| 11. | The complex number can be identified with the point in the complex plane.
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| 12. | This statement has a special case in the complex plane ."
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| 13. | However, what happens in the case of the extended complex plane?
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| 14. | The M�bius transformations are the only invertible meromorphic functions on the complex plane.
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| 15. | On the complex plane, this distance is expressed as } } mentioned below.
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| 16. | In the complex plane, we can approach from many directions, not just two!
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| 17. | This eventually led to the concept of the extended complex plane.
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| 18. | One can also consider orthogonal polynomials for some curve in the complex plane.
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| 19. | This ideal forms a regular hexagonal lattice in the complex plane.
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| 20. | Thus, has the property of mapping the fundamental region to the entire complex plane.
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