gc (E) = (m*n/π2*ћ3 )*sqrt(2m*n (E-Ec)) Note: Dimension of gc (E) = 1/m3*J Effective mass = m*n Use the Density of states of the conduction band gc(E) to evaluate the number of states/cm3 in the conduction band at temperature T in the energy range Ec to Ec+kT, as you evaluate the integral, assume that the effective mass is independent of the energy and can be treated as a constant.

gc (E) = (mn/π2ћ3 )sqrt(2mn (E-Ec)) Note: Dimension of gc (E) = 1/m3J Effective mass = mn Use the Density of states of the conduction band gc(E) to evaluate the number of states/cm3 in the conduction band at temperature T in the energy range Ec to Ec+kT, as you evaluate the integral, assume that the effective mass is independent of the energy and can be treated as a constant.

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g_c (E) = (m*n/π²*ћ³ )*sqrt(2m*n (E-E_c))

Note: Dimension of g_c (E) = 1/m³*J

Effective mass = m*n

Use the Density of states of the conduction band g_c(E) to evaluate the number of states/cm3
in the conduction band at temperature T in the energy range Ec to Ec+kT, as you evaluate the integral, assume that the effective mass is independent of the energy and can be treated as a constant.

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