The locus of z satisfying the inequality $l o g_{1 / 3} | z + 1 | > l o g_{1 / 3} | z - 1 |$ is

R (z) < 0

Right on! Give the BNAT exam to get a 100% scholarship for BYJUS courses

R (z) > 0

No worries! We‘ve got your back. Try BYJU‘S free classes today!

I (z) < 0

No worries! We‘ve got your back. Try BYJU‘S free classes today!

None of these

No worries! We‘ve got your back. Try BYJU‘S free classes today!

Open in App

Solution

The correct option is A R (z) < 0
We know that $l o g_{a} m > l o g_{a} n \Rightarrow$ m > n or m < n, according as a > 1 or 0 < a < 1. Hence for z = x + iy
$l o g_{1 / 3} | z + 1 | > l o g_{(1 / 3)} | z - 1 | {∵ 0 < \frac{1}{3} < 1}$
$\Rightarrow | x + i y + 1 | < | x + i y - 1 |$
$\Rightarrow (x + 1)^{2} + y^{2} < (x - 1)^{2} + y^{2}$
$\Rightarrow 4 x < 0 \Rightarrow x < 0 \Rightarrow R e (z) < 0$

Suggest Corrections

Similar questions

l o g_{1 / 3} | z + 1 | > l o g_{1 / 3} | z - 1 |

z = x + i y

{log}_{1 / 2} | z - 1 | > {log}_{1 / 2} | z - i |

l o g_{1 / 3} | z + 1 | > l o g_{1 / 3} | z - 1 |

The locus of z satisfying the inequality $l o g_{\frac{1}{3}}$ |z+1| > $l o g_{\frac{1}{3}}$ |z-1| is

z

{log}_{1 / 2} (\frac{| z - 1 | + 4}{3 | z - 1 | - 2}) > 1 (

| z - 1 | \neq \frac{2}{3})

Join BYJU'S Learning Program