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Area of Triangle

Areas Of Parallelograms And Triangles I - Concepts

Congruent Figures

Figures on the Same Base and Between the Same Parallels

Parallelograms on Same Base and Between Same Parallels

Area of Parallelograms

Area of Triangle

Class - 9th IMO Subjects

Concept Explanation

Area of Triangle

Area of Triangle: Area of a triangle is equal to half of the product of base and height

A right triangle is the one in which the measure of any one of the interior angles is 90 degrees. It is to be noted here that since the sum of interior angles in a triangle is 180 degrees, only 1 of the 3 angles can be a right angle. If the other two angles are equal, that is 45 degrees each, the triangle is called an isosceles right angled triangle. However, if the other two angles are unequal, it is a scalene right angled triangle.

Area of Triangle = $frac{1}{2}times basetimes height$

Perimeter of a right triangle = a + b + c = Sum of three sides

Where a, b and c are the measure of its three sides.

Pythagoras Theorem defines the relationship between the three sides of a right angled triangle. Thus, if the measure of two of the three sides of a right triangle is given, we can use the Pythagoras Theorem to find out the third side. $Hypotenuse^2=Perpendicular^2+Base^2$

Example: Find The Area Of A Right Triangle as given: AB = 4cm and AC = 3cm

Solution: using Pythagoras theorem,

$large (AB)^{2}=(AB)^{2}+(BC)^{2}$

$large (BC)^{2}=(AC)^{2}-(AB)^{2}$

$large (BC)^{2}=25-16$

$large (BC)^{2}=9$

$large BC=sqrt{9}$

BC = 3 cm

Area of triangle= $large =frac{1}{2}times AB times BC$

$dpi{100} large =frac{1}{2}times 4 times 3=6cm^2$

Theorem 1 The area of a triangle is half the product of any its sides and the corresponding altitude.

Given A $Delta ABC$ in which AL is the altitude to the side BC.

To prove $ar(Delta ABC)=frac{1}{2}(BCtimes AL)$

Construction Through $C$ and $A$ draw CD || BA and AD || BC respectively, intersecting each other at $D.$

Proof By construction we have, BA || CD and AD || BC $Rightarrow$ ABCD is a parallelogram as both opposite pair of sides are parallel to each other.

Since $AC$ is a diagonal of parallelogram ABCD

$therefore;;;;ar(Delta ABC)=frac{1}{2}ar(parallel ^{gm} ABCD)$

$Rightarrow ;;;ar (Delta ABC)=frac{1}{2}(BCtimes AL)$

Beacuse is the base and $AL$ is the corresponding altitude of parallelogram ABCD.

Hence Proved.

Given A $Delta ABC$ in which AL is the altitude to the side BC.

To prove $ar(Delta ABC)=frac{1}{2}(BCtimes AL)$

Construction Through $C$ and $A$ draw $CDparallel BA$ and $ADparallel BC$ respectively, intersecting each other at $D.$

Proof We have,

$BAparallel CD$ [ By construction]

and, $ADparallel BC$ [ By construction]

$therefore;;;; BCDA$ is a parallelogram.

Since $AC$ is a diagonal of $parallel ^{gm} BCDA.$

$therefore;;;;ar(Delta ABC)=frac{1}{2}ar(parallel ^{gm} BCDA)$

$Rightarrow ;;;ar (Delta ABC)=frac{1}{2}(BCtimes AL)$ [ $because BC$ is the base and $AL$ is the corresponding

altitude of $parallel ^{gm}BCDA$ ]

[ Fig. required (pg. no. 15.7) xxxxx]

Sample Questions

(More Questions for each concept available in Login)

Question : 1

$Delta$ MNO and $Delta$ ABC are two congruent isosceles triangles with equal sides of 7 cm and perpendicular on it of length 6 cm. The area of $Delta$ MNO and $Delta$ ABC is equal to
A. 42 $cm^2$ , 42 $cm^2$	B. $21 cm^2$ , $21 cm^2$	C. 84 $cm^2$ , 84 $cm^2$	D. $26 cm^2$ , $26 cm^2$
Right Option : B
View Explanation

Question : 2

In the given figure,if ar ( $Delta$ PQR) = 17 sq. units,then ar ( $Delta$ XYZ) is

17 sq. units

$frac{17}{2}$ sq. units

34 sq. units

none of these

Right Option : A

View Explanation

Question : 3

In the given right angle triangle Find out the area of triangle $APB$ .
A. 22	B. 24	C. 20	D. 30
Right Option : B
View Explanation

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Linear Equations in One Variable

Introduction to Trigonometry

Introduction to Euclids Geometry

Herons Formula Complete

Polynomial I

Surface Area and Volume II

Surface Area and Volume I

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Constructions

Areas Of Parallelograms And Triangles II

Areas Of Parallelograms And Triangles I

Linear Equations in Two Variables

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Area of Triangle

Area of Triangle

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