Class 9MathematicsAreas of Parallelograms and TrianglesTextbook - Areas of Parallelograms and Triangles
MediumIn the figure,$ar(DRC) = ar(DPC)$ and $ar(BDP) = ar(ARC)$. Show that both the quadrilaterals $ABCD$ and $DCPR$ are trapeziums.
(N/A) We have $ar(\Delta DRC) = ar(\Delta DPC)$ [Given].
Since they are on the same base $DC$ and have equal areas,they must lie between the same parallels.
$\Rightarrow DC \parallel RP$.
Since one pair of opposite sides of quadrilateral $DCPR$ is parallel,$DCPR$ is a trapezium.
Again,we have $ar(\Delta BDP) = ar(\Delta ARC)$ $(1)$.
Also,$ar(\Delta DPC) = ar(\Delta DRC)$ $(2)$.
Subtracting $(2)$ from $(1)$,we get:
$[ar(\Delta BDP) - ar(\Delta DPC)] = [ar(\Delta ARC) - ar(\Delta DRC)]$
$\Rightarrow ar(\Delta BDC) = ar(\Delta ADC)$.
Since they are on the same base $DC$ and have equal areas,they must lie between the same parallels.
$\Rightarrow AB \parallel DC$.
Since one pair of opposite sides of quadrilateral $ABCD$ is parallel,$ABCD$ is a trapezium.
Since they are on the same base $DC$ and have equal areas,they must lie between the same parallels.
$\Rightarrow DC \parallel RP$.
Since one pair of opposite sides of quadrilateral $DCPR$ is parallel,$DCPR$ is a trapezium.
Again,we have $ar(\Delta BDP) = ar(\Delta ARC)$ $(1)$.
Also,$ar(\Delta DPC) = ar(\Delta DRC)$ $(2)$.
Subtracting $(2)$ from $(1)$,we get:
$[ar(\Delta BDP) - ar(\Delta DPC)] = [ar(\Delta ARC) - ar(\Delta DRC)]$
$\Rightarrow ar(\Delta BDC) = ar(\Delta ADC)$.
Since they are on the same base $DC$ and have equal areas,they must lie between the same parallels.
$\Rightarrow AB \parallel DC$.
Since one pair of opposite sides of quadrilateral $ABCD$ is parallel,$ABCD$ is a trapezium.
Explore More
Similar Questions
In the figure,$ABC$ is a right triangle right-angled at $A$. $BCED$,$ACFG$,and $ABMN$ are squares on the sides $BC$,$CA$,and $AB$ respectively. Line segment $AX \perp DE$ meets $BC$ at $Y$. Show that: $\operatorname{ar}(BCED) = \operatorname{ar}(ABMN) + \operatorname{ar}(ACFG)$
Medium
View SolutionIn the figure,$ABCD$ is a parallelogram and $EFCD$ is a rectangle. Also,$AL \perp DC$. Prove that:
$(i)$ $\text{ar}(ABCD) = \text{ar}(EFCD)$
$(ii)$ $\text{ar}(ABCD) = DC \times AL$
$(i)$ $\text{ar}(ABCD) = \text{ar}(EFCD)$
$(ii)$ $\text{ar}(ABCD) = DC \times AL$
Difficult
View SolutionParallelogram $ABCD$ and rectangle $ABEF$ are on the same base $AB$ and have equal areas. Show that the perimeter of the parallelogram is greater than that of the rectangle.
Difficult
View Solution$D$ and $E$ are points on sides $AB$ and $AC$ respectively of $\Delta ABC$ such that $\operatorname{ar}(DBC) = \operatorname{ar}(EBC)$. Prove that $DE \parallel BC$.
Medium
View SolutionIn the figure,$ABC$ is a right-angled triangle with the right angle at $A$. $BCED$,$ACFG$,and $ABMN$ are squares constructed on the sides $BC$,$CA$,and $AB$ respectively. The line segment $AX \perp DE$ meets $BC$ at $Y$. Show that: $\Delta FCB \cong \Delta ACE$.
Medium
View SolutionVedclass Products
For Students
Vedclass Test Series
Mock tests in real JEE/NEET style with performance analysis. 5-day free trial.
Start Free TrialFor Teachers
Exam Paper Generator
Generate Set A/B/C/D exam papers from 7.5L+ questions in 2 minutes. 3 chapters free.
Try FreeFor Institutes
Online Exam Module
Live online exams with unlimited students, 360° analytics & white-label branding.
See Demo