Is there any way to find out diagonals of quadrilateral if I only know the four sides - no angles?

I understand I could calculate it with the law of cosines:

```p = sqrt( a^2 + b^2 - 2*a*b*cos(α) )
q = sqrt( b^2 + c^2 - 2*b*c*cos(β) ) // or whatever you name these angles
```

but I don't know the angles! So I'm kind of stuck here.

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-1 This doesn't seem to be programming related. –  Achilles Oct 15 '09 at 19:13
This should be moved to Math: math.stackexchange.com –  cyroxx Aug 17 '12 at 9:21
You only have sides? no points? you have the distances from points to points? –  hfossli Mar 15 '13 at 14:52

I don't believe that's possible, at least not in the general case. I believe least for parallelograms you can have multiple configurations of angles possible using the same length sides, and the different angles would end up giving you different lengths for the diagonals.

Even for non-parallelograms it's possible to have multiple configurations for the same lengths, and these would give you different diagonal lengths.

You really need to know an angle in order to calculate the diagonal.

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Consider taking four matches. Put them in a square. Then squeeze two corners together. The other corners will move from each other, but the sides remain the same. This process is the same if the sides aren't equal.

As it turns out: you cannot know the diagonal length unless you know the angles. If it is a square or a rectangle (angles 90 degrees) it's easy: Pythagoras. Otherwise, there's no way to tell unless you get at least one angle.

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