1 Answer

Rohit Ambre · Answer 1 · 2023-03-28T12:40:52+0000

Step-by-step explanation:

We have to use two properties of logarithms:

Logarithm of a product:

$\log _a(x\cdot y)=\log _a(x)+\log _a(y)$

Logarithm of a power:

$\log _a(x^b)=b\cdot\log _a(x)$

For this problem:

$\log _c(x^(9)y^(9)z)$

First we solve the logarithm of a product part:

$\log _c(x^9y^9z)=\log _c(x^9)+\log _c(y^9)+\log _c(z)$

And then, the logarithm of a power part:

$\log _c(x^9y^9z)=9\log _c(x^{})+9\log _c(y^{})+\log _c(z)$

Answer:

$\log _c(x^9y^9z)=9\log _c(x^{})+9\log _c(y^{})+\log _c(z)$

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