| 1. | The exponential function extends to an entire function on the complex plane.
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| 2. | In the case, the complex plane, this results in the M�bius group.
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| 3. | Gradians are also convenient when working with vectors on the complex plane.
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| 4. | Figure 2 depicts it as a rotating vector in a complex plane.
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| 5. | The curve can be described parametrically on the complex plane as well,
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| 6. | Consider the right triangle in the complex plane which has as vertices.
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| 7. | And describe multiplication by \ lambda _ i in the complex plane.
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| 8. | The concept of the complex plane allows a geometric interpretation of complex numbers.
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| 9. | Ford circles can also be thought of as curves in the complex plane.
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| 10. | Another related use of the complex plane is with the Nyquist stability criterion.
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