The locus of z given by |(z-1)/(z-iota)|...

The locus of z given by `|(z-1)/(z-iota)|=1` is `a (n)`

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Statement-1 : The locus of z , if arg((z-1)/(z+1)) = pi/2 is a circle. and Statement -2 : |(z-2)/(z+2)| = pi/2 , then the locus of z is a circle.

Statement-1 : The locus of z , if arg((z-1)/(z+1)) = pi/2 is a circle. and Statement -2 : |(z-2)/(z+2)| = pi/2 , then the locus of z is a circle.

The locus of Z satisfying |z| + |z - 1| = 3 is

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