## 2. ABCD is a quadrilateral in which AB || DC and AD II BC. A line MN, parallel to CD, is drawn through the midpoint M of the side

Question

2. ABCD is a quadrilateral in which AB || DC and AD II BC. A line MN, parallel to CD, is drawn

through the midpoint M of the side BC which meets AD at N. Prove that N is the midpoint of AD.

Also, prove that MN bisects the diagonal AC. please solve this question it’s very important. please solve this with the diagram.

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Math
3 months
2021-10-15T16:00:28+00:00
2021-10-15T16:00:28+00:00 1 Answer
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## Answers ( )

Let the line SR to T so that CT is parallel to AS

DSR and CRT are similar to each other

DR = RC in which the R is the mid value

SR is touching the mid points of DA and DC so as per mid point theorem SR||AC

AC || PQ can be proven which will prove that PQRS is a parallelogram.