拿到数据(M[emu/g],T[K]),这是对质量归一的磁化强度(总磁矩/质量数)。或说1g该物质产生的磁矩。我们需要知道1 mol该物质产生的磁矩,则需要计算1g该物质有多少mol。要计算mol数,首先得确定计数单元(cu, Counting units)。
选取计数单元。如,将一组FeGa3原子集作为一个计数单元,则1 mol的该计数单元的质量为:
m m o l = 55.8 + 69.7 × 3 = 264.9 [ g/mol ] m_{mol}=55.8+69.7\times3=264.9 \;[\text{g/mol}] m m o l = 55.8 + 69.7 × 3 = 264.9 [ g/mol ] 因而,1g 该物质包含1 / 264.9 = 0.00377501 1/264.9=0.00377501 1/264.9 = 0.00377501
M [emu/g] = M [emu/0.00377501 mol] = 264.9 M [emu/mol] M\text{[emu/g]}=M\text{[emu/0.00377501 mol]}=264.9M\text{[emu/mol]} M [emu/g] = M [emu/0.00377501 mol] = 264.9 M [emu/mol] 这就是说,1g该物质的磁矩为M,则1mol该计数单元的磁矩便是264.9g该物质的磁矩,即264.9M.
再除去磁场,得到(264.9*M/H[emu/Oe/mol],T[K])。
居里定律是:
M = μ 0 H N A n ( g S ( S + 1 ) μ B ) 2 3 k B T = μ 0 H N A n ( μ μ B ) 2 3 k B T M = \frac{\mu_0HN_An(g\sqrt{S(S+1)}\mu_B)^2}{3k_BT}=\frac{\mu_0HN_An(\mu\mu_B)^2}{3k_BT} M = 3 k B T μ 0 H N A n ( g S ( S + 1 ) μ B ) 2 = 3 k B T μ 0 H N A n ( μ μ B ) 2 其中,μ μ B \mu\mu_B μ μ B n N A nN_A n N A
磁化率即:
χ = M H = β n μ 2 1 T , β ≡ N A μ 0 μ B 2 3 k B \chi = \frac{M}{H}=\beta n\mu^2\frac{1}{T},\beta\equiv\frac{N_A\mu_0\mu_B^2}{3k_B} χ = H M = β n μ 2 T 1 , β ≡ 3 k B N A μ 0 μ B 2 通常会取倒数,然后用直线拟合:
χ − 1 = 1 β n μ 2 T = k T \chi^{-1}=\frac{1}{\beta n\mu^2}T=kT χ − 1 = β n μ 2 1 T = k T 单位转换# 1 A ⋅ m 2 = 1 0 3 emu 1 T : = 1 0 4 Gs : = 1 0 4 Oe 1 J : = 1 0 7 Oe ⋅ emu 1 Oe = 1000 / 4 π A/m 1\text{A}\cdot\text{m}^2=10^3\text{emu}\\ 1\text{T}:=10^4\text{Gs}:=10^4\text{Oe}\\ 1\text{J} := 10^{7}\text{Oe}\cdot\text{emu}\\ 1\text{Oe}=1000/4\pi \;\text{A/m} 1 A ⋅ m 2 = 1 0 3 emu 1 T := 1 0 4 Gs := 1 0 4 Oe 1 J := 1 0 7 Oe ⋅ emu 1 Oe = 1000/4 π A/m μ B \mu_B μ B × 1 0 − 24 \times10^{-24} × 1 0 − 24 ⋅ \cdot ⋅ 2 ^2 2 9.274 × 1 0 − 21 emu 9.274\times10^{-21}\text {emu} 9.274 × 1 0 − 21 emu k B k_B k B 1.380649 × 1 0 − 23 1.380649 × 10^{-23} 1.380649 × 1 0 − 23 1.380649 × 1 0 − 16 1.380649 × 10^{-16} 1.380649 × 1 0 − 16 ⋅ \cdot ⋅ μ 0 \mu_0 μ 0 4 π × 1 0 − 7 N/A 2 4\pi\times10^{-7} \;\text{N/A}^2 4 π × 1 0 − 7 N/A 2 N A N_A N A × 1 0 23 \times 10^{23} × 1 0 23 SI单位制# 若数据为M=m[emu/mol],H=h[Oe],转换为国际单位,则是:
M = m/1000[A.m2 ^2 2 π \pi π
χ = \chi= χ = π \pi π 1 0 6 10^6 1 0 6 3 ^3 3
计算β \beta β
β = 6.02 ∗ 1 0 23 ∗ 4 π ∗ 1 0 − 7 ∗ 9.27 4 2 ∗ 1 0 − 24 ∗ 2 3 ∗ 1.380649 ∗ 1 0 − 23 = 4 π ∗ 1.25005 ∗ 1 0 − 7 [ m 3 / m o l / K ] \beta=\frac{6.02*10^{23}*4\pi*10^{-7}*9.274^2*10^{-24*2}}{3*1.380649*10^{-23}}\\=4\pi*1.25005*10^{-7}[\text{m}^3/mol/K] β = 3 ∗ 1.380649 ∗ 1 0 − 23 6.02 ∗ 1 0 23 ∗ 4 π ∗ 1 0 − 7 ∗ 9.27 4 2 ∗ 1 0 − 24 ∗ 2 = 4 π ∗ 1.25005 ∗ 1 0 − 7 [ m 3 / m o l / K ] 由拟合斜率k k k
1 / k = β n μ 2 → n μ = 1 / k β 1/k=\beta n\mu^2\rightarrow\sqrt{n}\mu=\sqrt{1/k\beta} 1/ k = β n μ 2 → n μ = 1/ k β CGS单位制# 若数据为M=m[emu/mol],H=h[Oe],均为CGS制,无需换算,则磁化率为:
χ \chi χ
计算β \beta β
β = 6.02 ∗ 1 0 23 ∗ 9.27 4 2 ∗ 1 0 − 21 ∗ 2 3 ∗ 1.380649 ∗ 1 0 − 16 = 0.125005 \beta=\frac{6.02*10^{23}*9.274^2*10^{-21*2}}{3*1.380649 *10^{-16}}=0.125005 β = 3 ∗ 1.380649 ∗ 1 0 − 16 6.02 ∗ 1 0 23 ∗ 9.27 4 2 ∗ 1 0 − 21 ∗ 2 = 0.125005 其中,μ 0 \mu_0 μ 0 k k k
n μ = 8 / k \sqrt{n}\mu=\sqrt{8/k} n μ = 8/ k 