Find the value of the normalization constant A for the wave function Ф(х) :3DА-х-е
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Find the value of the normalization constant A for the wave function ψ(x) = Axe^(-x^2/2)
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- The wave function of a particle in a one-dimensional box of width L is u(x) = A sin (7x/L). If we know the particle must be somewhere in the box, what must be the value of A?The normalized wavefunction is (1/4*pi*a^2) e^-(x^2)/(2a^2)An electron is trapped inside a 1.00 nm potential well. Find the wavelength of the photons when the electron makes a transition from n =4 to n= 1.
- An electron is confined between two perfectly reflecting walls separated by the distance 12 x 10-11m. Use the Heisenberg uncertainty relation to estimate the lowest energy that the particle can have (in eV).Show that normalizing the particle-in-a-box wave function ψ_n (x)=A sin(nπx/L) gives A=√(2/L).