Problems4.1. Using the nearly free-electron approximation for a one-dimensional (1-D)crystal lattice and assuming that the only nonvanishing Fourier coefficientsof the crystal potential are v(7/a) and v(-A/a) in (4.73), show that near theband edge at k = 0, the dependence of electron energy on the wave vectork is given byEk = Eo +2m*where m* = mo[1 – (32m,a*/h*n*)v(n/a)²]¬l is the effective mass of the-electron at k = 0.4.2. The E-k relation of a simple cubic lattice given by (4.79) is derived fromthe tight-binding approximation. Show that near k 0 this relation can beexpressed byEx == Eno +2m*where m* = h? /2B,a?.And for k T/a, show that the E-k relation is given byE = Eno +2m*where m* == -n² /2B,a?.

Answered: Image /qna-images/answer/4d222e00-9485-4212-a1ef-3fda29016f9f.jpg

Problems 4.1. Using the nearly free-electron approximation for a one-dimensional (1-D) crystal lattice and assuming that the only nonvanishing Fourier coefficients of the crystal potential are v(7/a) and v(-n/a) in (4.73), show that near the band edge at k = 0, the dependence of electron energy on the wave vector k is given by Ek = Eo + 2m* where m* = mo[l – (32mža*/h*n*)v(7/a)²]¬l is the effective mass of the electron at k = 0. %3D - %3D 4.2. The E-k relation of a simple cubic lattice given by (4.79) is derived from the tight-binding approximation. Show that near k 0 this relation can be expressed by ħ?k? Ek = Eno + 2m* where m* = h2 /2B,a². And for k 7/a, show that the E-k relation is given by Ek = Eno + 2m* where m* = %3D

Problems 4.1. Using the nearly free-electron approximation for a one-dimensional (1-D) crystal lattice and assuming that the only nonvanishing Fourier coefficients of the crystal potential are v(7/a) and v(-n/a) in (4.73), show that near the band edge at k = 0, the dependence of electron energy on the wave vector k is given by Ek = Eo + 2m* where m* = mo[l – (32mža/hn)v(7/a)²]¬l is the effective mass of the electron at k = 0. %3D - %3D 4.2. The E-k relation of a simple cubic lattice given by (4.79) is derived from the tight-binding approximation. Show that near k 0 this relation can be expressed by ħ?k? Ek = Eno + 2m where m* = h2 /2B,a². And for k 7/a, show that the E-k relation is given by Ek = Eno + 2m* where m* = %3D

Principles of Instrumental Analysis

7th Edition

ISBN:9781305577213

Author:Douglas A. Skoog, F. James Holler, Stanley R. Crouch

Publisher:Douglas A. Skoog, F. James Holler, Stanley R. Crouch

Chapter12: Atomic X-ray Spectrometry

Section: Chapter Questions

Problem 12.10QAP

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