For two unimodular complex number z1a n ...

For two unimodular complex number `z_1a n dz_2` `[( z )_1-z_2( z )_2z_1]^(-1)[( z )_1z_2-( z )_2z_1]^(-1)` is equal to `[z_1z_2( z )_1( z )_2]^` b. `[1 0 0 1]` c. `[1//2 0 0 1//2]` d. none of these

Similar Questions

Explore conceptually related problems

For two unimodular complex numbers z_1 and z_2, then [(bar z_1,-z_2),(bar z_2,z_1)]^-1[(z_1,z_2),(bar (-z_2),bar z_1)]^-1 is equal to

If z_1 and z_2 unimodular complex number that satisfy z_1^2 + z_2^2 = 4 then (z_1 + bar(z_1))^2 ( z_2 + bar(z_2))^2 is equal to

For any two non zero complex numbers z_(1) and z_(2) if z_(1)bar(z)_(2)+z_(2)bar(z)_(1)=0 then amp(z_(1))-amp(z_(2)) is

If for complex numbers z_(1) and z_(2) , arg z_(1)-"arg"(z_(2))=0 then |z_(1)-z_(2)| is equal to

If for complex numbers z_(1) and z_(2),arg(z_(1))-arg(z_(2))=0 then |z_(1)-z_(2)| is equal to

For any two complex numbers z_(1) and z_(2), prove that |z_(1)+z_(2)| =|z_(1)|-|z_(2)| and |z_(1)-z_(2)|>=|z_(1)|-|z_(2)|

If for complex numbers z_(1) and z_(2)arg(z_(1))-arg(z_(2))=0, then show that |z_(1)-z_(2)|=|z_(1)|-|z_(2)||

If z_(1) and z_(2) are unimodular complex numbers that satisfy z_(1)^(2)+z_(2)^(2)=4, then (z_(1)+bar(z)_(1))^(2)+(z_(2)+bar(z)_(2))^(2) equals to