solve log [0.07392]4
You asked:
Evaluate the expression: \(\log\left( 0.07392 \right) \cdot 4\)
MathBot Answer:
\[\log\left( 0.07392 \right) \cdot 4 = 4 \log{\left(\frac{231}{3125} \right)} \approx -10.41908740659483332976502043120041\]
\[\begin{aligned}\log\left( 0.07392 \right) \cdot 4& = \log{\left(\frac{7392}{100000} \right)} \cdot 4\\& = \log{\left(\frac{231}{3125} \right)} \cdot 4\\& = 4 \cdot \log{\left(\frac{231}{3125} \right)}\end{aligned}\]