If the coordinates of a triangle are given, then, its area may be solved using the formula Area of triangle = 11 ₁ 11 x₂ ₂ 1 xys 11 Note: This formula requires the sequence of the points to be in counterclockwise manner. Find the area of the triangle (use Laplace cofactor expansion for the determinant) formed by the intersections of the lines: 2x+3y-16 = 0 x-y-3=0 7x-2y-6=0 Use Cramer's Rule in finding the points of intersection.

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
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Chapter2: Second-order Linear Odes
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By applying fundamental principles in engineering and mathematics, create a system of linear equations for the following problems and solve and check them using the indicated methods
If the coordinates of a triangle are given, then, its area may be solved using the formula
11 ₁ 11
Area of triangle = ₂ 2 1
x3 уз
Note: This formula requires the sequence of the points to be in counterclockwise manner.
Find the area of the triangle (use Laplace cofactor expansion for the determinant) formed by the intersections of
the lines:
2x+3y-16=0
x-y-3=0
7x-2y-6=0
Use Cramer's Rule in finding the points of intersection.
Transcribed Image Text:If the coordinates of a triangle are given, then, its area may be solved using the formula 11 ₁ 11 Area of triangle = ₂ 2 1 x3 уз Note: This formula requires the sequence of the points to be in counterclockwise manner. Find the area of the triangle (use Laplace cofactor expansion for the determinant) formed by the intersections of the lines: 2x+3y-16=0 x-y-3=0 7x-2y-6=0 Use Cramer's Rule in finding the points of intersection.
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