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(347) 5

Part of 1992 Tournament Of Towns

Problems(1)

fixed point fro line MN, <CAM=<CAN

Source: TOT 347 1992 Autumn A J5 - Tournament of Towns

6/10/2024
An angle with vertex OO and a point AA inside it are placed on a plane. Points MM and NN are chosen on different sides of the angle so that the angles CAMCAM and CANCAN are equal. Prove that the straight line MNMN always passes through a fixed point (or is always parallel to a fixed line).
(S Tokarev)
geometryfixedFixed point