How do you write the equation of the circle in standard form, identify the center and radius of #9x^2+9y^2+54x-36y+17=0#?

1 Answer
Feb 26, 2017

Equation of the circle in standard form is #(x-(-3))^2+(y-2)^2=(10/3)^2# and its center is #(-3,2)# and radius is #10/3#

Explanation:

Standard form of equation of a circle is

#(x-h)^2+(y-k)^2=r^2#,

which has a radius #r# and its center is #(h,k)#

Now #9x^2+9y^2+54x-36y+17=0# can be written as (dividing each term by #9#

#x^2+y^2+6x-4y=-17/9#

or #x^2+6x+9+y^2-4y+4=-17/9+9+4#

or #(x+3)^2+(y-2)^2=100/9#

or #(x-(-3))^2+(y-2)^2=(10/3)^2#

and as is observed. its center is #(-3,2)# and radius is #10/3#
graph{9x^2+9y^2+54x-36y+17=0 [-13.125, 6.875, -3.32, 6.68]}