Class 11th Maths Complex Numbers and Quadratic Equations Ncert Solutions Maths class 11th

Let z = x + iy be a non-zero complex number such that z² = i|z|², where i = √-1, then z lies on the:

Option 1 - <p>line, y = -x<br><br></p>

Option 2 - <p>imaginary axis<br><br></p>

Option 3 - <p>line, y = x<br><br></p>

Option 4 - <p>real axis</p>

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Answered by

Raj Pandey | Contributor-Level 9

5 months ago

Correct Option - 3

Detailed Solution:

Assuming the equation is (x + iy)² = I (x² + y²)
x² - y² + 2ixy = I (x² + y²)
Compare real and imaginary parts
x² - y² = 0 ⇒ x = y or x = -y
2xy = x² + y²
If x=y, then 2x² = x² + x², which is true for all x.
If x=-y, then -2y² = y² + y² = 2y², which implies 4y²=0, so y=0 and x=0.
The non-trivial solution i

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Maths Ncert Solutions class 11th 2026

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