Let omega= (sqrt(3+i))/(2)" and "P={W^(n...

Let `omega= (sqrt(3+i))/(2)" and "P={W^(n): n 1, 2, 3"………"}` further
`H_(1)= {z in C : Re(z) gt (1)/(2)}`
and `H_(2)= {z in C : Re (z) lt -(1)/(2)}`, where C is the set of all complex numbers. If `z in P cap H_(2)" and "0` represents the origin then `/_z_(1) 0 z_(2)=`

`(pi)/(2)`

`(pi)/(6)`

`(2pi)/(3)`

`(5pi)/(6)`

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The correct Answer is:

C, D

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Let `omega= (sqrt(3+i))/(2)" and "P={W^(n): n 1, 2, 3"………"}` further `H_(1)= {z in C : Re(z) gt (1)/(2)}` and `H_(2)= {z in C : Re (z) lt -(1)/(2)}`, where C is the set of all complex numbers. If `z in P cap H_(2)" and "0` represents the origin then `/_z_(1) 0 z_(2)=`

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ML KHANNA-EXAMINATION PAPER -2013-PAPER -II SECTION-1 (ONE OR MORE OPTION CORRECT TYPE)

Let `omega= (sqrt(3+i))/(2)" and "P={W^(n): n 1, 2, 3"………"}` further
`H_(1)= {z in C : Re(z) gt (1)/(2)}`
and `H_(2)= {z in C : Re (z) lt -(1)/(2)}`, where C is the set of all complex numbers. If `z in P cap H_(2)" and "0` represents the origin then `/_z_(1) 0 z_(2)=`