Determine an ordered pair \( (x ; y) \) which satisfies the equation. \( (2 q+x)^{2}=4 q^{2}+12 q+y \)

To solve the equation \( (2q + x)^2 = 4q^2 + 12q + y \), we first expand the left side: \[ (2q + x)^2 = 4q^2 + 4qx + x^2 \] Now, we set the expanded left side equal to the right side: \[ 4q^2 + 4qx + x^2 = 4q^2 + 12q + y \] Next, we can simplify this equation by canceling \( 4q^2 \) from both sides: \[ 4qx + x^2 = 12q + y \] Now, we can rearrange the equation to isolate \( y \): \[ y = 4qx + x^2 - 12q \] To find an ordered pair \( (x, y) \), we can choose a value for \( x \). Let's pick \( x = 0 \): \[ y = 4q(0) + (0)^2 - 12q = -12q \] Thus, when \( x = 0 \), we find that \( y = -12q \). Therefore, the ordered pair is: \((0, -12q)\). You can try other values for \( x \) if you want more ordered pairs, but \( (0, -12q) \) is one valid solution!