In order to complete the square, we need to write the given equation (2x² - 12x + 6 = 0) in the form:
(x - d)² = f
So, to find the constants d and f, let's expand the above general form:
(x - d)² = f
x² - 2dx + d² = f
x² - 2dx + d² - f = 0
Now, we need to identify d and f by comparing the last equation with the given one. First, though, to make it easier to compare them, let's divide both sides of the given equation by 2:
x² - 6x + 3 = 0
x² - 2dx + d² - f = 0
Then, we have:
2d = 6
d = 3
d² - f = 3
3² - f = 3
9 - 3 = f
f = 6
Thus, using the method of completing the square, we obtain the equation:
(x - d)² = f
(x - 3)² = 6
Therefore, option 1) is correct.