A Gaussian wave packet is a function that satisfies the Schrodinger equation and is normalized over all space. Normalize the wave function if the Gaussian function can be written, Y(x) = Ae-[(x-c)/4ɛ]? a helpful integral: " e-a(z-b)² dz = -0- a And determine what the function of energy for a particle under this wave function would be if U(x) = 0 over all space.
A Gaussian wave packet is a function that satisfies the Schrodinger equation and is normalized over all space. Normalize the wave function if the Gaussian function can be written, Y(x) = Ae-[(x-c)/4ɛ]? a helpful integral: " e-a(z-b)² dz = -0- a And determine what the function of energy for a particle under this wave function would be if U(x) = 0 over all space.
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![A Gaussian wave packet is a function that satisfies the Schrodinger equation and is normalized
over all space. Normalize the wave function if the Gaussian function can be written,
00
Y(x) = Ae-[(x-c)/4ɛ]?
a helpful integral: " e-a(z-b)² dz =
a
And determine what the function of energy for a particle under this wave function would be if U(x) = 0 over all
space.](/v2/_next/image?url=https%3A%2F%2Fcontent.bartleby.com%2Fqna-images%2Fquestion%2Fed56e0b6-cbbe-4a68-a52e-39451a9af167%2F9d84335c-f91a-4689-8f26-d26cd5f96548%2Frh0hzv3_processed.jpeg&w=3840&q=75)
Transcribed Image Text:A Gaussian wave packet is a function that satisfies the Schrodinger equation and is normalized
over all space. Normalize the wave function if the Gaussian function can be written,
00
Y(x) = Ae-[(x-c)/4ɛ]?
a helpful integral: " e-a(z-b)² dz =
a
And determine what the function of energy for a particle under this wave function would be if U(x) = 0 over all
space.
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