JEE Advanced · Mathematics · 3. Complex Numbers
Let \(\omega=e^{i \pi / 3}\) and \(a, b, c, x, y, z\) be non-zero complex numbers such that \(a+b+c=x, a+b \omega+c \omega^2=y, a+b \omega^2+c \omega=z\).
Then, the value of \(\frac{|x|^2+|y|^2+|z|^2}{|a|^2+|b|^2+|c|^2}\) is
- A 3
- B 6
- C 9
- D 12
Answer & Solution
Correct Answer
(A) 3
Step-by-step Solution
Detailed explanation
Here, \(\omega=e^{i 2 \pi / 3}\), then only integer solution exists.
Then, \(\frac{\left|x^2\right|+\left|y^2\right|+\left|z^2\right|}{\left|a^2\right|+\left|b^2\right|+\left|c^2\right|}=3\)
Then, \(\frac{\left|x^2\right|+\left|y^2\right|+\left|z^2\right|}{\left|a^2\right|+\left|b^2\right|+\left|c^2\right|}=3\)
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