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Comments
pointless bump
10th page
Let the
Bumps continueeeeeeeeee
@ehab stop, you are doing it wrong.
One picture == one post, don't merge them!
@ehab
Like this
@ehab
Don't merge
me me me
Rather than something pointless, here is something useful.
Schrödinger's equation is a fundamental equation in the field of quantum mechanics, which is the branch of physics that deals with the behavior of particles on the smallest scales, such as atoms and subatomic particles. It was formulated by Austrian physicist Erwin Schrödinger in 1925 as part of the development of wave mechanics, one of the two main formulations of quantum mechanics (the other being matrix mechanics, developed by Werner Heisenberg).
The equation itself describes how the wave function of a quantum system changes over time. The wave function, denoted as ψ (psi), is a mathematical function that contains information about the probability distribution of a particle's position or other observable properties. In other words, it provides a way to predict the likelihood of finding a particle in a particular state.
iħ∂ψ/∂t = Ĥψ
In this equation:
i represents the imaginary unit,
ħ is the reduced Planck constant,
∂ψ/∂t is the partial derivative of the wave function ψ with respect to time,
Ĥ is the Hamiltonian operator, which represents the total energy of a quantum system,
Here's a breakdown of the components of the equation:
i: The imaginary unit, which is the square root of -1, is included to handle the wave-like behavior of particles in quantum mechanics.
ħ (h-bar): This is the reduced Planck constant, a fundamental constant of nature that relates the energy of a particle to its frequency. It's a crucial factor in quantizing the physical quantities in quantum mechanics.
∂ψ/∂t: This part represents the partial derivative of the wave function ψ with respect to time (t). It describes how the wave function changes over time.
Ĥ (Hamiltonian operator): The Hamiltonian operator is a mathematical operator that represents the total energy of a quantum system. It includes the kinetic and potential energy terms that describe the system's behavior.
The equation is a partial differential equation, and solving it provides information about the allowed energy levels and corresponding wave functions for a given quantum system. It has wide-ranging applications in understanding the behavior of electrons in atoms, the interactions between particles, and the behavior of matter and energy at the quantum level.
Schrödinger's equation has had a profound impact on the field of physics and has paved the way for technologies such as semiconductors, lasers, and quantum computing. Despite its complexity, it remains a fundamental tool for predicting and understanding the behavior of particles on the quantum scale.
I'm still stuck on the Schrödinger's cat paradox. 🤷🏻♂️
But to answer the first part of your statement @alilet ....
..
pointless bump xD
Boink
Boink
Boink
Boink
Boink
bumpity
Reminder that multi-bumping back to back doesn't help you.
If your comment is selected but the comment before/after it are also you, I'm going to the person above you. This was mentioned in my OP to not multi-bump.
With that said, it's only Tuesday? Definitely feels like a Thursday. ( -_-)
Almost Wednesday, at least
Weather Channel vaporwave.
The weather channel used to be great background noise in any 90's household.
Don't forget the preview channel!
changes to preview channel
misses the channel you wanted to see by one second
Welp guess I'll just wait 5 minutes listening to chill ass 90's muzak