psi(x,t=0)=Ae-a|x| Find A through normalization and find: The probability density for the particle between x and...

Consider the following wave function: Psi(x,t) = Asin(2piBx)e^(-iCt) for 0<x<1/2B Psi(x,t) = 0 for all other...

Consider the following wave function: Psi(x,t) = Asin(2piBx)e^(-iCt) for 0<x<1/2B Psi(x,t) = 0 for all other x where A,B and C are some real, positive constants. a) Normalize Psi(x,t) b) Calculate the expectation values of the position operator and its square. Calculate the standard deviation of x. c) Calculate the expectation value of the momentum operator and its square. Calculate the standard deviation of p. d) Is what you found in b) and c) consistent with the uncertainty principle? Explain....

A free particle has the initial wave function Ψ(x, 0) = Ae−ax2 where A and a...

A free particle has the initial wave function Ψ(x, 0) = Ae−ax2 where A and a are real and positive constants. (a) Normalize it. (b) Find Ψ(x, t). (c) Find |Ψ(x, t)| 2 . Express your result in terms of the quantity w ≡ p a/ [1 + (2~at/m) 2 ]. At t = 0 plot |Ψ| 2 . Now plot |Ψ| 2 for some very large t. Qualitatively, what happens to |Ψ| 2 , as time goes on? (d)...

The probability density function of X is given by f(x)={a+bx0if 0<x<1otherwise If E(X)=1.5, find a+b. Hint:...

The probability density function of X is given by f(x)={a+bx0if 0<x<1otherwise If E(X)=1.5, find a+b. Hint: For a probability density function f(x), we have ∫∞−∞f(x)dx=1

The wave function of a particle is ψ (x) = Ne (-∣x∣ / a) e (iP₀x...

The wave function of a particle is ψ (x) = Ne (-∣x∣ / a) e (iP₀x / ℏ). Where a and P0 are constant; (e≃2,71 will be taken). a) Find the normalization constant N? b) Calculate the probability that the particle is between [-a / 2, a / 2]? c) Find the mean momentum and the mean kinetic energy of the particle in the x direction.

Consider a wave packet of a particle described by the wavefunction ψ(x,0) = Axe^−(x^2/L^2), -∞ ≤  x...

Consider a wave packet of a particle described by the wavefunction ψ(x,0) = Axe^−(x^2/L^2), -∞ ≤  x ≤ ∞. a) Draw this wavefunction, labeling the axes in terms of A and L. b) Find the relationship between A and L that satisfies the normalization condition. c) Calculate the approximate probability of finding the particle between positions x = −L and x = L. d) What are 〈x〉, 〈x^2〉, and σ_x ? (Hint: use shortcuts where possible). e) Find the minimum uncertainty...

A particle is described by the wave function ψ(x) = b(a2 - x2) for -a ≤...

A particle is described by the wave function ψ(x) = b(a2 - x2) for -a ≤ x ≤ a and ψ(x)=0 for x ≤ -a and x ≥ a , where a and b are positive real constants. (a) Using the normalization condition, find b in terms of a. (b) What is the probability to find the particle at x = 0.33a in a small interval of width 0.01a? (c) What is the probability for the particle to be found...

A particle is described by the wave function ψ(x) = b(a2 - x2) for -a ≤...

A particle is described by the wave function ψ(x) = b(a2 - x2) for -a ≤ x ≤ a and ψ(x)=0 for x ≤ -a and x ≥ a , where a and b are positive real constants. (a) Using the normalization condition, find b in terms of a. (b) What is the probability to find the particle at x = 0.33a in a small interval of width 0.01a? (c) What is the probability for the particle to be found...

7. A particle of mass m is described by the wave function ψ ( x) =...

7. A particle of mass m is described by the wave function ψ ( x) = 2a^(3/2)*xe^(−ax) when x ≥ 0 0 when x < 0 (a) (2 pts) Verify that the normalization constant is correct. (b) (3 pts) Sketch the wavefunction. Is it smooth at x = 0? (c) (2 pts) Find the particle’s most probable position. (d) (3 pts) What is the probability that the particle would be found in the region (0, 1/a)? 8. Refer to the...

Let X and Y have joint density f given by f(x, y) = cxy 0 ≤...

Let X and Y have joint density f given by f(x, y) = cxy 0 ≤ y ≤ x, 0 ≤ x ≤ 1. (a) Determine the normalization constant c. (b) Determine P(X + 2Y ≤ 1). (c) Find E(X|Y = y). (d) Find E(X).

Find the maximum likelihood estimator (MLE) for the parameter t in the Cauchy probability density f(x;t)=...

Find the maximum likelihood estimator (MLE) for the parameter t in the Cauchy probability density f(x;t)= 1/ [ Pi t(1+(x/t)^2]