jee-advanced 2010 Q39

jee-advanced · India · paper1 Complex Numbers Argand & Loci Algebraic Conditions for Geometric Properties (Real, Imaginary, Collinear)
Let $z _ { 1 }$ and $z _ { 2 }$ be two distinct complex numbers and let $z = ( 1 - t ) z _ { 1 } + t z _ { 2 }$ for some real number $t$ with $0 < t < 1$. If $\operatorname { Arg } ( w )$ denotes the principal argument of a nonzero complex number $w$, then
A) $\left| z - z _ { 1 } \right| + \left| z - z _ { 2 } \right| = \left| z _ { 1 } - z _ { 2 } \right|$
B) $\operatorname { Arg } \left( z - z _ { 1 } \right) = \operatorname { Arg } \left( z - z _ { 2 } \right)$
C) $\left| \begin{array} { c c } \mathrm { z } - \mathrm { z } _ { 1 } & \overline { \mathrm { z } } - \overline { \mathrm { z } } _ { 1 } \\ \mathrm { z } _ { 2 } - \mathrm { z } _ { 1 } & \overline { \mathrm { z } } _ { 2 } - \overline { \mathrm { z } } _ { 1 } \end{array} \right| = 0$
D) $\operatorname { Arg } \left( z - z _ { 1 } \right) = \operatorname { Arg } \left( z _ { 2 } - z _ { 1 } \right)$
A and C and D 
Let $z _ { 1 }$ and $z _ { 2 }$ be two distinct complex numbers and let $z = ( 1 - t ) z _ { 1 } + t z _ { 2 }$ for some real number $t$ with $0 < t < 1$. If $\operatorname { Arg } ( w )$ denotes the principal argument of a nonzero complex number $w$, then\\
A) $\left| z - z _ { 1 } \right| + \left| z - z _ { 2 } \right| = \left| z _ { 1 } - z _ { 2 } \right|$\\
B) $\operatorname { Arg } \left( z - z _ { 1 } \right) = \operatorname { Arg } \left( z - z _ { 2 } \right)$\\
C) $\left| \begin{array} { c c } \mathrm { z } - \mathrm { z } _ { 1 } & \overline { \mathrm { z } } - \overline { \mathrm { z } } _ { 1 } \\ \mathrm { z } _ { 2 } - \mathrm { z } _ { 1 } & \overline { \mathrm { z } } _ { 2 } - \overline { \mathrm { z } } _ { 1 } \end{array} \right| = 0$\\
D) $\operatorname { Arg } \left( z - z _ { 1 } \right) = \operatorname { Arg } \left( z _ { 2 } - z _ { 1 } \right)$
Paper Questions
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