The locus of the point z satisfying `Re(1/z)` = k , where k is non -zero real number , is :

locus of the point z satisfying the equation |iz-1|+|z-i|=2 is

Statement-I A point on the straight line 2x+3y-4z=5 and 3x-2y+4z=7 can be determined by taking x=k and then solving the two for equation for y and z, where k is any real number. Statement-II If c'nekc , then the straight line ax+by+cz+d=0, Kax+Kby+c'z+d'=o does not intersect the plane z=alpha , where alpha is any real number.

Find the value of discriminant of the following quadratic equation : x^2 - 2x + k = 0 , where k is a real number.

If a, b and c are three consecutive terms of an A.P.,prove that k^a, k^b and k^c are three consecutive terms of a G.P. Assume k to be a non-zero real number.

Number of complex numbers satisfying z^3 = barz is

Solve that equation z^2+|z|=0 , where z is a complex number.

If z_1, z_2 are two complex numbers satisfying the equation |(z_1 +z_2)/(z_1 -z_2)|=1 , then z_1/z_2 is a number which is :

If the imaginary part of (2z+1)/(iz+1) is -2, then the locus of the point representing z in the complex plane is :

z_(1) and z_(2) are the roots of the equation z^(2) -az + b=0 where |z_(1)|=|z_(2)|=1 and a,b are nonzero complex numbers, then

Prove that for any complex number z, the product z bar(z) is always a non-negative real number.