The normalized wave functions for the particle is in a 1D box of length L., with...

A particle of mass m moves in a one-dimensional box of length L, with boundaries at...

A particle of mass m moves in a one-dimensional box of length L, with boundaries at x = 0 nm and x = 5 nm. Thus, V (x) = 0 for 0 ≤ x ≤ 5 nm, and V (x) = ∞ elsewhere. a) Can light excite a particle from its ground state to the fourth excited state? Mathematically support your answer. b) If the optical transition in (a) is possible, what is the required wavelength of light that generates...

A particle is placed in a box of width, π. a)Find the allowed energies of the...

A particle is placed in a box of width, π. a)Find the allowed energies of the particle and the properly normalized wave functions for the particle in each energy state. b) Find the probability of measuring the n=3 energy if the particle is initially in a state described by the wave function, Ψ=((8/3π)^1/2)sin^2(x)

The wave function of a particle in a one-dimensional box of length L is ψ(x) =...

The wave function of a particle in a one-dimensional box of length L is ψ(x) = A cos (πx/L). Find the probability function for ψ. Find P(0.1L < x < 0.3L) Suppose the length of the box was 0.6 nm and the particle was an electron. Find the uncertainty in the speed of the particle.

Recall that |ψ|2dx is the probability of finding the particle that has normalized wave function ψ(x)...

Recall that |ψ|2dx is the probability of finding the particle that has normalized wave function ψ(x) in the interval x to x+dx. Consider a particle in a box with rigid walls at x=0 and x=L. Let the particle be in the first excited level and use ψn(x)=2L−−√sinnπxL For which values of x, if any, in the range from 0 to L is the probability of finding the particle zero? For which v alues of x is the probability highest?Express your...

II(20pts). Short Problems a) The lowest energy of a particle in an infinite one-dimensional potential well...

II(20pts). Short Problems a) The lowest energy of a particle in an infinite one-dimensional potential well is 4.0 eV. If the width of the well is doubled, what is its lowest energy? b) Find the distance of closest approach of a 16.0-Mev alpha particle incident on a gold foil. c) The transition from the first excited state to the ground state in potassium results in the emission of a photon with  = 310 nm. If the potassium vapor is...

For 1D particle-in-a-box, if a wavefunction corresponds to ground state and 1st excited state: Is the...

For 1D particle-in-a-box, if a wavefunction corresponds to ground state and 1st excited state: Is the wave function an eigenfunction?

Find the probability of finding a particle in a box of length L in a region...

Find the probability of finding a particle in a box of length L in a region 0.45L to 0.55L to ground state and its excited state.

The sides of a one dimensional quantum box (1-D) are in x=0, x=L. The probability of...

The sides of a one dimensional quantum box (1-D) are in x=0, x=L. The probability of observing a particle of mass m in the ground state, in the first excited state and in the 2nd excited state are 0.6, 0.3, and 0.1 respectively a) If each term contributing to the particle function has a phase factor equal 1 in t=0. What is the wave function for t>0? b) what is the probability of finding the particle at the position x=L/3...

5) Unlike the particle in the 1D box and the harmonic oscillator, the energy of the...

5) Unlike the particle in the 1D box and the harmonic oscillator, the energy of the ground state of the 2D rigid rotor is zero. What is the difference between these cases that allows the energy to be zero for the rigid rotor in 2D?

The wave function for a particle confined to a one-dimensional box located between x = 0...

The wave function for a particle confined to a one-dimensional box located between x = 0 and x = L is given by Psi(x) = A sin (n(pi)x/L) + B cos (n(pi)x/L) . The constants A and B are determined to be