SOLUTION: What is the proof for this logarithmic identity using A) exponential functions and b) logarithmic properties (loga x)(logb a) = logb x

SOLUTION: What is the proof for this logarithmic identity using A) exponential functions and b) logarithmic properties (loga x)(logb a) = logb x

Algebra.Com

Question 2808: What is the proof for this logarithmic identity using A) exponential functions and b) logarithmic properties
(loga x)(logb a) = logb x
Answer by kiru_khandelwal(79) (Show Source): You can put this solution on YOUR website!
(loga x)(logb a) = logb x
we know that loga b = log b/log a
so,
=> (log x/log a)* (log a/log b) = log x/log b = logb x
Hence Proved
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