| 1. | Branches have the advantage that they can be evaluated at complex numbers.
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| 2. | With these definitions the trigonometric functions can be defined for complex numbers.
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| 3. | With \ mathbb { C } denoting the set of complex numbers.
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| 4. | The theory involves complicated comparisons between finite fields and the complex numbers.
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| 5. | Conversion between the forms follows the normal conversion rules of complex numbers.
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| 6. | Where ? and ? may be taken as arbitrary complex numbers, see.
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| 7. | They also form a commutative unital associative algebra over the complex numbers.
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| 8. | Java standard library does not have classes to deal with complex numbers.
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| 9. | The fact that the complex numbers are algebraically closed is required here.
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| 10. | All operations on complex numbers are defined in complex . h header.
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