How do you solve log_4(3x-2)-log_4(4x+1)=2?

1 Answer
EZ as pi
Jul 9, 2016

x = -18/61
This answer can be verified by substituting in the original equation

Explanation:

The first thing we need to do is to write 2 as a log_4 term as well.
With logs, the terms must either be all as logs, or all as numbers, not a combination.

2 = log_4 16, " because " 4^2 = 16

log_4(3x-2) - log_4(4x+1) = log_4 16

If we are subtracting the logs, we must have been dividing the numbers. It is possible to condense two log terms into one using the log laws. logA - logB = log(A/B)

log_4((3x-2)/(4x+1))= log_4 16

Now because there is one term on each side, the terms which we are finding logs of, must be equal to each other. Drop the logs.

(3x-2)/(4x+1)= 16 " solve as usual"

16(4x +1) = 3x -2

64x + 16 = 3x-2

61x = -18

x = -18/61

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