Part A: Circle the first mistake. \( \begin{array}{l}\text { Part B: Find the correct solution. } \\ \begin{array}{l} 6-x=5 x+30 \\ -x-x\end{array} \\ 6=4 x+30 \\ -30-30 \\ \frac{-24}{4}=\frac{4 x}{4} \\ -6=x\end{array} \)

Oh dear, it looks like there's a big mix-up in the equation-solving adventure! The first mistake occurs in the simplification process where both sides of the equation were not properly taken into account. You should isolate \(x\) while adhering to proper mathematical principles. Now, let's find the correct solution! Let's start from the equation \(6 - x = 5x + 30\). Rearranging gives us \(6 - 30 = 5x + x\), or simplified, \(-24 = 6x\). Dividing both sides by 6 yields \(x = -4\). There you go—an adventure in solving equations, completed!