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Area of Triangle Using Coordinate

Coordinate Geometry - Concepts

Cartesian Plane

Quadrants in the Cartesian Plane

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Area of Triangle Using Coordinate

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Concept Explanation

Area of Triangle Using Coordinate

We know that area of the trapezium ABCD whose two parallel sides are AB and DC and the distance between parallel sides is h, is given by

$large frac{1}{2}(AB+DC)h$

Let ABC be a triangle with vertices $large A(x_{1},y_{1}),B(x_{2},y_{2})$ and $large C(x_{3},y_{3})$ as shown in figure below.

Draw the ordinates AL, CM and BN.

Note that area of triangle ABC = Area of trapezium ALNB + Area of trapezium ACML - Area of trapezium BCMN

= $large frac{1}{2}(AL+BN)LN+frac{1}{2}(AL+CM)LM-frac{1}{2}(BN+CM)MN$

But $large AL=y_{1},BN=y_{2},CM=y_{3}$

$large LM=OM-OL=x_{3}-x_{1},MN=OM-ON=x_{3}-x_{2}$

$large and;LN=OL-ON=x_{1}-x_{2}$

$large therefore$ Area of triangle ABC

$large =frac{1}{2}(y_{1}+y_{2})(x_{1}-x_{2})+frac{1}{2}(y_{1}+y_{3})(x_{3}-x_{1})-frac{1}{2}(y_{2}+y_{3})(x_{3}-x_{2})$

$large =frac{1}{2}[(y_{1}+y_{2})x_{1}-(y_{1}+y_{2})x_{2}+(y_{1}+y_{3})x_{3}-(y_{1}+y_{3})x_{1}-(y_{2}+y_{3})x_{3}+(y_{2}+y_{3})x_{2}]$ $large =frac{1}{2}[(y_{1}+y_{2})x_{1}-(y_{1}+y_{3})x_{1}+(y_{2}+y_{3})x_{2}-(y_{1}+y_{2})x_{2}+(y_{1}+y_{3})x_{3}-(y_{2}+y_{3})x_{3}]$

$large =frac{1}{2}[x_1(y_{1}+y_{2}-y_{1}-y_{3})+x_2(y_{2}+y_{3}-y_{1}-y_{2})+x_3(y_{1}+y_{3}-y_{2}-y_{3})]$

$large =frac{1}{2}[x_{1}(y_{2}-y_{3})+x_{2}(y_{3}-y_{1})+x_{3}(y_{1}-y_{2})]$

.... (More Text Available, Login?)

Sample Questions

(More Questions for each concept available in Login)

Question : 1

Vertices of a triangle are (-2,0),(3,0) and (0,5). Area of this triangle is ______________ (in sq. units)
A. 5/2	B. 25/2	C. -5/2	D. -25/2
Right Option : B
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Area of Triangle Using Coordinate

Area of Triangle Using Coordinate

Students / Parents Reviews [10]

Shivam Rana

Manish Kumar

Om Umang

Shreya Shrivastava

Ayan Ghosh

Eshan Arora

Hiya Gupta

Barkha Arora

Aman Kumar Shrivastava

Cheshta