※ 引述《starwish07 (Mauricio)》之銘言： : By differentiation of the 2s radial wavefunction, locate the extreme : (i.e., ρ = ?) in its amplitude besides the one at ρ = 0. : ( R 正比於 ( 2 - ρ)e^(-ρ/2) ) : 之前問過這一題 可是我還是不知道該怎麼解出答案= = : 答案是r = 4a0 , r = 0 : ρ = Zr / a0 ，Z該如何消掉??? d( 2 - ρ)e^(-ρ/2) / dρ = ( - 1 )e^(-ρ/2) + ( 2 - ρ)( -1/2 )e^(-ρ/2) = 2 ( -1/2 )e^(-ρ/2) + ( 2 - ρ)( -1/2 )e^(-ρ/2) = [ 2 + ( 2 - ρ) ]( -1/2 )e^(-ρ/2) = ( 4 - ρ) ( -1/2 )e^(-ρ/2) => ρ = 4 有極值 d^2 ( 2 - ρ)e^(-ρ/2) / dρ^2 = d( 4 - ρ)( -1/2 )e^(-ρ/2) / dρ = ( - 1 )( -1/2 )e^(-ρ/2) + ( 4 - ρ)( -1/2 )( -1/2 )e^(-ρ/2) = ( 2 )( -1/2 )( -1/2 )e^(-ρ/2) + ( 4 - ρ)( -1/2 )( -1/2 )e^(-ρ/2) = ( 6 - ρ)( -1/2 )( -1/2 )e^(-ρ/2) = ( 6 - ρ)( 1/4 )e^(-ρ/2) => ρ < 6 時與 ρ > 6 時存在且異號 => ρ = 6 為反曲點 ρ 在 [0, 6 ) 區間內二次導數 > 0，凹向上 ρ 在 (6, ∞) 區間內二次導數 < 0，凹向下 ∵ Limit R = 0 ∴ (6, ∞) 區間內凹向下，故 R 皆 < 0 r → ∞ ρ = 4 在 [0, 6 ) 區間內凹向上，且為極值，故 ρ = 4 時 R 為極小值 ρ = (2Zr) / (na0) = (2Zr) / (2a0) = Zr/a0 = 4 => r = 4a0/Z 氫原子 => Z = 1 => r = 4a0 ρ = 0 和 ρ = 6 為 [0, 6 ) 區間的邊界 ( 2 - 0 )e^(-0/2) ) = 2 > ( 2 - 6 )e^(-6/2) ) = - 4 e^(-3) 故 ρ = 0 時 R 為最大值 ρ = (2Zr) / (na0) = (2Zr) / (2a0) = Zr/a0 = 0 => r = 0 r = 4a0 (R 為極小值) , r = 0 (R 為最大值) -- ※ 發信站: 批踢踢實業坊(ptt.cc) ◆ From: 118.161.246.146