2. Show that the dispersion relation for the lattice vibrations of a chain of identicalmasses M, in which each is connected to its first and second nearest neighbours bysprings of spring constants K and K, respectively, isMo = 2K[1- cos(ka)]+2K,[1- cos(2ka)]where a is the equilibrium spacing.Show that:(a) this dispersion relation reduces to that for sound waves in the long-wavelength limit(ensure that the velocity corresponds to that predicted by the elastic modulus of thecrystal);(b) the group velocity vanishes at k = ±a/a; and(c) o is periodic in k with period 27/a.

Write the expression to calculate the force exerted on the nth atom in the lattice.…

Show that the dispersion relation for the lattice vibrations of a chain of identical masses M, in which each is connected to its first and second nearest neighbours by springs of spring constants K and K, respectively, is Mo = 2K[1- cos(ka)]+2K,[1-cos(2ka)] where a is the equilibrium spacing. Show that: this dispersion relation reduces to that for sound waves in the long-wavelength limit (ensure that the velocity corresponds to that predicted by the elastic modulus of the crystal); the group velocity vanishes at k = t7/a; and o is periodic in k with period 2/a.

Show that the dispersion relation for the lattice vibrations of a chain of identical masses M, in which each is connected to its first and second nearest neighbours by springs of spring constants K and K, respectively, is Mo = 2K[1- cos(ka)]+2K,[1-cos(2ka)] where a is the equilibrium spacing. Show that: this dispersion relation reduces to that for sound waves in the long-wavelength limit (ensure that the velocity corresponds to that predicted by the elastic modulus of the crystal); the group velocity vanishes at k = t7/a; and o is periodic in k with period 2/a.