First, we'll impose conditions of existence of
the logarithms.
x+4>0
x>-4
and
x+1>0
x>-1
The
range of admissible values, for the logarithms to exist is: (-1,
+inf).
The equation is a sum of 2 logarithms with the same
base, 4, and, according to the rule, the sum of 2 logarithms with the same base is
transforming in the logarithm of the product.
log4
(x+4)+log4 1/(x+1) = log4 (x+4)*[1/(x+1)]
We'll move 1 to
the right side:
log4 (x+4)*[1/(x+1)] =
1
log4 (x+4)/(x+1) =1
We'll
take antilogarithm:
(x+4)/(x+1) =
4^1
(x+4)/(x+1) =
4
(x+4)=4*(x+1)
We'll remove
the
brackets:
x+4=4x+4
x-4x+4-4=0
-3x=0
x=0
Since
x = 0 belongs to the set (-1, +inf), then x=0.
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