The normalised wavefunction for an atom with atomic mass A=96, magnetically trapped in a 1D harmonic oscillator of frequency 690 Hz can be written: ψ=(0.179 ψ0)+(0.107 i ψ5)+(h ψ9). As the individual wavefunctions are orthonormal, use your knowledge to work out |h|, and hence find the expectation value for the energy of the atom, in peV. This is at the opposite end of the energy spectrum to the LHC!
The normalised wavefunction for an atom with atomic mass A=96, magnetically trapped in a 1D harmonic oscillator of frequency 690 Hz can be written: ψ=(0.179 ψ0)+(0.107 i ψ5)+(h ψ9). As the individual wavefunctions are orthonormal, use your knowledge to work out |h|, and hence find the expectation value for the energy of the atom, in peV. This is at the opposite end of the energy spectrum to the LHC!
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The normalised wavefunction for an atom with atomic mass A=96, magnetically trapped in a 1D harmonic oscillator of frequency 690 Hz can be written:
ψ=(0.179 ψ0)+(0.107 i ψ5)+(h ψ9). As the individual wavefunctions are orthonormal, use your knowledge to work out |h|, and hence find the expectation value for the energy of the atom, in peV. This is at the opposite end of the energy spectrum to the LHC!
ψ=(0.179 ψ0)+(0.107 i ψ5)+(h ψ9). As the individual wavefunctions are orthonormal, use your knowledge to work out |h|, and hence find the expectation value for the energy of the atom, in peV. This is at the opposite end of the energy spectrum to the LHC!
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