Question:
If the complex numbers \( z_1, z_2, 0 \) are vertices of an equilateral triangle, then \( z_1^2 + z_2^2 = \)
If the complex numbers \( z_1, z_2, 0 \) are vertices of an equilateral triangle, then \( z_1^2 + z_2^2 = \)
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Equilateral Triangle and Complex Numbers}
In the complex plane, equilateral triangles with one vertex at the origin satisfy the relation: \[ z_1^2 + z_2^2 = z_1 z_2. \]
Use vector rotation logic or geometric symmetry to derive such identities.
In the complex plane, equilateral triangles with one vertex at the origin satisfy the relation: \[ z_1^2 + z_2^2 = z_1 z_2. \]
Use vector rotation logic or geometric symmetry to derive such identities.
Updated On: May 19, 2025
- \( 2z_1^2 z_2^2 \)
- \( z_1^2 z_2^2 \)
- \( 2z_1 z_2 \)
- \( z_1 z_2 \)
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The Correct Option is D
Solution and Explanation
If three complex numbers form an equilateral triangle with one vertex at the origin (0), and the others at \( z_1 \) and \( z_2 \), then the following identity holds:
\[
z_1^2 + z_2^2 = z_1 z_2.
\]
This is a known result derived from geometrical symmetry in the complex plane and vector rotation by \( \pm 60^\circ \).
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