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प्रश्न
Find the area of the quadrilateral whose vertices are A(–3, 1), B(–2, –2), C(4, 1), D(2, 3).
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उत्तर
A(–3, 1), B(–2, –2), C(4, 1), D(2, 3)
A(`square`ABCD) = A(ΔABC) + A(ΔACD)
Area of triangle = `1/2|(x_1, y_1, 1),(x_2, y_2, 1),(x_3, y_3, 1)|`
A(ΔABC) = `1/2|(-3, 1, 1),(-2, -2, 1),(4, 1, 1)|`
= `1/2[-3(-2 - 1) - 1(-2 - 4) + 1(-2 + 8)]`
= `1/2(9 + 6 + 6)`
∴ A(ΔABC) = `21/2` sq. units'.
∴ A(ΔACD) = `1/2|(-3, 1, 1),(4, 1, 1),(2, 3, 1)|`
= `1/2[-3(1 - 3) - 1(4 - 2) + 1(12 - 2)]`
= `1/2(6 - 2 + 10)`
∴ A(ΔACD) = 7 sq. units
∴ A(`square`ABCD) = A(ΔABC) + A(ΔACD)
= `21/2 + 7`
= `35/2` sq. units.
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