What is the value of #n# in the equation #log_a 6n -3log_a x = log_a x#? Precalculus 1 Answer ali ergin May 29, 2016 #n=x^4/6# Explanation: #log_a 6n-3log_a x=log_a x# #log_a 6n=log_a x+3log_a x# #log _a 6n=log_a x+log_ax^3# #log_a 6n=log_a x*x^3# #log_a 6n=log_a x^4# #6n=x^4# #n=x^4/6# Answer link Related questions How do I determine the molecular shape of a molecule? What is the lewis structure for co2? What is the lewis structure for hcn? How is vsepr used to classify molecules? What are the units used for the ideal gas law? How does Charle's law relate to breathing? What is the ideal gas law constant? How do you calculate the ideal gas law constant? How do you find density in the ideal gas law? Does ideal gas law apply to liquids? Impact of this question 1320 views around the world You can reuse this answer Creative Commons License