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Let \( z \) be a complex number such that the real part of \[ \frac{z - 2i}{z + 2i} \] is zero. Then, the maximum value of \( |z - (6 + 8i)| \) is equal to:
Let \( z \) be a complex number such that the real part of \[ \frac{z - 2i}{z + 2i} \] is zero. Then, the maximum value of \( |z - (6 + 8i)| \) is equal to:
Updated On: Nov 19, 2024
- 12
- \(\infty\)
- 10
- 8
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The Correct Option is A
Solution and Explanation
Given the expression:
\[ \frac{z - 2i}{z + 2i} + \frac{\overline{z} + 2i}{\overline{z} - 2i} = 0, \]
we proceed by simplifying each term. Expanding and multiplying, we obtain:
\[ z\overline{z} - 2i\overline{z} - 2iz + 4(-1) + \overline{z}z + 2zi + 2z\overline{i} + 4(-1) = 0. \]
Combining terms, we get:
\[ 2|z|^2 = 8 \implies |z| = 2. \]
Now, we find the maximum value of \( |z - (6 + 8i)| \):
\[ |z - (6 + 8i)|_{\text{maximum}} = 10 + 2 = 12. \]
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