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Calculate the fraction of lattice sites that are schottky defects for cesium chloride at its melting temperature (645oc). assume an energy for defect formation of 1.86 ev.

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PBCHEM
Answer : 7.87 X [tex] 10^{-6} [/tex].

Explanation : To find the fraction of schottky defects in the given lattice of CsCl,

we use the formula, [tex] \frac{N_{s} }{N}} = exp ( \frac{-Q_{s}}{2KT} )[/tex]

on solving with the given values ,[tex]Q_{s}= 1.86 eV[/tex] and T as 645 + 273 K and rest are the constants.

[tex]\frac{N_{s} }{N}} = exp ( \frac{-1.86 eV}{2 X (8.62 X 10^{-5}) X (645 +273)} )[/tex]

we get the answer as 7.87 X [tex] 10^{-6} [/tex].
sebassandin

Answer:

[tex]\frac{Ns}{N}=8.398x10^{-6}[/tex]

Explanation:

Hello,

The fraction lattice sites is computed via:

[tex]\frac{Ns}{N}=exp(-\frac{Q}{2kT} )[/tex]

Whereas [tex]Q[/tex] is the given energy in ev, [tex]T[/tex] the temperature in Kelvins  and [tex]k[/tex] the Boltzmann's constant in ev/K, in this manner, the resulting fraction is shown below:

[tex]\frac{Ns}{N} =exp(-\frac{1.85ev}{2*8.62x10^{-5}ev/K*(645+273.15)K})\\ \frac{Ns}{N}=8.398x10^{-6}[/tex]

Best regards.

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