Let `z=x+iy` then locus of moving point P(z) `(1+barz)/z in R`, is
Let `z=x+iy` then locus of moving point P(z) `(1+barz)/z in R`, is
A. union of lines with equations `x=0` and `y=-1//2`but excluding origin.
B. union of lines with equations `x=0` and `y=1//2`but excluding origin.
C. union of lines with equations `x=-1//2` and `y=0`but excluding origin.
D. union of lines with equations `x=1//2` and `y=0`but excluding origin.
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Correct Answer - C
`(c )` Given `(1+barz)/(z)` is real `implies(1+barz)/(z)=(1+z)/(z)`
`impliesbarz+barz^(2)=z+z^(2)implies(barz-z)+(barz-z)(barz+z)=0`
`implies(barz-z)(1+barz+z)=0`
So either `barz=z(z ne 0)` or `z+barz+1=0`
`implies y=0` or `x=(-1)/(2)` but excluding origin.
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