Converse of Mid points theorem . Plz experts solve it fast . If its fig. is that
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converse of midpoint theorem
If a line passing through one side of triangle and parallel to second side of triangle then it intersects third side of triangle at its midpoint.
The converse of MidPoint Theorem
The converse of the midpoint theorem states that ” if a line is drawn through the midpoint of one side of a triangle, and parallel to the other side, it bisects the third side”.Given: In ∆PQR, S is the midpoint of PQ, and ST is drawn parallel to QR.
Converse of Midpoint Theorem Proof
To prove: ST bisects PR, i.e., PT = TR.
Construction: Join SU where U is the midpoint of PR.
Converse of Midpoint Theorem
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Proof:
Statement
Reason
1. SU ∥ QR and SU = 12QR.
1. By Midpoint Theorem.
2. ST ∥QR and SU ∥ QR.
2. Given and statement 1.
3. ST ∥ SU.
3. Two lines parallel to the same line are parallel themselves.
4. ST and SU are not the same line.
4. From statement 3.
5. T and U are coincident points.
5. From statement 4.
6. T is the midpoint of PR (Proved).
6. From statement 5.
