Let the complex number be such that is purely imaginary. If , then is equal to:
- A
- B
- C
- D
Let the complex number be such that is purely imaginary. If , then is equal to:
Correct answer:C
Standard Method
Given: and is purely imaginary. Also, .
Find: The value of .
Since the given expression is purely imaginary, its real part must be zero:
Substitute :
Rationalizing the denominator,
The denominator becomes
and the real part of the numerator is
So,
Expand and simplify:
From , we get
Substitute this into the equation:
which gives
Now divide by :
Therefore, the value of is . The working leads to option C on the solution, but this value matches option D in the listed choices, so the correct option by value is D.
Answer Discrepancy Note
The solution derives
which directly implies
However, the same the solution incorrectly labels the correct option as C and also writes Correct Option: (3). Among the provided options, is option D. Therefore, the mathematically defensible answer is D.
Setting the whole fraction equal to zero instead of only its real part. A purely imaginary number need not be zero; only its real part must vanish. Use , not .
Using instead of from . This sign error changes the final expression completely. Rearrange carefully before substitution.
Stopping at and not isolating the required quantity. The question asks for , so divide the equation by and then solve for that expression.
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