In a triangle PQR, S is the mid-point of median PT. Then
ar(QST) = 1/4 ar(PQR)
ar(QST) = ar(PQR)
ar(QST) = 1/2 ar(PQR)
ar(QST) = 2 ar(PQR)
Answers
Answer:
- In a triangle PQR, S is the mid-point of median PT. Then
ar(QST) = 1/4 ar(PQR)
ar(QST) = ar(PQR)
ar(QST) = 1/2 ar(PQR)
ar(QST) = 2 ar(PQR)
Step-by-step explanation:
- ok please make it a brainliest answer.
Answer:
In a triangle PQR, S is the mid-point of median P ar(QST) = ar(PQR)
Step-by-step explanation:
In geometry, the midpoint stands for the middle point of a line segment. It stands equidistant from both endpoints, and it stands the centroid both of the segment and the endpoints. It bisects the segment. A triangle exists as a three-sided polygon, which includes three vertices. The three sides stand associated with each other end to end at a point, which forms the angles of the triangle. The sum of all three angles of the triangle is equivalent to 180 degrees. A triangle exists as a polygon with three edges and three vertices. It exists as one of the primary shapes in geometry. A triangle with vertices A, B, and C stands for distinguished triangle ABC. In Euclidean geometry, any three points, when non-collinear, select a unique triangle and simultaneously, a unique plane. The median stands for the middle number in an ordered data set. The mean exists as the sum of all values separated by the total number of values.
In a triangle PQR, S is the mid-point of median P ar(QST) = ar(PQR).
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