Question

A point T is taken on the side PQ of the parrallelogram PQRS and the line ST and RQ are produced to meet at V. prove that the triangles VSQ and VTR are equal in area.

Answer 1

HEY.

Here is your answer .

Wise that this may help u .

Answer 2

Area of Δ VSQ =  Area of Δ VTR

Step-by-step explanation:

Join SQ & RT intersecting at O

Area of Δ VSQ = Area of ΔVTQ + Area of ΔSTQ

Area of Δ VTR = Area of ΔVTQ + Area of ΔRQT

Area of ΔSTQ = Area of ΔRQT as Both triangle sare on same base QT and between parallel lines

Area of ΔSTQ = Area of ΔRQT

=> Area of Δ VSQ =  Area of Δ VTR

QED

proved

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