The area of the triangle formed by the points (a,b+c),(b,c+a),(c,a+b)` is

|(1,a,b+c),(1,b,c+a),(1,c,a+b)| =

Using the property of determinants,show that the points A(a,b+c),B(b,c+a), C(c,a+b) are collinear.

Consider the points (b,c+a),(c,a+b) and (a,b+c). Find the area of the triangle formed by these points.

Find the area of the triangle with vertices A(1,1,2),B(2,3,5) and C(1,5,5).

If a, b, c are positive and unequal show that value of the determinant Delta=|[a, b, c],[ b, c, a],[ c, a, b]| is negative.

In a triangle ABC , (cosA)/(a)=(cosB)/(b)=(cosC)/(c) . If a=(1)/(sqrt(6)) , then the area of the triangle (in square units) is a) 1//24 b) sqrt(3)//24 c) 1//8 d) 1//sqrt(3)

Find the area of a triangle with vertices A(2,3,1),B(1,1,2) and C(1,2,1).