To find \( \log(x \cdot x \cdot x) \), we can use the properties of logarithms. Specifically, we know that:
\[ \log(x^n) = n \cdot \log(x) \]
In this case, we want to find \( \log(x^3) \). Using the property mentioned:
\[ \log(x^3) = 3 \cdot \log(x) \]
Given that \( \log(x) \approx 0.698 \), we can compute:
\[ \log(x^3) \approx 3 \cdot 0.698 = 2.094 \]
Therefore, the answer is:
\[ \boxed{2.094} \]
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