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neway, the solution is as follows. if i m wrong, then correct me.
given Z= (2 + t) + i[ ] (3 - t 2 )
so, Z + 1 = (3+t) + i[ ] (3 - t 2 ) therefore, mod (Z + 1) = [ ][ (3 + t) 2 + {(3 - t 2 )} 2 ]
= [ ] ( 12 + 6t )
n, Z - 1 = (1 + t) + i[ ](3 - t 2 ) therefore mod (Z - 1) = [ ] [(1 + t) 2 + {(3 - t 2 )} 2 ]
= [ ] ( 4 + 2t )
now, mod [(Z + 1)/(Z - 1)] = mod(Z + 1)/ mod (Z - 1)
= ( 12 + 6t ) / ( 4 + 2t )
= [ ] (6/2)
= [ ] 3
so, modulus of (z+1/z-1) whole sq = 3
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Moderation Team
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