How do you solve #log_(1/3) (x^2 + 4x) - log_(1/3) (x^3 - x) = -1#? Precalculus Properties of Logarithmic Functions Common Logs 1 Answer Cesareo R. Jun 11, 2016 #x = 1/6 (1 + sqrt[85])# Explanation: #log_(1/3) (x^2 + 4x) - log_(1/3) (x^3 - x) = -1# or #log_(1/3) (x^2 + 4x) - log_(1/3) (x^3 - x) = log_(1/3)(1/3)^(-1)# then # (x^2 + 4x)/ (x^3 - x) =3# or # (x + 4)/ (x^2 - 1) =3# or #3x^2-3=x+4# or finally #3x^2-x-7=0# solving for #x# we get #{x = 1/6 (1 - sqrt[85])}, {x = 1/6 (1 + sqrt[85])}# but we choose #x = 1/6 (1 + sqrt[85])# because #x = 1/6 (1 - sqrt[85]) <0# and makes #(x^3 - x) < 0# Answer link Related questions What is the common logarithm of 10? How do I find the common logarithm of a number? What is a common logarithm or common log? What are common mistakes students make with common log? How do I find the common logarithm of 589,000? How do I find the number whose common logarithm is 2.6025? What is the common logarithm of 54.29? What is the value of the common logarithm log 10,000? What is #log_10 10#? How do I work in #log_10# in Excel? See all questions in Common Logs Impact of this question 1687 views around the world You can reuse this answer Creative Commons License