Question:
If $\frac{z-1}{z+1}$ is purely imaginary, then
If $\frac{z-1}{z+1}$ is purely imaginary, then
Updated On: Jun 18, 2022
- $\left|z\right|=\frac{1}{2}$
- $\left|z\right|=1$
- $\left|z\right|=2$
- $\left|z\right|=3$
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The Correct Option is B
Solution and Explanation
Let $\omega=\frac{z-1}{z+1}$
Then, using componendo and dividendo, we get
$z=\frac{1+\omega}{1-\omega}$
$\Rightarrow |z|=\left|\frac{\omega+1}{\omega-1}\right|$
Put $|z|=1$
$\Rightarrow |\omega+1|=|\omega-1|$ ...(i)
Let $\omega=u +i v$
Then, $|\omega+1|=|u +i v+1|$
$=|(u+1)+i v|=\sqrt{(u+1)^{2}+v^{2}}$
and $|\omega-1|=\sqrt{(u-1)^{2}+v^{2}}$
$\therefore$ From E (i)
$\sqrt{(u+1)^{2}+v^{2}} =\sqrt{(u-1)^{2}+v^{2}}$
$\Rightarrow (u+1)^{2}+v^{2} =(v-1)^{2}+v^{2}$
$\Rightarrow u=0$
$\therefore \omega=\frac{z-1}{z+1}$ is a pure imaginary number.
Then, using componendo and dividendo, we get
$z=\frac{1+\omega}{1-\omega}$
$\Rightarrow |z|=\left|\frac{\omega+1}{\omega-1}\right|$
Put $|z|=1$
$\Rightarrow |\omega+1|=|\omega-1|$ ...(i)
Let $\omega=u +i v$
Then, $|\omega+1|=|u +i v+1|$
$=|(u+1)+i v|=\sqrt{(u+1)^{2}+v^{2}}$
and $|\omega-1|=\sqrt{(u-1)^{2}+v^{2}}$
$\therefore$ From E (i)
$\sqrt{(u+1)^{2}+v^{2}} =\sqrt{(u-1)^{2}+v^{2}}$
$\Rightarrow (u+1)^{2}+v^{2} =(v-1)^{2}+v^{2}$
$\Rightarrow u=0$
$\therefore \omega=\frac{z-1}{z+1}$ is a pure imaginary number.
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Concepts Used:
Complex Numbers and Quadratic Equations
Complex Number: Any number that is formed as a+ib is called a complex number. For example: 9+3i,7+8i are complex numbers. Here i = -1. With this we can say that i² = 1. So, for every equation which does not have a real solution we can use i = -1.
Quadratic equation: A polynomial that has two roots or is of the degree 2 is called a quadratic equation. The general form of a quadratic equation is y=ax²+bx+c. Here a≠0, b and c are the real numbers.
