Question

Express the area of a triangle given by vertices, `A(x_1,y_1), B(x_2,y_2), C(x_3,y_3)`. Show that it can be expressed as determinant of: `det(Delta) = [(1, 1, 1 ),(x_1, x_2, x_3),(y_1, y_2, y_3) ]`.Calculate the area of A(3,6), B(7,8), & C(5,2)?

Answer 1

See below.

Explanation:

The triangle area can be computed as a closed circuit integral. So

`S = 1/2(y_1+y_3)(x_3-x_1) + 1/2(y_3+y_2)(x_2-x_3)+1/2(y_2+y_1)(x_1-x_2)`.

Expanding and simplifying

`S = 1/2(x_2 y_1 - x_3 y_1 - x_1 y_2 + x_3 y_2 + x_1 y_3 - x_2 y_3)`

`S =1/2|(x_2,x_3),(y_2,y_3)|-1/2 |(x_1,x_3),(y_1,y_3)|+1/2|(x_1,x_2),(y_1,y_2)|` which is equivalent to

`S =1/2 |(1,1,1),(x_1,x_2,x_3),(y_1,y_2,y_3)|`

For the example given we have

`S =1/2 |(1,1,1),(3,7,5),(6,8,2)| = -10`

Of course this must be considered in absolute value. So

`S = abs(-10)=10`