It is a simple trigonometry problem.
Set your coordinate system XOY at your circle centre. Start from
y = 0 and find your
x value with
x = r. Then just rotate your radius around origin by angle
a (in radians). You can find the coordinates of your next point on the circle with
Xi = r * cos(a),
Yi = r * sin(a). Repeat the last
2 * Pi / a times.
Taking the comment of @poolie into account, the problem can be solved in the following way (assuming the Earth being the right sphere). Consider a cross section of the Earth with its largest diameter
D through our point (call it
L). The diameter of 1 km length of our circle then becomes a chord (call it
AB) of the Earth cross section circle. So, the length of the arc
(AB) = D * Theta, where
Theta = 2 * sin(|AB| / 2). Further, it is easy to find all other dimensions.