The lattice energy of NaBr can be calculated using the Born-Haber cycle by considering the different energy changes associated with forming NaBr from its constituent elements. We start with the following data:
- Enthalpy of sublimation of Na (ΔHsubl) = +109 kJ/mol
- Bond energy of Br2 (DBr-Br) = +192 kJ/mol
- Ionization energy of Na (IENa) = +496 kJ/mol
- Electron affinity of Br (EABr) = -324 kJ/mol
To find the lattice energy (Ulattice), we can follow this sequence:
- Sublimation of solid sodium: +109 kJ/mol
- Dissociation of Br2 into two Br atoms: +192 kJ/mol (but since we need one Br, we take half of this value: +96 kJ/mol)
- Ionization of Na to Na+: +496 kJ/mol
- Gaining an electron by Br to form Br–: -324 kJ/mol
The overall formation of NaBr from its gaseous ions can be summed up as follows:
Ulattice = ΔHsubl + (0.5 × DBr-Br) + IENa + EABr + Ulattice
To rearrange for Ulattice, we can set up the equation:
Ulattice = ΔHf – (ΔHsubl + 0.5 × DBr-Br + IENa + EABr)
Since the standard enthalpy of formation (ΔHf) of NaBr can be considered as -ΔHlattice in this case, we can substitute the known values:
Ulattice = 0 – (109 + 96 + 496 – 324)
Calculating this gives:
Ulattice = – (109 + 96 + 496 – 324) = – (377) kJ/mol
Thus, the lattice energy of NaBr is approximately +377 kJ/mol (taking into account that lattice energy is conventionally expressed as a positive value).
This value represents the energy released when gaseous ions combine to form an ionic solid, illustrating the strength of the ionic bonds in NaBr.