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प्रश्न
Find the area of ΔABC with vertices A(0, –1), B(2, 1) and C(0, 3). Also, find the area of the triangle formed by joining the midpoints of its sides. Show that the ratio of the areas of two triangles is 4 : 1.
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उत्तर
Let `A (x_1=0,y_1=-1), B (x_2 =2,y_2=1) and C (x_3 = 0, y_3=3) `be the given points. Then
`Area (Δ ABC)=1/2[x_1 (y_2-y_3)+ x_2(y_3-y_1) +x_3(y_1-y_3)]`
`=1/2 [0(1-3)+2(3+1)+0(-1-1)]`
`=1/2xx8=4` sq . units
So, the area of the triangle 4 ΔABC is sq units.
Let `D(a_1,b_1),E)a_2,b_2) and F (a_3,b_3)` be the midpoints of AB, BC and AC respectively
Then
`a_1 = (0+2)/2=1 b_2=(-1+1)/2=0`
`a_2=(2+0)/2=1 b_2=(1+3)/2=2`
`a_3=(0+0)/2=0 b_3 = (-1+3)/2=1`
Thus, the coordinates of D,E and F are D`(a_1=1,b_1=0),E(a_2=1,b_2=2) and F(a_3=0, b_3=1).` Now
`Area (ΔDEF)= 1/2 [a_1(b_2-b_2)+a_2(b_3-b_1)+a_3(b_1-b_2)]`
`=1/2 [1(2-1)+1(1-0)+0(0-2)]`
`=1/2[1+1+0]=1 `sq. units
So, the area of the triangle ΔDEF is 1 sq. unit.
Hence, ΔABC : ΔDEF = 4:1.
