Calculation of Inductance and Mutual Inductance Two coils are wound on a toroidal core as illustrated in Figure 15.16. The reluctance of the core is 10 7 (ampere-turns)/Wb. Determine the self inductances and mutual inductance of the coils. Assume that the flux is confined to the core so that all of the flux links both coils.

The self inductances can be computed using Equation 15.25. For coil 1, we have [latex] L=\frac{N^2}{R} [/latex] (15.25) [latex] L_1=\frac{N_1^2}{R}=\frac{100^2}{10^7}=1~\mathrm{mH}[/latex] Similarly, for coil 2 we get [latex] L_2=\frac{N_2^2}{R}=\frac{200^2}{10^7}=4~\mathrm{mH}[/latex] To compute the mutual inductance, we find the flux produced by i 1 : [latex] \phi_1=\frac{N_1i_1}{R}=\frac{100i_1}{10^7}=10^{-5}i_1 [/latex] The flux linkages of coil 2 resulting from the current in coil 1 are given by [latex] \lambda_{21}=N_2\phi_1=200 \times 10^{-5}i_1 [/latex] Finally, the mutual inductance is [latex]M=\frac{\lambda_{21}}{i_1}=2\mathrm{~mH} [/latex]

Question 15.8: Calculation of Inductance and Mutual Inductance Two coils ar...

Electrical Engineering: Principles and Applications

Calculation of Inductance and Mutual Inductance
Two coils are wound on a toroidal core as illustrated in Figure 15.16. The reluctance of the core is 10⁷ (ampere-turns)/Wb. Determine the self inductances and mutual inductance of the coils. Assume that the flux is confined to the core so that all of the flux links both coils.

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The self inductances can be computed using Equation 15.25. For coil 1, we have

$L=\frac{N^2}{R}$ (15.25)

$L_1=\frac{N_1^2}{R}=\frac{100^2}{10^7}=1~\mathrm{mH}$

Similarly, for coil 2 we get

$L_2=\frac{N_2^2}{R}=\frac{200^2}{10^7}=4~\mathrm{mH}$

To compute the mutual inductance, we find the flux produced by i₁:

$\phi_1=\frac{N_1i_1}{R}=\frac{100i_1}{10^7}=10^{-5}i_1$

The flux linkages of coil 2 resulting from the current in coil 1 are given by

$\lambda_{21}=N_2\phi_1=200 \times 10^{-5}i_1$

Finally, the mutual inductance is

$M=\frac{\lambda_{21}}{i_1}=2\mathrm{~mH}$