Helpppp!!The general form of a circle is given as x²+y²+4x-12y+4=0 (Hint *complete the square to turn it to standard form)(a) What are the coordinates of the center of the circle?(b) What is the length of the radius of the circle?

Answer:Step-by-step explanation:Rewrite x²+y²+4x-12y+4=0  by grouping x terms first, and then y terms:x² + 4x  + y² - 12y                                  +4=0 We have to complete the square for both x² + 4x  and  y² - 12y.  Leave some space after each:x² + 4x                    + y² - 12y                                  +4=0Identify the coefficient of the x term.  it is 4.  Take half of that, obtaining 2.Square this result, obtaining 4.  Add this result (4) to x² + 4x   and then subtract 4 immediately afterward:    x² + 4x + 4 - 4  + y² - 12y                                  +4=0     Treat the y terms in exactly the same way:  Half of -12 is -6; the square of -6 is 36; we add 36 and then subtract 36:x² + 4x + 4 - 4  + y² - 12y + 36  - 36                                  +4=0Now rewrite both   x² + 4x + 4   and  y² - 12y + 36 as the squares of binomials:                                   (x + 2)^2 - 4 + (y - 6)^2        + 4  = 0Simplifying this, we get:                                   (x + 2)^2 - 4 + (y - 6)^2        + 4  = 0, or                                    (x + 2)^2  + (y - 6)^2         = 0This indicates that the center of this circle is at (-2, 6).But with the right side = to 0, we can only conclude that the radius of the circle is zero (0); the circle here is nothing more than a point.