S is the centroid of triangle NQL.
The length of NR is Option C: 36 units
How to find the centroid of the triangle?
The centroid of a triangle is the point where the three medians of the triangle intersect. A median is a line segment that connects a vertex of the triangle to the midpoint of the opposite side. In this case, let's assume that NR is one of the medians, and S is the centroid.
Given that NR has a length of 36 units, this information alone doesn't provide enough data to determine the exact coordinates or lengths of other line segments in the triangle. To fully describe the triangle NQL, we would need more information, such as the lengths of the other medians or the coordinates of its vertices.
In a triangle, the medians do intersect at a point called the centroid, and the medians divide each other in a 2:1 ratio, meaning that the distance from the centroid to the midpoint of NR is two-thirds of the total length of NR.
Complete question is:
S is the centroid of triangle NQL. What is the length of NR?
a: 4 units
b: 8 units
c: 36 units
d: 48 units