Given:- Vertices of the triangles:- (2, -3), (3, 2) and (-2, 5) To Find:- The area of the triangle. Solution:- Firstly we have the given points as:- (2, -3) (3, 2) (-2, 5) From these points we get the following:- x₁ = 2 x₂ = 3 x₃ = -2 y₁ = -3 y₂ = 2 y₃ = 5 We already know:– Area of triangle = 1/2[x₁(y₂ – y₃) + x₂(y₃ – y₁) + x₃(y₁ – y₂)] Putting all the values in the formula:- Area = 1/2[2(2 – 5) + 3{5 – (-3)} + {-2(-3 – 2)}] = Area = 1/2[2 × (-3) + 3(5 + 3) + {(-2) × (-5)}] = Area = 1/2[-6 + 3 × 8 + 10] = Area = 1/2[-6 + 24 + 10] = Area = 1/2[-6 + 34] = Area = 1/2[28] = Area = 14 sq.units ∴ Area of the triangle is 14 sq.units ________________________________ Important Points:- We need to remember the meaning of x₁, x₂ …. y₁, y₂. So:- x₁ = abscissa of the 1st point x₂ = abscissa of the 2nd point x₃ = abscissa of the 3rd point y₁ = ordinate of the 1st point y₂ = ordinate of the 2nd point y₃ = ordinate of the 3rd point ________________________________ Reply
Given:-
To Find:-
Solution:-
Firstly we have the given points as:-
From these points we get the following:-
We already know:–
Putting all the values in the formula:-
Area = 1/2[2(2 – 5) + 3{5 – (-3)} + {-2(-3 – 2)}]
= Area = 1/2[2 × (-3) + 3(5 + 3) + {(-2) × (-5)}]
= Area = 1/2[-6 + 3 × 8 + 10]
= Area = 1/2[-6 + 24 + 10]
= Area = 1/2[-6 + 34]
= Area = 1/2[28]
= Area = 14 sq.units
∴ Area of the triangle is 14 sq.units
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Important Points:-
We need to remember the meaning of x₁, x₂ …. y₁, y₂.
So:-
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