How do you solve #Log_2 x + log_4 x + log_8 x = 11 #? Precalculus Solving Exponential and Logarithmic Equations Logarithmic Models 1 Answer Shwetank Mauria · EZ as pi Mar 8, 2018 #x=64# Explanation: As #log_ab=logb/loga#, we can write #log_2x+log_4x+log_8x=11# as #logx/log2+logx/log4+logx/log8=11# or #logx/log2+logx/(2log2)+logx/(3log2)=11# or #logx/log2(1+1/2+1/3)=11# or #logx/log2((6+3+2)/6)=11# or #logx/log2 (11/6)=11# or #logx/log2=11xx6/11=6# i.e. #logx=6log2=log2^6# and #x=2^6=64# Answer link Related questions What is a logarithmic model? How do I use a logarithmic model to solve applications? What is the advantage of a logarithmic model? How does the Richter scale measure magnitude? What is the range of the Richter scale? How do you solve #9^(x-4)=81#? How do you solve #logx+log(x+15)=2#? How do you solve the equation #2 log4(x + 7)-log4(16) = 2#? How do you solve #2 log x^4 = 16#? How do you solve #2+log_3(2x+5)-log_3x=4#? See all questions in Logarithmic Models Impact of this question 32004 views around the world You can reuse this answer Creative Commons License