Answer:
The fraction of the available octahedral positions are filled with [tex]Al^{3+}[/tex] ions is [tex]\frac{2}{3}[/tex]
Explanation:
If there are n numbers of spheres in HCP in packing:
Number of octahedral void = n
Number of tetrahedral void = 2n
Total number of voids = n + 2n = 3n
The [tex]Al_2O_3[/tex] crystal structure consists of an HCP arrangement of [tex]O^{2-}[/tex]ions.
Number of spheres in HCP = 6
Number of [tex]O^{2-}[/tex] = 6
Number of octahedral voids = 6
Number of tetrahedral void = 12
Number of aluminum ions when there are 6 [tex]O^{2-}[/tex] ion =[tex]\frac{2}{3}\times 6= 4[/tex]
Number of voids in which [tex]Al^3+[/tex] ions are present = 4
The fraction of the available octahedral positions are filled with [tex]Al^{3+}[/tex] ions = [tex]\frac{4}{6}=\frac{2}{3}[/tex]
