Complete the ordered pair so that it is a solution for the given linear equation.
\[
\begin{array}{l}
-6 x=2 y+8 \\
(-6, \square) \\
(\square,-25) \\
(11, \square)
\end{array}
\]

Step 1 ：Define the given equation as \(-6x = 2y + 8\).

Step 2 ：Substitute \(x = -6\) into the equation and solve for \(y\). The solution is \(y = 14\). So, the completed ordered pair is \((-6, \boxed{14})\).

Step 3 ：Substitute \(y = -25\) into the equation and solve for \(x\). The solution is \(x = 7\). So, the completed ordered pair is \((\boxed{7}, -25)\).

Step 4 ：Substitute \(x = 11\) into the equation and solve for \(y\). The solution is \(y = -37\). So, the completed ordered pair is \((11, \boxed{-37})\).

Step 5 ：Final Answer: The completed ordered pairs that are solutions to the given linear equation are \((-6, \boxed{14}), (\boxed{7}, -25), (11, \boxed{-37})\)