| 11. | Let ? be a complex number with strictly positive imaginary part.
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| 12. | Capacitive admittances have positive imaginary parts and inductive admittances have negative imaginary parts.
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| 13. | By taking linear combinations, the real and imaginary parts of are each solutions.
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| 14. | In fact if the imaginary part of is positive, then is invertible since
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| 15. | Which has a pole in z = 0.5 ( zero imaginary part ).
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| 16. | The imaginary part is a sine wave with perpendicular polarisation to the cosine wave.
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| 17. | Which I can't separate into the real and imaginary part.
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| 18. | Are called the imaginary parts of the complex amplitude represented by \ widehat a.
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| 19. | In complex analysis, the hyperbolic functions arise as the imaginary parts of sine and cosine.
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| 20. | A complex number is called arithmetical if its real and imaginary parts are both arithmetical.
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