6: Números Complejos
- Page ID
- 114451
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- Aunque muy poderosos, los números reales son inadecuados para resolver ecuaciones como\(x^2+1=0\), y aquí es donde entran los números complejos.
- 6.2: Forma polar
- En la sección anterior, identificamos un número complejo\(z=a+bi\) con un punto\(\left( a, b\right)\) en el plano de coordenadas. Hay otra forma en la que podemos expresar el mismo número, llamada la forma polar.
- 6.3: Raíces de números complejos
- Una identidad fundamental es la fórmula de De Moivre con la que iniciamos esta sección.
Miniaturas: Argumento\(φ\) y módulo\(r\) localizan un punto en el plano complejo. (CC BY-SA 3.0; Wolfkeeper vía Wikipedia)