The expression we have is:
[tex](x+1)^2+(y-8)^2=9[/tex]
Step 1. Use the binomial square formula:
[tex](a+b)=a^2+2ab+b^2[/tex]
Applying this formula to the first binomial squared:
[tex]x^2+2x+1+(y-8)^2=9[/tex]
Step 2. Apply the formula for the square of a binomial to the second binomial:
[tex]x^2+2x+1+y^2+2(y)(-8)+(-8)^2^{}=9[/tex]
In this case, we have some operations to solve before we move on to isolating x. So we solve the operations:
[tex]x^2+2x+1+y^2-16y+64^{}=9[/tex]
Step 3. Move the terms that are not x squared to the right side of the expression. Remember that when we move one term from one side of the equation to the other, the term must change its sign. We get the following:
[tex]x^2=9-2x-1-y^2+16y-64[/tex]
Step 4. Combine like terms and arrange terms in order from the greatest exponent to the lowest and leave the independent term at the end:
[tex]x^2=-y^2-2x+16y-56[/tex]
And that is the final result, which is option A.
Answer: Option A.
