The value of ` (z + 3) (barz + 3) ` is equivlent to

If (1+i)z=(1-i)barz , then z is equal to

If the real part of (barz +2)/(barz-1) is 4, then show that the locus of the point representing z in the complex plane is a circle.

Fill in the blanks of the following . (i) For any two complex numbers z_(1), z_(2) and any real numbers a, b, |az_(1) - bz_(2)|^(2) + |bz_(1) + az_(2)|^(2) =* * * (ii) The value of sqrt(-25) xxsqrt(-9) is … (iii) The number (1 - i)^(3)/(1 -i^(3)) is equal to ... (iv) The sum of the series i + i^(2) + i^(3)+ * * * upto 1000 terms us ... (v) Multiplicative inverse of 1 + i is ... (vi) If z_(1) "and" z_(2) are complex numbers such that z_(1) + z_(2) is a real number, then z_(1) = * * * (vii) arg(z) + arg barz "where", (barz ne 0) is ... (viii) If |z + 4| le 3, "then the greatest and least values of" |z + 1| are ... and ... (ix) If |(z - 2)/(z + 2)| =(pi)/(6) , then the locus of z is ... (x) If |z| = 4 "and arg" (z) = (5pi)/(6), then z = * * *

For the complex number Z, the sum of all the solutions of Z^(2)+|Z|=(barZ)^(2) is equal to

Let Z be a complex number satisfying the relation Z^(3)+(4(barZ)^(2))/(|Z|)=0 . If the least possible argument of Z is -kpi , then k is equal to (here, argZ in (-pi, pi] )

If z= 5 , find the value of z^3 - 3(z-5 )

Value of (x-y)^(3) +(y-z)^(3) +(z-x)^(3) is

if z=3 -2i, then verify that (i) z + barz = 2Rez (ii) z - barz = 2ilm z