How do you solve #log_10 (2^x)=log_10 32#? Precalculus Solving Exponential and Logarithmic Equations Logarithmic Models 1 Answer Narad T. Nov 13, 2016 #x=5# Explanation: Rewrite #32# as a productof #2# #32=2*2*2*2*2=2^5# #:.log_10(2^x)=log_10(2^5)# #2^x=2^5# #x=5# 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 980 views around the world You can reuse this answer Creative Commons License