The intermediate question is fairly easy... you don't. You work out the centre of an ellipse from the bounding box (namely, the centre of the box is the centre of the ellipse, as long as the ellipse is centred in the box).

For your first question, I'd look at the polar form of the ellipse equation, which is available on Wikipedia. You would need to work out the eccentricity of the ellipse as well.

Or you could brute force the values from the bounding box... work out if a point lies on the ellipse and matches the angle, and iterate through every point in the bounding box.

An ellipse cannot be defined by only two points. Even a circle (a special cased ellipse) is defined by three points.

Even with three points, you would have infinite ellipses passing through these three points (think: rotation).

Note that a bounding box suggests a center for the ellipse, and most probably assumes that its major and minor axes are parallel to the x,y (or y,x) axes.

The elliptical curve arc link you posted includes a link to elliptical arc implementation notes.

In there, you will find the equations for conversion from endpoint to centre parameterisation.

Here is my JavaScript implementation of those equations, taken from an interactive demo of elliptical arc paths, using Sylvester.js to perform the matrix and vector calculations.

// Calculate the centre of the ellipse
// Based on http://www.w3.org/TR/SVG/implnote.html#ArcConversionEndpointToCenter
var x1 = 150;  // Starting x-point of the arc
var y1 = 150;  // Starting y-point of the arc
var x2 = 400;  // End x-point of the arc
var y2 = 300;  // End y-point of the arc
var fA = 1;    // Large arc flag
var fS = 1;    // Sweep flag
var rx = 100;  // Horizontal radius of ellipse
var ry =  50;  // Vertical radius of ellipse
var phi = 0;   // Angle between co-ord system and ellipse x-axes

var Cx, Cy;

// Step 1: Compute (x1′, y1′)
var M = $M([
               [ Math.cos(phi), Math.sin(phi)],
               [-Math.sin(phi), Math.cos(phi)]
            ]);
var V = $V( [ (x1-x2)/2, (y1-y2)/2 ] );
var P = M.multiply(V);

var x1p = P.e(1);  // x1 prime
var y1p = P.e(2);  // y1 prime


// Ensure radii are large enough
// Based on http://www.w3.org/TR/SVG/implnote.html#ArcOutOfRangeParameters
// Step (a): Ensure radii are non-zero
// Step (b): Ensure radii are positive
rx = Math.abs(rx);
ry = Math.abs(ry);
// Step (c): Ensure radii are large enough
var lambda = ( (x1p * x1p) / (rx * rx) ) + ( (y1p * y1p) / (ry * ry) );
if(lambda > 1)
{
    rx = Math.sqrt(lambda) * rx;
    ry = Math.sqrt(lambda) * ry;
}


// Step 2: Compute (cx′, cy′)
var sign = (fA == fS)? -1 : 1;
// Bit of a hack, as presumably rounding errors were making his negative inside the square root!
if((( (rx*rx*ry*ry) - (rx*rx*y1p*y1p) - (ry*ry*x1p*x1p) ) / ( (rx*rx*y1p*y1p) + (ry*ry*x1p*x1p) )) < 1e-7)
    var co = 0;
else
    var co = sign * Math.sqrt( ( (rx*rx*ry*ry) - (rx*rx*y1p*y1p) - (ry*ry*x1p*x1p) ) / ( (rx*rx*y1p*y1p) + (ry*ry*x1p*x1p) ) );
var V = $V( [rx*y1p/ry, -ry*x1p/rx] );
var Cp = V.multiply(co);

// Step 3: Compute (cx, cy) from (cx′, cy′)
var M = $M([
               [ Math.cos(phi), -Math.sin(phi)],
               [ Math.sin(phi),  Math.cos(phi)]
            ]);
var V = $V( [ (x1+x2)/2, (y1+y2)/2 ] );
var C = M.multiply(Cp).add(V);

Cx = C.e(1);
Cy = C.e(2);

So the solution is here:

The parametrized formula of an ellipse:

x = x0 + a * cos(t)
y = y0 + b * sin(t)

Let's put known coordinates of two points to it:

x1 = x0 + a * cos(t1)
x2 = x0 + a * cos(t2)
y1 = y0 + b * sin(t1)
y2 = y0 + b * sin(t2)

Now we have a system of equations with 4 variables: center of ellipse (x0/y0) and two angles t1, t2

Let's subtract equations in order to get rid of center coordinates:

x1 - x2 = a * (cos(t1) - cos(t2))
y1 - y2 = b * (sin(t1) - sin(t2))

This can be rewritten (with product-to-sum identities formulas) as:

(x1 - x2) / (2 * a) = sin((t1 + t2) / 2) * sin((t1 - t2) / 2)
(y2 - y1) / (2 * b) = cos((t1 + t2) / 2) * sin((t1 - t2) / 2)

Let's replace some of the equations:

r1: (x1 - x2) / (2 * a)
r2: (y2 - y1) / (2 * b)
a1: (t1 + t2) / 2
a2: (t1 - t2) / 2

Then we get simple equations system:

r1 = sin(a1) * sin(a2)
r2 = cos(a1) * sin(a2)

Dividing first equation by second produces:

a1 = arctan(r1/r2)

Adding this result to the first equation gives:

a2 = arcsin(r2 / cos(arctan(r1/r2)))

Or, simple (using compositions of trig and inverse trig functions):

a2 = arcsin(r2 / (1 / sqrt(1 + (r1/r2)^2)))

or even more simple:

a2 = arcsin(sqrt(r1^2 + r2^2))

Now the initial four-equations system can be resolved with easy and all angles as well as eclipse center coordinates can be found.

TypeScript implementation based on the answer from Rikki.

Default DOMMatrix and DOMPoint are used for the calculations (Tested in the latest Chrome v.80) instead of the external library.

 ellipseCenter(
    x1: number,
    y1: number,
    rx: number,
    ry: number,
    rotateDeg: number,
    fa: number,
    fs: number,
    x2: number,
    y2: number
  ): DOMPoint {
    const phi = ((rotateDeg % 360) * Math.PI) / 180;
    const m = new DOMMatrix([
      Math.cos(phi),
      -Math.sin(phi),
      Math.sin(phi),
      Math.cos(phi),
      0,
      0,
    ]);
    let v = new DOMPoint((x1 - x2) / 2, (y1 - y2) / 2).matrixTransform(m);
    const x1p = v.x;
    const y1p = v.y;
    rx = Math.abs(rx);
    ry = Math.abs(ry);
    const lambda = (x1p * x1p) / (rx * rx) + (y1p * y1p) / (ry * ry);
    if (lambda > 1) {
      rx = Math.sqrt(lambda) * rx;
      ry = Math.sqrt(lambda) * ry;
    }
    const sign = fa === fs ? -1 : 1;
    const div =
      (rx * rx * ry * ry - rx * rx * y1p * y1p - ry * ry * x1p * x1p) /
      (rx * rx * y1p * y1p + ry * ry * x1p * x1p);

    const co = sign * Math.sqrt(Math.abs(div));

    // inverse matrix b and c
    m.b *= -1;
    m.c *= -1;
    v = new DOMPoint(
      ((rx * y1p) / ry) * co,
      ((-ry * x1p) / rx) * co
    ).matrixTransform(m);
    v.x += (x1 + x2) / 2;
    v.y += (y1 + y2) / 2;
    return v;
  }