To solve the equation \(13022 + 93x = 18744 + 195x\), we can start by isolating the variable \(x\).
- Subtract \(93x\) from both sides:
\[ 13022 = 18744 + 195x - 93x \]
This simplifies to:
\[ 13022 = 18744 + 102x \]
- Next, subtract \(18744\) from both sides:
\[ 13022 - 18744 = 102x \]
This simplifies to:
\[ -5722 = 102x \]
- Now, divide both sides by \(102\) to isolate \(x\):
\[ x = \frac{-5722}{102} \]
- Simplifying this fraction:
\[ x = -56.09 \]
So, the solution for \(x\) is approximately:
\[ \boxed{-56.09} \]