1 Answer

Yongbok · Answer 1 · 2023-03-17T13:53:52+0000

Given:

Given the equation

$\log_3(4-a)=\log_3(-2a+2)$

Required: Value of a

Step-by-step explanation:

The given equation can be written as

$\log_3(4-a)-\log_3(-2a+2)=0$

Use the property

$\log_bp-\log_bq=\log_b(p)/(q)$

Thus,

$\log_3((4-a)/(-2a+2))=0$

Take antilogarithm on both sides.

$\begin{gathered} (4-a)/(-2a+2)=3^0 \\ 4-a=-2a+2 \\ -a+2a=2-4 \\ a=-2 \end{gathered}$

Final Answer: The value of a is -2.

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