Question
If logx≈0.698, what is log(x⋅x⋅x)
?
?
Answers
GPT-4o mini
To find \(\log(x \cdot x \cdot x)\), we can start by rewriting it in terms of logarithms.
First, we recognize that:
\[
x \cdot x \cdot x = x^3
\]
Now, we can apply the logarithmic identity \(\log(a^b) = b \log(a)\). Therefore, we have:
\[
\log(x^3) = 3 \log(x)
\]
Given that \(\log(x) \approx 0.698\), we can substitute this value into our equation:
\[
\log(x^3) = 3 \cdot 0.698
\]
Now, we perform the multiplication:
\[
3 \cdot 0.698 = 2.094
\]
Thus, we find:
\[
\log(x \cdot x \cdot x) \approx 2.094
\]
So, the answer is \(\boxed{2.094}\).
First, we recognize that:
\[
x \cdot x \cdot x = x^3
\]
Now, we can apply the logarithmic identity \(\log(a^b) = b \log(a)\). Therefore, we have:
\[
\log(x^3) = 3 \log(x)
\]
Given that \(\log(x) \approx 0.698\), we can substitute this value into our equation:
\[
\log(x^3) = 3 \cdot 0.698
\]
Now, we perform the multiplication:
\[
3 \cdot 0.698 = 2.094
\]
Thus, we find:
\[
\log(x \cdot x \cdot x) \approx 2.094
\]
So, the answer is \(\boxed{2.094}\).