Geometrical Representation of Argument and Modulus
If z be a com...
Question
If z be a complex number satisfying |Re(z)|+|Im(z)|=4, then |z| cannot be:
A
√7
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B
√172
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C
√10
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D
√8
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Solution
The correct option is A√7 |Re(z)|+|Im(z)|=4
Let z=x+iy ⇒|x|+|y|=4 ∴z lies on the square.
Maximum value of |z|=4 when z=4,−4,4i,−4i
Minimum value of |z|=2√2 when z=±2+2i,2±2i |z|∈[2√2,4] |z|∈[√8,√16] |z|≠√7