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प्रश्न
If A(–7, 5), В(–6, –7), С(–3, –8) and D(2, 3) are the vertices of a quadrilateral ABCD, then find the area of the quadrilateral.
योग
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उत्तर
Given: A(–7, 5), В(–6, –7), С(–3, –8) and D(2, 3)
Step-wise calculation:
1. Use the shoelace formula for vertices in order A→B→C→D→A:
Area = `1/2 |(x_1y_2 + x_2y_3 + x_3y_4 + x_4y_1) - (y_1x_2 + y_2x_3 + y_3x_4 + y_4x_1)|`
2. Compute the two sums:
x1y2 = (–7)(–7)
= 49
x2y3 = (–6)(–8)
= 48
x3y4 = (–3)(3)
= –9
x4y1 = (2)(5)
= 10
Sum1 = 49 + 48 – 9 + 10
= 98
y1x2 = (5)(–6)
= –30
y2x3 = (–7)(–3)
= 21
y3x4 = (–8)(2)
= –16
y4x1 = (3)(–7)
= –21
Sum2 = –30 + 21 – 16 – 21
= –46
3. Area = `1/2` |Sum1 – Sum2|
= `1/2 |98 - (-46)|`
= `1/2 |144|`
= 72
The area of quadrilateral ABCD is 72 square units.
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