Final answer:
The lengths of the segments connecting to the centroid Q of triangle AJKL are determined using the property that a centroid divides the medians in a 2:1 ratio. The calculations give the lengths of LQ, QN, QP, JQ, and QK as 48, 24, 62, 31, and 52 units, respectively.
Step-by-step explanation:
To solve for the various lengths in the question involving centroid Q of triangle AJKL, we will apply the concept that the centroid of a triangle divides the medians in a 2:1 ratio, with the centroid being twice as far from the vertex as it is from the midpoint of the opposite side.
- LQ = 2/3(LN) = 2/3(72) = 48 units
- QN = 1/3(LN) = 1/3(72) = 24 units
- QP = 2/3(JP) = 2/3(93) = 62 units
- JQ = 1/3(JP) = 1/3(93) = 31 units
- QK = 2/3(MK) = 2/3(78) = 52 units