Which expression is equivalent to log w (x^2 -6)^4/ 3 sqrt x^2+8?

Question

asked Jan 18, 2020 130k views

2 Answers

Anubhava · Answer 1 · 2020-01-23T09:59:25+0000

Answer:

C
$4\log_w(x^2-6)-(1)/(3)\log_w(x^2+8)$

Explanation:

First use the property of logarithms

$\log _ab-\log_ac=\log_a(b)/(c).$

For the given expression you get

$\log_w\frac{(x^2-6)^4}{\sqrt[3]{x^2+8} }=\log_w(x^2-6)^4-\log_w\sqrt[3]{x^2+8}=\log_w(x^2-6)^4-\log_w(x^2+8)^{(1)/(3)}$

Now use property of logarithms

$\log_ab^k=k\log_ab.$

For your simplified expression, you get

$\log_w(x^2-6)^4-\log_w(x^2+8)^{(1)/(3)}=4\log_w(x^2-6)-(1)/(3)\log_w(x^2+8).$