\[
\begin{array}{l}
y=6 x \\
y=\underbrace{x^{2}}_{11}+6
\end{array}
\]
\[
\begin{array}{l}
y=x+6 \\
y=2 x+6
\end{array}
\]
The functions that goes through $(0,6)$ is $y=x+6$ and $y=2 x+6$ because their both linear.
6 The graph of an equation is shown at the right. Explain why the equation is a linear function. Then explain how to write an equation for the function.
86 Lesson 8 Understand Linear Functions
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Answer
\(\boxed{y = x + 6}\) and \(\boxed{y = 2x + 6}\) are the linear functions that pass through the point (0, 6)
Step 1 :Check which equations pass through the point (0, 6): y = x^2 + 6, y = x + 6, and y = 2x + 6
Step 2 :Determine which of these equations are linear functions: y = x + 6 and y = 2x + 6
Step 3 :\(\boxed{y = x + 6}\) and \(\boxed{y = 2x + 6}\) are the linear functions that pass through the point (0, 6)
