Modulus and Argument of Complex Numbers

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Modulus and Argument of Complex Numbers: Overview

This topic covers concepts, such as, Modulus of a Complex Number, Modulus of Conjugate of a Complex Number, Properties of Argument of a Complex Number & Argument of Conjugate of a Complex Number etc.

Important Questions on Modulus and Argument of Complex Numbers

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Mathematics>Complex Numbers>Modulus and Argument of Complex Numbers> Q 1

If $\arg (z) < 0,$ then $\arg (- z) - \arg (z) =$

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Mathematics>Complex Numbers>Modulus and Argument of Complex Numbers> Q 2

Let $z$ and $w$ be two non-zero complex numbers such that $|z| = |w|$ and $\arg z + \arg w = π$ then $z$ equals –

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Mathematics>Complex Numbers>Modulus and Argument of Complex Numbers> Q 3

The number of integer solutions of the equation ${|1 - i|}^{x} = 2^{x}$ is

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Mathematics>Complex Numbers>Modulus and Argument of Complex Numbers> Q 4

Define $f : C \to R$ by $f (z) = | z | \forall z \in C .$ Then which of the following is false?

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Mathematics>Complex Numbers>Modulus and Argument of Complex Numbers> Q 5

If $z \in C,$ then the minimum value of $| z | + | 2 z - 3 | + | z - 1 |$ is

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Mathematics>Complex Numbers>Modulus and Argument of Complex Numbers> Q 6

For two complex numbers $z_{1}, z_{2}$ the relation $| z_{1} + z_{2} | = | z_{1} | + | z_{2} |$ hold, if

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Mathematics>Complex Numbers>Modulus and Argument of Complex Numbers> Q 7

In the Argand plane if O, P, Q represent respectively the origin, the complex number z and z + iz, then angle OPQ is

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Mathematics>Complex Numbers>Modulus and Argument of Complex Numbers> Q 8

If $\frac{3 + i s i n θ}{4 - i c o s θ}, θ \in [0,2 π],$ is a real number, then an argument of $s i n θ + i c o s θ$ is

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Mathematics>Complex Numbers>Modulus and Argument of Complex Numbers> Q 9

Statement I Both $z_{1}$ and $z_{2}$ are purely real , if $a r g (z_{1} z_{2}) = 2 π$ ( $z_{1}$ and $z_{2}$ have principle arguments).
Statement II Principle arguments of complex number lies between $(- π, π) .$

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Mathematics>Complex Numbers>Modulus and Argument of Complex Numbers> Q 10

Which of the following is correct for any two complex numbers $z_{1}$ and $z_{2}$ ?

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Mathematics>Complex Numbers>Modulus and Argument of Complex Numbers> Q 11

If $|z| = 1, z^{'} = \frac{1 + z^{2}}{z}$ , then :

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Mathematics>Complex Numbers>Modulus and Argument of Complex Numbers> Q 12

Let $z$ be a complex number such that $|\frac{z - i}{z + 2 i}| = 1$ and $|z| = \frac{5}{2}$ . Then the value of $|z + 3 i|$ is

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Mathematics>Complex Numbers>Modulus and Argument of Complex Numbers> Q 13

If $z_{1}, z_{2}, z_{3}$ represent the vertices of an equilateral triangle such that $| z_{1} | = | z_{2} | = | z_{3} |$ , then

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Mathematics>Complex Numbers>Modulus and Argument of Complex Numbers> Q 14

If $|z| = 1, z^{'} = \frac{1 + z^{2}}{z}$ , then :

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Mathematics>Complex Numbers>Modulus and Argument of Complex Numbers> Q 15

If $P$ represents $z = x + i y$ in the argand plane ${|z - 1|}^{2} + {|z + 1|}^{2} = 4$ , then locus of $P$ is (where $i = \sqrt{- 1}$ )

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Mathematics>Complex Numbers>Modulus and Argument of Complex Numbers> Q 16

If $z_{1}, z_{2}$ and $z_{3}, z_{4}$ are two pairs of complex conjugate numbers, then $\arg (\frac{z_{1}}{z_{4}}) + \arg (\frac{z_{2}}{z_{3}})$ can be equal to