How do you solve Log_2 (x-4) + log_2 (x+4) = 3?

1 Answer
Karthik G
Dec 27, 2015

Use sum of the logarithms rule and condense the logarithms on the left. Covert logarithms to exponent form to solve. The steps are given below.

Explanation:

log_2(x-4)+log_2(x+4)=3

Let us use the rule log(A) + log(B) = log(AB)

log_2(x-4)(x+4)=3

log_2(x^2-16)=3 Note : (a-b)(a+b) = a^2 - b^2

Converting the logarithms to exponent form

If log_b(a) =k then a=b^k

log_2(x^2-16) = 3
x^2-16 = 2^3
x^2-16 = 8
x^2-16+16 = 8+16
x^2=24
take square root on both the sides.
x = +-sqrt(24)
x=+-sqrt(4*6)
x=+-sqrt(4)*sqrt(6)
x=+-2sqrt(6)

x=2sqrt(6) or x = -2sqrt(6)

Check the validity of solution by substituting the solution in the original equation.

We can see for log_2(x-4) if we substitute x=-2sqrt(6) the logarithm is not defined.

Therefore the final answer is x=2sqrt(6)

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