SOLUTION: condense 1/5(log(2)x-log(2)y)+4log(2)(x-3). each log has a base of (2) I've already tried moving 1/5 &4 so that they are exponents and changing the subtraction to a division prob

Algebra ->  Logarithm Solvers, Trainers and Word Problems -> SOLUTION: condense 1/5(log(2)x-log(2)y)+4log(2)(x-3). each log has a base of (2) I've already tried moving 1/5 &4 so that they are exponents and changing the subtraction to a division prob      Log On


   

Question 736915: condense 1/5(log(2)x-log(2)y)+4log(2)(x-3).
each log has a base of (2)
I've already tried moving 1/5 &4 so that they are exponents and changing the subtraction to a division problem
Answer by lwsshak3(11628) About Me  (Show Source):
You can put this solution on YOUR website!
condense 1/5(log(2)x-log(2)y)+4log(2)(x-3).
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