Find the rectangular form of the complex number [tex](\cos(\frac{\pi}{6})+i \sin( \frac{\pi}{6}))\: \times (\cos(\frac{\pi}{12})+i \sin( \frac{\pi}{12} )) [/tex]
The rectangular representation of a complex number is in the form z = a + bi . If you were to represent a complex number according to its Cartesian Coordinates, it would be in the form: (a, b) ; where a , the real part, lies along the x axis and the imaginary part, b , along the y axis.
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Answer:
The rectangular representation of a complex number is in the form z = a + bi . If you were to represent a complex number according to its Cartesian Coordinates, it would be in the form: (a, b) ; where a , the real part, lies along the x axis and the imaginary part, b , along the y axis.