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Complete the square and write in standard form: $x-a=A(y-b)^2$
$9y^2-6y-9-x=0$

I do not know how to complete the square with $4$ terms. I started off like: $9y^2-6y-9=x$
I don't know whether to start trying to complete the square or if I would do this: $9y^2-6y=x+9$
And then complete the square. If someone can either tell me the first one or second one that would be very helpful. Thanks!

EDIT:
$9y^2−6y=x+9 \\ (3y)^2 - 2 \cdot 3 y + 1^2 = x + 9 + 1 \\ (3y - 1)^2 = x + 10 \\ 9\left ( y - {1 \over 3}\right )^2 = x + 10$

2 Answers 2

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$ 9y^2−6y=x+9 \\ (3y)^2 - 2 \cdot 3 y + 1^2 = x + 9 + 1 \\ (3y - 1)^2 = x + 10 \\ 9\left ( y - {1 \over 3}\right )^2 = x + 10$

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$9y^2-6y-9+x=9(y^2-(6/9)y-1)+x=9(y^2-2.y.(1/3)+(1/3)^2-1/9-1)+x=9(y-1/3)^2-10+x$

and you are done.