| 1. | The other roots must be a complex conjugate pair.
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| 2. | In fact, all thermodynamic potentials are expressed in terms of conjugate pairs.
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| 3. | In other words, the conjugate pairs are conjugate with respect to energy.
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| 4. | As an example, consider the pV conjugate pair.
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| 5. | The variable pair mmf and magnetic flux is not a power conjugate pair.
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| 6. | There are some commonly used analogies that do not use power conjugate pairs.
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| 7. | In the latter case, all the complex roots come in complex conjugate pairs.
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| 8. | It can be described by conjugate pair.
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| 9. | Where and are conjugate pairs, and the are the natural variables of the potential.
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| 10. | In general, conjugate pairs can be defined with respect to any thermodynamic state function.
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