The proof is a little different for acute, obtuse, and right triangles.
I will do it for acute and obtuse triangles and leave right triangles for the reader.
To make the proofs easier, add line segments OA, OB, OC, OAOB, OBOC, and OCOA.
Let a, b, and c be the sides of triangle ABC opposite vertices A, B, and C respectively.
Let s = (a + b + c)/2 be the semiperimeter.
Acute Triangle:
The area of triangle ABC is
rs = a/2 |OOA| + b/2 |OOB| + c/2 |OOC| (1)
Applying Ptolemy's theorem to cyclic quadrilateral AOCOOB gives
|OBOC||OA| = |AOC||OOB| + |AOB||OOC|
or
a/2 R = c/2 |OOB| + b/2 |OOC| (2)
Similarly for cyclic quadrilaterals BOAOOC and COBOOA
b/2 R = a/2 |OOC| + c/2 |OOA| (3)
c/2 R = b/2 |OOA| + a/2 |OOB| (4)
Adding equations (1)-(4) and dividing by s gives
r + R = |OOA| + |OOB| + |OOC| (5)
Obtuse Triangle:
WOLOG let angle C be obtuse.
The area of triangle ABC is
rs = a/2 |OOA| + b/2 |OOB| - c/2 |OOC| (6)
Applying Ptolemy's theorem to cyclic quadrilateral AOOCOB gives
|AOC||OOB| = |OBOC||OA| + |AOB||OOC|
or
a/2 R = c/2 |OOB| - b/2 |OOC| (7)
Applying Ptolemy's theorem to cyclic quadrilateral BOAOCO gives
|BOC||OOA| = |OCOA||OB| + |BOA||OOC|
or
b/2 R = c/2 |OOA| - a/2 |OOC| (8)
Applying Ptolemy's theorem to cyclic quadrilateral COBOOA gives
|OAOB||OC| = |COB||OOA| + |COA||OOB|
or
c/2 R = b/2 |OOA| + a/2 |OOB| (9)
Adding equations (6)-(9) and dividing by s gives
r + R = |OOA| + |OOB| - |OOC| (10)
Combining equations (5) and (10) gives
r + R = SA + SB + SC
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