To find \( x \) from the equation \( 10 \log x = 11,000 \), we first isolate \( \log x \):
\[ \log x = \frac{11,000}{10} \]
\[ \log x = 1,100 \]
Next, we convert from logarithmic form to exponential form. Recall that \( \log x \) means \( 10^{\log x} = x \).
So, we have:
\[ x = 10^{1,100} \]
Therefore, the solution is:
\[ x = 10^{1100} \]