Answered

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What is the true solution to the equation below?
2log3(6x) - log3(4x) = 2log3(x+2)
X=-2 and X= 1
X=-2 and x-2

X= 1 and x=4
X-2 and X=4

Sagot :

vlx

Answer: The answer is C

Step-by-step explanation:

We are given to find the true solution of the following equation involving logarithms:

We will be using the following properties of logarithms in the solution.

The solution is as follows:

Since we can find the logarithm of a positive integer only, and both the solutions x = 1 and 4 satisfy this condition after substituting in the given equation, so both the solutions are TRUE.

Thus, the correct option is (C).

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