Gerhard Heindl, How to compute a triangle with prescribed lengths of its internal bisector lengths,
Forum Geometricorum, 16 (2016) 407--414.

Abstract. In 1994 P. Mironescu and L. Panaitopol published a non-constructive proof that any three given positive real numbers are the lengths of the internal angle bisectors of a triangle which is unique up to isometries. In the present paper it will be shown that this result can be obtained also by a constructive proof which in addition leads to an efficient method for computing the lengths of the sides of the triangle in question.

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