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

Show that the points A (-2, 3, 5), B(1, 2, 3) and C(7, 0, -1) are collinear.

Show that the points A(1,3,2),B(-2,0,1) and C(4,6,3) are collinear.

Show that the points A(1,2,7),B(2,6,3) and C(3,10,-10 are collinear.

Show that the points A(1,-2,-8) , B(5,0,-2), C(11,3,7) are collinear.

Find the area of the triangle Delta ABC with A(a,b+c), B(b,c+a), and C(c, a+ b).

If the centroid of a triangle formed by the points a. b), (b, c), and (c a) is at the origin, then a^(3) + b^(3) + c^(3) =

Using the factor theorem it is found that b + c , c + a and a + b are three factors of the determine : |(-2a,a+b,a+c),(b+a,-2b,b+c),(c+a,c+b,-2c)| . The other factor in the value of the determine is :

Show that if A ⊂ B , then C – B ⊂ C – A .

Without expanding the determinant, prove that {:|( a, a ^(2), bc ),( b ,b ^(2) , ca),( c, c ^(2) , ab ) |:} ={:|( 1, a^(2) , a^(3) ),( 1,b^(2) , b^(3) ),( 1, c^(2),c^(3)) |:}

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