Notices
 

[QUE/QM-16001]

For page specific messages
For page author info
For each of the six potentials, shown in the \Figref{3dpot1} below, answer the
following.
  1. \label{16001Q1} Write the radial Schrodinger equation in different regions of $r$ values.
  2. Write the most general solution as a linear combinations of spherical Bessel functions with appropriate arugments.
  3. Impose the necessary regularity property at the origin and at $\infty$.
  4. Impose the matching conditions at the boundary of two neighbouring regions.
  5. Considering appropriate ranges of energy separately, state if energy eigenvalues are continuous or discrete?
  6. \label{16001Q2} Whenever bound states exist for a potential, obtain the condition on the bound state energy eigenvalues.

\FigBelow{0,0}{150}{220}{3dpot1}{Radial Wells for Q.
\ref{16001Q1}-\ref{16001Q2}}

Exclude node summary : 

n

4727:Diamond Point

0
 
X