Select the correct answer from éach drop-down menu. Given: AXYZ with medians AZ and BX. Prove: YC meets the other two medians at O. IC H AXYZ has medians AZ and BX. Draw YO so that it intersects segment XZ at C. Construct segments HZ and HX such that H is on YO and HZ || XB and HX || BZ. Complete the following steps of a paragraph proof to prove that YC meets the other two medians at O. B - By the reflexive property of congruence, ZOYB Therefore, CH ZHYZ. ZYOB ZYHZ by the corresponding angles theorem. by AA similarity. Similar triangles have proportional sides, therefore, YO = OH OH. O is the midpoint of YH by the definition of a midpoint. AO is the midsegment of AXYH and as a parallelogram. Using properties of a parallelogram, OII bisects and C is the midpoint of XZ. YC is a median and meets the YB YO YO OH OH 1; YO AO || XH by the definition of midsegment. This establishes XZ. By the definition of a bisector, other two medians at O. - V V YB BZ​