Apply the formula: $a\log_{b}\left(x\right)$$=\log_{b}\left(x^a\right)$, where $a=x$, $b=10$ and $x=27$
$\log \left(3^x\right)+\log \left(27^x\right)$
2
The sum of two logarithms of the same base is equal to the logarithm of the product of the arguments
$\log \left(3^x27^x\right)$
Final answer to the problem
$\log \left(3^x27^x\right)$
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Combining or condensing logarithms consists of rewriting a mathematical expression with several logarithms into a single logarithm, by applying the properties of logarithms.