The centroid is easily calculated as ([0+2+-2]/3, [-1+0+2]/3) = (0, 1/3).  An ellipse centered at that point has a general form of Az^2 + Bx(y-1/3) + C(y-1/3)^2 = 1.

Plugging in each point creates a system of equations:

0*A + 0*B + (16/9)*C = 1

4*A - (2/3)*B + (1/9)*C = 1

4*A - (10/3)*B + (25/9)*C = 1

Solving this system yields A=21/64, B=9/16, C=9/16.  Substituting and simplifying to standard form 21x^2 + 36xy + 36y^2 - 12x - 24y - 60 = 0.