The angles at O are equal : A'OA'' = B'OB'' = C'OC'' = w. Then the triangles A'B'C' and A''B''C'' are similar. OA', OB', OC' assumed to be orthogonal to the sides of ABC.
(Modify the red angle to turn A''B''C'' about O).
All triangles A'B'C' similar to a fixed triangle t' inscribed in the triangle t(ABC), and having A' opposite to A, B' opposite to B, C' opposite to C result from A'B'C' by a "turn" as above. Notice that the angle(A'OB') = angle(A''OB'') = 2ð-angle(C), and correspondingly the other angles by which O is viewing the side of A''B''C'' are fixed. Thus, the relative position of O w.r. to t' is fixed.
Thus, considering the 6 different ways to pair opposite angles of the two triangles, we get 6 "inscription-centers" (or pivots) of triangle t' to t. Reversing the orientation of the triangle t' we get 6 more pivots.
Challenge: construct a User-Tool that selects two triangles t, t' and constructs the 12 "Inscription_Centers" of t' inscribed in t. For a picture of the 12 pivots look at SixPivots.html .
![[alogo]](alogo.png){kind=small}
Triangle inscribed in triangle ![[0_0]](InscribedTria_In_Tria3_files/InscribedTria_In_Tria3_0_0_0.png)
![[0_1]](InscribedTria_In_Tria3_files/InscribedTria_In_Tria3_0_0_1.png)