We have that the
- EN with respect to r, is mathematically given as
- r in terms of A, B, and n,
- The equation that represents the expression for E0 are given as
- [tex]EN(r)=\frac{A}{r}+\frac{B}{r^n}[/tex]
- [tex]r=\frac{A}{nB}^{1/(1-n)}[/tex]
- [tex]E_0=\frac{-A}{A/nB}1/1-n+\frac{B}{\frac{A}{nB}^{n/{1-n}}}[/tex]
From the question we are told
- The net potential energy between two adjacent ions, EN, may be represented by EN = -A/r + B/rn
- Where A, B, and n are constants whose values depend on the particular ionic system.
- Calculate the bonding energy E0 in terms of the parameters A, B, and n using the following procedure:
Energy
Generally the equation for the EN(r) is mathematically given as
a)[tex]EN(r)=\frac{A}{r}+\frac{B}{r^n}\\\\dE/dr=\frac{A}{r^2}-\frac{nB}{r^{n+1}}=0\\\\\frac{A}{r^2}=\frac{nB}{r^{2-n-1}}[/tex]
Therefore
b)[tex]r=\frac{A}{nB}^{1/(1-n)}[/tex]
c) [tex]E_0=\frac{-A}{A/nB}1/1-n+\frac{B}{\frac{A}{nB}^{n/{1-n}}}[/tex]
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