Let z be a non-zero complex number. Then Log(z²) = 2Logz for all complex numbers O if OSArg(z)ST/2 O if OsArg(z)sn O if -TSArg(z)<0 O None of these

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4:26 A docs.google.com * Let z be a non-zero complex number. Then Log(z²) = 2Logz for all complex numbers if OSArg(z)<t/2 if OSArg(z)<n O if -nSArg(z)S0 O None of these 4z2+4 Let C: z+1=4 and I = dz. Then z²–1 O l=0 by Cauchy-Goursat Theorem |=0 (without applying Cauchy-Goursat Theorem) O I=2ri O None of these |=4rti I=-2ni