Home
Class 12
MATHS
[" 17.If "omega" is any complex number s...

[" 17.If "omega" is any complex number such that "],[z omega=|z|^(2)" and "|z-z|+| omega+bar(omega)|=4],[" then as "omega" varies,then the area bounded "],[" by the locus of "z" is "]

Promotional Banner

Similar Questions

Explore conceptually related problems

If omega is any complex number such that z omega = |z|^2 and |z - barz| + |omega + bar(omega)| = 4 then as omega varies, then the area bounded by the locus of z is

If omega is any complex number such that z omega=|z|^(2) and |z-barz|+|omega+baromega|=4 , then as omega varies, then the area bounded by the locus of z is

If omega is any complex number such that z omega=|z|^(2) and |z-barz|+|omega+baromega|=4 , then as omega varies, then the area bounded by the locus of z is

If omega is any complex number such that z omega=|z|^(2) and |z-barz|+|omega+baromega|=4 , then as omega varies, then the area bounded by the locus of z is

If omega is any complex number such that z omega=|z|^(2) and |z-barz|+|omega+baromega|=4 , then as omega varies, then the area bounded by the locus of z is

[" 1.If "z" and "omega" are two non-zero complex numbers such that "],[|z omega|=1" and "Arg(z)-Arg(omega)=(pi)/(2)," then "bar(z)omega" is equal to "]

Let z,omega be complex number such that z+ibar(omega)=0 and z omega=pi. Then find arg z

If z and omega are two non-zero complex numbers such that |z omega|=1" and "arg(z)-arg(omega)=(pi)/(2) , then bar(z)omega is equal to