In the Argand plane ,the distinct roots of `1+z+z^(3)+z^(4)=0` (z is a complex number ) represent vertices of -

If z^4+1=sqrt(3)i (A) z^3 is purely real (B) z represents the vertices of a square of side 2^(1/4) (C) z^9 is purely imaginary (D) z represents the vertices of a square of side 2^(3/4)

Let z be a complex number satisfying |z+16|=4|z+1| . Then

If |z+i|-|z-1|=|z|-2=0 for a complex number z, then z =

Number of solutions of the equation z^3+[3(barz)^2]/|z|=0 where z is a complex number is

Given that the complex numbers which satisfy the equation | z bar z ^3|+| bar z z^3|=350 form a rectangle in the Argand plane with the length of its diagonal having an integral number of units, then area of rectangle is 48 sq. units if z_1, z_2, z_3, z_4 are vertices of rectangle, then z_1+z_2+z_3+z_4=0 rectangle is symmetrical about the real axis a r g(z_1-z_3)=pi/4or(3pi)/4

If one root of the equation z^2-a z+a-1= 0 is (1+i), where a is a complex number then find the root.

Consider the circle |z|=r in the Argand plane, which is in fact the incircle of triangle A B Cdot If contact points opposite to the vertices A ,B ,C are A_1(z_1),B(z_2) a n d C_1(z_3) , obtain the complex numbers associated with the vertices A ,B ,C in terms of z_1, z_2a n d z_3dot

If in argand plane the vertices A,B,C of an isoceles triangle are represented by the complex nos z_1 ,z_2, z_3 respectively where angleC=90^@ then show that (z_1-z_2)^2=2(z_1-z_3)(z_3-z_2)

Consider the region R in the Argand plane described by the complex number. Z satisfying the inequalities |Z-2| le |Z-4| , |Z-3| le |Z+3| , |Z-i| le |Z-3i| , |Z+i| le |Z+3i| Answer the followin questions : Minimum of |Z_(1)-Z_(2)| given that Z_(1) , Z_(2) are any two complex numbers lying in the region R is

Suppose that z_(1), z_(2), z_(3) are three vertices of an equilateral triangle in the Argand plane. Let alpha=(1)/(2) (sqrt(3) +i) and beta be a non-zero complex number. The point alphaz_(1) +beta, alpha z_(2)+beta, az_(3)+beta will be