If the equation a|z|² + α'z + αz' + d = 0 represents a circle where a, d are real constants, then which of the following condition is correct? &lt;!-- [if !supportLineBreakNewLine]--&gt; &lt;!--[endif]--&gt;

α|² - ad > 0 and a ∈ R - {0}

|α|² - ad ≠ 0

α = 0, a, d ∈ R⁺

|α|² - ad > 0 and a ∈ R

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

If the equation a|z|² + α'z + αz' + d = 0 represents a circle where a, d are real constants, then which of the following condition is correct?

Option 1 -

|α|² - ad ≠ 0

Option 2 -

α = 0, a, d ∈ R⁺

Option 3 -

|α|² - ad > 0 and a ∈ R

Option 4 -

α|² - ad > 0 and a ∈ R - {0}

8 Views | Posted a month ago

Asked by Shiksha User

1 Answer

Answered by

Vishal Baghel | Contributor-Level 10

a month ago

Correct Option - 4

Detailed Solution:

The general equation of a circle is given by:
az z? + α? z + αz? + d = 0

This can be rewritten as:
z? + (α? /a)z + (α/a)z? + d/a = 0

From this, we can identify the centre and radius:
Centre = -α/a
Radius = √ (|-α/a|² - d/a)

For a real circle to exist, the term under the square root must be non-negative:
|-α/a|² - d/a ≥ 0
|α|²/|a|² - d/a ≥ 0
|α|² - ad ≥ 0, where a ∈ R - {0}.

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