If t and c are two complex numbers such ...

If `t` and `c` are two complex numbers such that `|t|!=|c|,|t|=1a n dz=(a t+b)/(t-c), z=x+i ydot` Locus of `z` is (where a, b are complex numbers) a. line segment b. straight line c. circle d. none of these

Similar Questions

Explore conceptually related problems

If Re((2z+1)/(iz+1))=1 , the the locus of the point representing z in the complex plane is a (A) straight line (B) circle (C) parabola (D) none of these

|z-4|+|z+4|=16 where z is as complex number ,then locus of z is (A) a circle (B) a straight line (C) a parabola (D) none of these

If z^2+z|z|+|z^2|=0, then the locus z is a. a circle b. a straight line c. a pair of straight line d. none of these

If z^(2)+z|z|+|z^(2)|=0, then the locus z is a.a a circle b.a straight line c.a pair of straight line d.none of these

If z is complex number,then the locus of z satisfying the condition |2z-1|=|z-1| is (a)perpendicular bisector of line segment joining 1/2 and 1 (b) circle (c) parabola (d) none of the above curves

If z is complex number, then the locus of z satisfying the condition |2z-1|=|z-1| is (a)perpendicular bisector of line segment joining 1/2 and 1 (b)circle (c)parabola (d)none of the above curves

If `t` and `c` are two complex numbers such that `|t|!=|c|,|t|=1a n dz=(a t+b)/(t-c), z=x+i ydot` Locus of `z` is (where a, b are complex numbers) a. line segment b. straight line c. circle d. none of these

Similar Questions

Recommended Questions