Phy5645/HydrogenAtomProblem3: Difference between revisions

(Submitted by team 5. This is based on problems 4.13 and 4.14 from Quantum Mechanics by Griffiths)

Solution

${\displaystyle \psi ={\frac {e^{\frac {-r}{a}}}{\sqrt {\pi a^{3}}}}}$

so ${\displaystyle <r^{n}>={\frac {1}{\pi a^{3}}}\int \ r^{n}e^{\frac {-2r}{a}}r^{2}sin{\theta }\,dr\,d\theta \,d\phi ={\frac {4\pi }{\pi a^{3}}}\int _{0}^{\infty }\!r^{n+2}e^{\frac {-2r}{a}}\,dr}$

${\displaystyle <r>={\frac {4}{a^{3}}}\int _{0}^{\infty }\!r^{3}e^{\frac {-2r}{a}}\,dr={\frac {4}{a^{3}}}3!({\frac {a}{2}})^{4}={\frac {3}{2}}a}$

${\displaystyle <r^{2}>={\frac {4}{a^{3}}}\int _{0}^{\infty }\!r^{4}e^{\frac {-2r}{a}}\,dr={\frac {4}{a^{3}}}4!({\frac {a}{2}})^{5}=3a^{2}}$

(B) What is the most probable value of r, in the ground state of hydrogen?

Solution

${\displaystyle \psi ={\frac {1}{\sqrt {\pi a^{3}}}}e^{\frac {-r}{a}}}$

${\displaystyle P=\mid \psi \mid ^{2}4\pi r^{2}dr={\frac {4}{a^{3}}}e^{\frac {-2r}{a}}r^{2}dr=p(r)dr;p(r)={\frac {4}{a^{3}}}r^{2}e^{\frac {-2r}{a}}}$

${\displaystyle {\frac {dp}{dr}}={\frac {4}{a^{3}}}[2re^{\frac {-2r}{a}}+r^{2}({\frac {-2}{a}}e^{\frac {-2r}{a}})]={\frac {8r}{a^{3}}}e^{\frac {-2r}{a}}(1-{\frac {r}{a}})=0\implies r=a}$

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