Consider the equation `az+b bar(z)+c=0" ""where" " "a,b,cin Z`
If `|a|!=|b|,` then z represents

Consider the equation az+b bar(z)+c=0" ""where" " "a,b,cin Z If |a|=|b| and bar(ac)!=bar(bc), then z has

Consider the equation az+bar(bz)+c=0" ""where" " "a,b,cin Z If |a|=|b|!=0and bar(a)c=bar(b)c, "then" " " az+b bar(z)+c=0 represents

Solve the equation z^(2)+|Z|=0 where z is a complex quantity.

Let a ,b and c be any three nonzero complex number. If |z|=1 and' z ' satisfies the equation a z^2+b z+c=0, prove that a .bar a = c .bar c and |a||b|= sqrt(a c( bar b )^2)

Consider the given equation 11 z^10 + 10 i z^9 + 10 i z - 11 =0 , then |z| is

Consider the following linear equations: a x+b y+c z=0 b x+c y+a z=0 c x+a y+b z=0 Match the expression/statements in column I with expression/statements in Column II. Column I, Column II a+b+c!=0 and a^2+b^2+c^2=a b+b c+c a , p. the equations represent planes meeting only at a single point a+b+c=0a n da^2+b^2+c^2!=a b+b c+c a , q. the equations represent the line x=y=z a+b+c!=0a n da^2+b^2+c^2!=a b+b c+c a , r. the equations represent identical planes a+b+c!=0 and a^2+b^2+c^2!=a b+b c+c a , s. the equations represent the whole of the three dimensional space

Let a , b , c be distinct complex numbers with |a|=|b|=|c|=1 and z_(1) , z_(2) be the roots of the equation az^(2)+bz+c=0 with |z_(1)|=1 . Let P and Q represent the complex numbers z_(1) and z_(2) in the Argand plane with /_POQ=theta , o^(@) lt 180^(@) (where O being the origin).Then

If the equation |z-a|+|z-b|=3 represents an ellipse and a ,b in C ,w h e r ea is fixed, then find the locus of bdot

Show that the equation a z^3+b z^2+ barb z+ bara =0 has a root alpha such that |alpha|=1,a ,b ,z and alpha belong to the set of complex numbers.

The roots z_1,z_2,z_3 of the equation x^3+3ax^2+3bx+c=0 in which a,b,c are complex number correspond to the points A,B,C on the gaussian pllane. Find the centroid of the triangle ABC and show that it will equilateral if a^2=b