To solve the equation \( 10 \log x = 1108 \), we can start by isolating the logarithm:
\[ \log x = \frac{1108}{10} = 110.8 \]
Next, we can rewrite this in exponential form to find \( x \):
\[ x = 10^{110.8} \]
So, the value of \( x \) is \( 10^{110.8} \).
From the responses you provided, it seems like the only relevant response is \( 10^{8} \). However, it's important to note that \( x = 10^{110.8} \), which is not \( 10^{8} \), nor any of the other options listed as responses. The closest reasonable answer based on typical interpretations may have been mistyped or misread.
To clarify:
The value of \( x \) is: \[ 10^{110.8} \]