In November 2024
Answer to Question #155608 in Quantum Mechanics for ayesha
Find the ground-state electron energy by substituting the radial wave function, π (π)= 2ππ3/2πβπππβ that corresponds to π = 1,π = 0, into radial equation for hydrogen atom.
Solution
Given radial wavefunction
"R(r)= (\\frac {1}{2a_0})^{\\frac {3}{2}} e^{-r\/a_0}"
For H- atom enegy is given
"E_n = - \\dfrac {m_ee^4}{8 \\epsilon ^2_0 h^2 n^2}"
For ground state energy n=1, l=0, m=0
Putting all value then
Ground state energy become
"E_0=-13.6eV"
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