Consider the acute triangle ABC, having the orthocenter H and A ', B', C', the points where AH, BH, CH intersect the circle C (0, R), circumscribed to the triangle ABC. We note: OA'N BC = {A¡}, OBʼN AC = {B1}, OC'n AB = {C¡}. %3D Show that: a) HBC = \AʼBC. b) A¡H = A1 A'. c) m(«BOA1) = 180° – 2 m(

Consider the acute triangle ABC, having the orthocenter H and A ', B', C', the points where AH, BH, CH intersect the circle C (O, R), circumscribed to the triangle ABC. We note:
$$
\mathrm{OA}^{\prime} \cap \mathrm{BC}=\left\{\mathrm{A}_{1}\right\}, \mathrm{OB'} \cap \mathrm{AC}=\left\{\mathrm{B}_{1}\right\}, \mathrm{OC'} \cap \mathrm{AB}=\left\{\mathrm{C}_{1}\right\} \text {. }
$$
Show that:
a) $\Varangle \mathrm{HBC} \equiv \Varangle \mathrm{A'}\mathrm{BC}$.

b) $\mathrm{A}_{1} \mathrm{H}=\mathrm{A}_{1} \mathrm{~A}^{\prime}$.

c) $m\left(\varangle \mathrm{BOA}_{1})=180^{\circ}-2 \mathrm{~m}(\varangle \mathrm{B})\right.$

d) $\frac{BA_{1}}{CA_{1}}=\frac{\sin 2 B}{\sin 2 C}$

e) lines $\mathrm{AA}_{1}, \mathrm{BB}_{1}, \mathrm{CC}_{1}$ are concurrent.

f) The set:
$$
\{M \in \triangle \mathrm{ABC} \mid \mathrm{MO}+\mathrm{MH}=\mathrm{R}\}
$$
has exactly three elements.

This problem with many subpoints all are for one problem.

Please check the attached pictures for clarity, and please do not answer the question if you are not sure that your answer is corect because you will make me lose a problem that I have already paid for, thank you for your understanding.

Transcribed Image Text:

Consider the acute triangle ABC, having the orthocenter H and A ', B', C', the points where AH, BH, CH intersect the circle C (O, R), circumscribed to the triangle ABC. We note: OA'N BC = {A1}, OB'n AC = {B1}, OC'n AB = {Ci}. Show that: a) HBC = *A'BC. b) A¡H = A1 A'. c) m(<BOA1) = 180° – 2 m(<B) BA1 CA sin 2B sin 20 e) lines AA1, BB1, CC1 are concurrent. f) The set: {Με ΔΑBC| MΟ+ ΜΗR}; has exactly three elements.