Final answer to the problem
$3$
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Step-by-step Solution
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1
Apply the formula: $\log_{a}\left(x\right)+\log_{a}\left(y\right)$$=\log_{a}\left(xy\right)$, where $a=4$, $x=2$ and $y=32$
$\log_{4}\left(2\cdot 32\right)$
Learn how to solve condenser les logarithmes problems step by step online.
$\log_{4}\left(2\cdot 32\right)$
Learn how to solve condenser les logarithmes problems step by step online. Condense the logarithmic expression log4(2)+log4(32). Apply the formula: \log_{a}\left(x\right)+\log_{a}\left(y\right)=\log_{a}\left(xy\right), where a=4, x=2 and y=32. Apply the formula: ab=ab, where ab=2\cdot 32, a=2 and b=32. Apply the formula: \log_{b}\left(x\right)=\log_{b}\left(pfgg\left(x,b\right)\right), where b=4 and x=64. Apply the formula: \log_{b}\left(b^a\right)=a, where a=3 and b=4.
Final answer to the problem
$3$
