Consider the equation `az + bar(bz) + c =0`, where a,b,c `in`Z
If `|a| = |b| ne 0 and az + b barc+ c=0` represents

Consider the equation az + bar(bz) + c =0 , where a,b,c in Z If |a| = |b| and barac ne b barc , then z has

Consider the equation az + bar(bz) + c =0 , where a,b,c in Z If |a| ne |b| , then z represents

Consider the equation az + b barz + c =0 , where a,b,c in Z If |a| = |b| and barac ne b barc , then z has

Consider the equation az + b bar(z) + c =0 , where a,b,c in Z If |a| ne |b| , then z represents

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

Consider the system of equations ax + by + cz = 2 bx + cy + az = 2 cx + ay + bz = 2 where a,b,c are real numbers such that a + b + c = 0. Then the system

Consider a quadratic equaiton az^(2) + bz + c=0 , where a,b,c are complex number. The condition that the equaiton has one purely real roots is