an exact solution of the dirac oscillator problem in
... oscillator problem in one dimension in the context of the GUP and along with the context of the usual Heisenberg uncertainty principle. We show an easy and simpler method to find the energy spectrum. The method depends on the knowledge of the energy spectrum of harmonic oscillator with GUP. We also ...
... oscillator problem in one dimension in the context of the GUP and along with the context of the usual Heisenberg uncertainty principle. We show an easy and simpler method to find the energy spectrum. The method depends on the knowledge of the energy spectrum of harmonic oscillator with GUP. We also ...
Bonding - Department of Chemistry
... radiation, unless its frequency exceeds a threshold value characteristic of the metal. (ii) The kinetic energy of the electron increases linearly with the frequency of the incident radiation but is independent of the intensity of the radiation. (iii) Even at low intensities, electrons are ejected im ...
... radiation, unless its frequency exceeds a threshold value characteristic of the metal. (ii) The kinetic energy of the electron increases linearly with the frequency of the incident radiation but is independent of the intensity of the radiation. (iii) Even at low intensities, electrons are ejected im ...
new TPC (NTPC)
... de/dx vs Momentum and/or TOF vs Momentum (PI is difficult for higher momentum due to small inner diameter of the solenoid !) K 2s separation at 0.5 GeV/c s(TOF)= 150ps or s(de/dx)/(dedx)=16% ...
... de/dx vs Momentum and/or TOF vs Momentum (PI is difficult for higher momentum due to small inner diameter of the solenoid !) K 2s separation at 0.5 GeV/c s(TOF)= 150ps or s(de/dx)/(dedx)=16% ...
The Soccer-Ball Problem
... singles out the zero-vector as a preferred point that remains invariant. That is unproblematic in momentum space because a vanishing momentum is indeed a special case. However, a point marked zero in space-time is as good as any other point, and thus accepting the special role of the zero in positio ...
... singles out the zero-vector as a preferred point that remains invariant. That is unproblematic in momentum space because a vanishing momentum is indeed a special case. However, a point marked zero in space-time is as good as any other point, and thus accepting the special role of the zero in positio ...
The Schroedinger equation
... After Planck, Einstein, Bohr, de Broglie, and many others (but before Born), the time was ripe for a complete theory that could be applied to any problem involving nano-scale particles. Apparently, it needed to produce wave solutions, so it needed to be a wave equation. The wave equation must produc ...
... After Planck, Einstein, Bohr, de Broglie, and many others (but before Born), the time was ripe for a complete theory that could be applied to any problem involving nano-scale particles. Apparently, it needed to produce wave solutions, so it needed to be a wave equation. The wave equation must produc ...
Syllabus of math and physics doc
... at the beach, who detects a drowning person off to the side in the water, he must make an optimal decision of how much to run on the sand, a fast process, and how much to swim in the water, a slow process. He has infinitely many paths to chose from, but only one choice, or function that is, is optim ...
... at the beach, who detects a drowning person off to the side in the water, he must make an optimal decision of how much to run on the sand, a fast process, and how much to swim in the water, a slow process. He has infinitely many paths to chose from, but only one choice, or function that is, is optim ...
7-0838-fassihi
... physics are related to some fundamental symmetries. We develop this by stating each conserve quantity is breaking of some symmetry. Momentum is breaking the translational symmetry of the space and energy is the breaking the symmetry of the space in time. This is realised by choosing a bounded simply ...
... physics are related to some fundamental symmetries. We develop this by stating each conserve quantity is breaking of some symmetry. Momentum is breaking the translational symmetry of the space and energy is the breaking the symmetry of the space in time. This is realised by choosing a bounded simply ...
Waves I - Galileo and Einstein
... • Sound waves in air are pressure waves. The obvious variables for dimensional analysis are the pressure [P] = [force/area] = MLT-2/L2 = ML-1T-2 and density [] = [mass/vol] = ML-3. • Clearly P / has the right dimensions, but detailed analysis proves v ...
... • Sound waves in air are pressure waves. The obvious variables for dimensional analysis are the pressure [P] = [force/area] = MLT-2/L2 = ML-1T-2 and density [] = [mass/vol] = ML-3. • Clearly P / has the right dimensions, but detailed analysis proves v ...
Momentum
... Example: External forces to the define the system as “rifle+bullet”, then “rifle+bullet” system include gravity and the explosion of the bullet and the force it whatever is holding up the rifle has with the rifle are all internal; the rifle must recoil with a momentum equal to the bullet’s momentum ...
... Example: External forces to the define the system as “rifle+bullet”, then “rifle+bullet” system include gravity and the explosion of the bullet and the force it whatever is holding up the rifle has with the rifle are all internal; the rifle must recoil with a momentum equal to the bullet’s momentum ...