Solving, it's easy enough to find the length of the minor axis:

The first solution in the first quadrant of the equality intersecting the line y = x is at

x = y = 2 arctan(sqrt(1 + 2/sqrt(3)))

the second is at 

x = y = 2 * pi - 2 arctan(sqrt(1 + 2/sqrt(3)))

The latter minus the former is

2 * pi - 4 arctan(sqrt(1 + 2/sqrt(3))) ~= 2.39212378817231

Since this is the difference in the x values, but lies on the line y = x, the distance between these is that value times sqrt(2):

(2 * pi - 4* atan(sqrt(1 + 2/sqrt(3)))) * sqrt(2) ~= 3.3829739041086

For the major axis:

The center of this ellipse (the one in the first quadrant and nearest the origin) is thus, thanks to all those coefficients of 2 just at x = y = pi, and since the major axes have slope -1, lie on the line y = 2*pi - x.

The two endpoints of the major axis have x coordinates:

5 * pi /3 and pi / 3, the difference being 4 * pi/3

Again since it's sloped at a 45° angle we multiply by sqrt(2) getting

(4*pi/3) * sqrt(2) ~= 5.92384391754452  as the major axis

The area is pi * R * r:

approximately 3.3829739041086 * 5.92384391754452 * pi/4

with the division by 4 because we used major and minor diameters rather than radii.

And the approximate area is thus 15.7395436451308.