApdr Q2. An electron is trapped in an one dimensional infinite potential well of length L Calculate the Probability of finding the electron somewhere in the region 0 <xLI4. The ground state wave function of the electron is given as ㄫㄨ (r)sin (5 Marks) O lype hene to search
An electron (mass m) is trapped ina 2-dimensional infinite square box of sides Lx - L - L. Take Eo = 92/8mL2. Consider the first four energy levels: the ground state and the first three excited states. 1) Calculate the ground-state energy in terms of Ep. (That is, the ground-state energy is what multiple of Eo? Eo Submit 2) In terms of Eo, what is the energy of the first excited state? (That is, the energy of the first excited...
please help 1. The eigenfunctions of a particle in a square two-dimensional box with side lengths a = b = L are non, (x, y) = { sin ("T") sin (9,7%) = xn, (x)}n, (y) where n. (c) and on, (y) are one-dimensional particle-in-a-box wave functions in the x and y directions. a. Suppose we prepare the particle in such a way that it has a wave function V (2,y) given by 26,0) = Võru (s. 1) + Vedra ....
An imaginary cubical surface of side L has its edges parallel to the x-, y- and z-axes, one corner at the point x = 0,y = 0, z = 0 and the opposite corner at the point x=L, y=L, z=L. The cube is in a region of uniform electric field E⃗ =E1i^+E2j^, where E1 and E2 are positive constants. Calculate the electric flux through the entire cubical surface. Face the normal points out of the cube. Express your answer in...
Two noninteractingidantical spin-/2 fermions mass m are confined to a cubical box with the potential V(x, y,e) oo otherwise ppose the sstem f two particlesits g rownd state. Findthe wave function the total o fa and the s4uari f the total spin. rg Eo ener sP (b) What is the energy El and degenerac," of the first excited state ? Find v linear! independent wave functions with enerJyEl for the two fermions Two noninteractingidantical spin-/2 fermions mass m are confined...
II.6. The wave function of a particle in a 1D rigid box (infinite potential well) of length L is: v, 8, 1) = sin(x)e-En/5). n = 1,2,3... What is the probability density of finding the particle in its 2nd excited state?
A particle is in the ground state of a box of length L (from -L/2 to L/2). Suddenly the box expands symmetrically to twice its size (from -L to L), leaving the wave function undisturbed. Show that the probability of finding the particle in the ground state of the new box is (8/3pi)^2.
Consider the excited state wave function for He atom given by the following Slater determinant 1 432,0(1) V3.2,-2B(1) He (1,2)= V2 V3.2,a(2) W32,-2B(2) Here Y 3,2,-and Y3,2,-2 are hydrogenic wave functions (with Z = 2, see the equation sheet). Show that He (1, 2) is an eigenfunction of Î. = Î., +Î.2. What is the eigenvalue? Î.,, ..2, and Î, are the z-components of the orbital angular momentum operators for electrons 1 and 2, and the z-component of the total...
An excited hydrogen atom releases an electromagnetic wave to return to its normal state. You use your futuristic dual electric/magnetic field tester on the electromagnetic wave to find the directions of the electric field and magnetic field. Your device tells you that the electric field is pointing in the negative x direction and the magnetic field is pointing in the positive y direction. In which direction does the released electromagnetic wave travel?+x direction-x direction+y direction-y direction+z direction-z direction