To solve \( \log(9.23) \times \frac{0.00921}{0.05138} \), we first need to calculate each part step by step.
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Calculate the logarithm: \[ \log(9.23) \approx 0.966 \] (This value can vary slightly depending on whether you're using common logarithm (base 10) or natural logarithm (base e). Here, we're using the common logarithm.)
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Calculate the fraction: \[ \frac{0.00921}{0.05138} \approx 0.1794 \]
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Multiply the result of the logarithm by the fraction: \[ 0.966 \times 0.1794 \approx 0.173 \]
Thus, \( \log(9.23) \times \frac{0.00921}{0.05138} \approx 0.173 \).