Can Someone Help Me With These Three Please?Im Not In A Rush To Finish Them I Just Need Help With Answers, Thanks

Answer:ΔHJK shows G as the orthocenterShow A.F is the median of BC18Step-by-step explanation:1) This is a vocabulary question. The orthocenter is the point where the altitudes intersect. Of course, each altitude is a segment from a vertex that is perpendicular to the opposite side of the triangle.Perhaps it could be useful to remember the prefix ortho- means perpendicular, as in orthogonal. Each altitude is perpendicular to one of the sides of the triangle.__2) To do this proof, you would find midpoints of segments AB and AC, write the equations of the lines through them from the opposite vertex, then solve those equations to find point G. You would then write the equation for line AG and find its intersection point with segment BC (point F). The last step is to show that point F is the midpoint of BC. (It might be easier to show that midpoint F is on line AG.)The closest answer choice, though poorly worded, is the last one: show A.F is the median of BC.(Strictly speaking, a line segment (A.F) is not a median of a line segment (BC), but can be a median of a triangle, or a bisector of a line segment.)__3) The centroid divides the median into parts with the ratio 2:1. That is, the shorter part differs from the longer one by 2-1 = 1 ratio unit. If those parts differ in length by 6 measurement units, then one ratio unit must be 6 measurement units. The total length of the median is 2+1 = 3 ratio units, or 3×6 measurement units = 18 measurement units._____Comment on A.FBrainly thinks the name of the segment starting with A and ending with F is a "bad word" so won't let it be posted.