Advertisements
Advertisements
Question
The density of KBr is 2.75 g cm−3. The length of the edge of the unit cell is 654 pm. Show that KBr has a face-centred cubic structure (NA = 6.022 × 1023 mol−1, Atomic masses : K = 39, Br = 80).
Numerical
Advertisements
Solution
Given: ρ = 2.75 g cm−3
Edge length of the unit cell (a) = 654 pm = 6.54 × 10−8 cm
Atomic mass of K = 39 g/mol, Br = 80 g/mol
Molar mass of KBr (M) = 39 + 80 = 119 g/mol
Avogadro’s number (NA) = 6.022 × 1023 mol−1
Formula: `rho = (Z xx M)/(a^3 xx N_A)`
⇒ Z = `(rho xx a^3 xx N_A)/M`
∴ a3 = (6.54 × 10−8)3
= 2.80 × 10−22 cm3
∴ Z = `(2.75 xx 2.80 xx 10^-22 xx 6.022 xx 10^23)/119`
∴ Z = `((2.75 xx 2.80 xx 6.022) xx 10^1)/119`
∴ Z = `(46.37 xx 10^1)/119`
∴ Z = `463.7/119`
∴ Z = 3.9 ≈ 4
Since Z ≈ 4, this confirms that KBr has a face-centred cubic (FCC) structure.
shaalaa.com
Is there an error in this question or solution?
