Class 9 Mathematics Quadrilaterals Textbook - Quadrilaterals

Easy

In $\Delta ABC$ and $\Delta DEF$,$AB = DE$,$AB \parallel DE$,$BC = EF$ and $BC \parallel EF$. Vertices $A, B$ and $C$ are joined to vertices $D, E$ and $F$ respectively (see Fig). Show that quadrilateral $BEFC$ is a parallelogram.

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Solution

(N/A) To prove that $BEFC$ is a parallelogram.
Given that $BC = EF$ and $BC \parallel EF$.
$A$ quadrilateral is a parallelogram if one pair of opposite sides is equal and parallel.
Since $BEFC$ is a quadrilateral in which the pair of opposite sides $BC$ and $EF$ is equal and parallel,
Therefore,$BEFC$ is a parallelogram.

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Textbook - Quadrilaterals

$ABCD$ is a parallelogram in which $P$ and $Q$ are mid-points of opposite sides $AB$ and $CD$ respectively. If $AQ$ intersects $DP$ at $S$ and $BQ$ intersects $CP$ at $R$,show that $DPBQ$ is a parallelogram.

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In $\Delta ABC$ and $\Delta DEF$,$AB = DE$,$AB \parallel DE$,$BC = EF$ and $BC \parallel EF$. Vertices $A, B$ and $C$ are joined to vertices $D, E$ and $F$ respectively (see Fig). Show that quadrilateral $ACFD$ is a parallelogram.

Easy

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If the diagonals of a parallelogram are equal,then show that it is a rectangle.

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Two parallel lines $l$ and $m$ are intersected by a transversal $p$ (see Fig). Show that the quadrilateral formed by the bisectors of interior angles is a rectangle.

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In parallelogram $ABCD$,two points $P$ and $Q$ are taken on diagonal $BD$ such that $DP = BQ$ (see Fig). Show that: $AP = CQ$.

Medium

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In $\Delta ABC$ and $\Delta DEF$,$AB = DE$,$AB \parallel DE$,$BC = EF$ and $BC \parallel EF$. Vertices $A, B$ and $C$ are joined to vertices $D, E$ and $F$ respectively (see Fig). Show that quadrilateral $BEFC$ is a parallelogram.

Similar Questions

$ABCD$ is a parallelogram in which $P$ and $Q$ are mid-points of opposite sides $AB$ and $CD$ respectively. If $AQ$ intersects $DP$ at $S$ and $BQ$ intersects $CP$ at $R$,show that $DPBQ$ is a parallelogram.

In $\Delta ABC$ and $\Delta DEF$,$AB = DE$,$AB \parallel DE$,$BC = EF$ and $BC \parallel EF$. Vertices $A, B$ and $C$ are joined to vertices $D, E$ and $F$ respectively (see Fig). Show that quadrilateral $ACFD$ is a parallelogram.

If the diagonals of a parallelogram are equal,then show that it is a rectangle.

Two parallel lines $l$ and $m$ are intersected by a transversal $p$ (see Fig). Show that the quadrilateral formed by the bisectors of interior angles is a rectangle.

In parallelogram $ABCD$,two points $P$ and $Q$ are taken on diagonal $BD$ such that $DP = BQ$ (see Fig). Show that: $AP = CQ$.

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