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\( \log_{4}(16^{x}) = 2x \)
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To simplify \( \log_{4} 16^{x} \), we can break it down step by step. First, we realize that \( 16 \) can be rewritten as \( 4^{2} \). Hence, \( 16^{x} = (4^{2})^{x} = 4^{2x} \). Now, we substitute this back into the logarithm: \[ \log_{4} (4^{2x}) \] Using the property of logarithms that states \( \log_{b}(b^{a}) = a \), we can simplify this further: \[ \log_{4} (4^{2x}) = 2x \] So the result of \( \log_{4} 16^{x} \) is \( 2x \).
