There is a mathematical dependency between two. If there is other information available:
-assuming rectangle has right angles for all corners-.

```
center.X = (aCorner.X + oppositeCorner.X)/2;
center.Y = (aCorner.Y + oppositeCorner.Y)/2;
```

Where aCorner is a arbitrary corner and oppositeCorner is opposite corner to aCorner.

This was trivial, a little more hard work included to calculate borders (and a bit more of information; center position, width and the height of the picture and rotation angle).
Assuming image's width is "w", height is "h", angle is "a", and center "cX" and "cY".
First corner;

```
length = sqrt(w^2+h^2)/2;
x = (length)*(cos(a)*(-w/length) - (h/length)*sin(a)) + cX;
y = (length)*(sin(a)*(-w/length) + (h/length)*cos(a)) + cY;
```

Second corner;

```
x = (length)*(cos(a)*(w/length) + sin(a)*(h/length)) + cX;
y = (length)*(cos(a)*(h/length) - sin(a)*(w/length)) + cY;
```

Third;

```
x = -(length)*(cos(a)*(-w/length) + (h/length)*sin(a)) + cX;
y = -(length)*(sin(a)*(-w/length) - (h/length)*cos(a)) + cY;
```

Fourth;

```
x = -(length)*(cos(a)*(w/length) - sin(a)*(h/length)) + cX;
y = (length)*(cos(a)*(h/length) - sin(a)*(w/length)) + cY;
```

Length is a half of diagonal of the rectangle. The inner part with cos and sin is result of trigonometric transformation:

```
sin(a+b) = sin(a)*cos(b) + cos(a)*sin(b)
[....]
```

And cX and cY is used to translate corners from a arbitrary coordinate system to a specific coordinate system.

I know, I know this was kind of overkill. Matrix class may have this functions on its own. I believe if it has, the method used in it can be broken into method I described here.

NOTE: Angle a -actually even sin(a) and cos(a), which is better- can be accessed via

Matrix.getValues(float[] values)

Most 2D matrices use this scheme:

```
| sin(a) 0 0 |
| 0 -cos(a) 0 |
| 0 0 scale|
```

I am not sure about particular implementation of Android API.

BTW, there may have been some signature errors up there so be careful.