Statement I If sum of algebraic distances from points A(1,2),B(2,3),C(6,1) is zero on the line `ax+by+c = 0` then `2a+3b + c = 0` ,
Statement II The centroid of the triangle is (3,2)

The lines ax + by + c = 0, where 3a + 2b + 4c= 0, are concurrent at the point

Statement I : The area of the triangle formed by the points A(100, 102), B(102, 105), C(104, 107) is same as the area formed by A'(0, 0), B' (2, 3), C'(4, 5). Statement II : The area of the triangle is constant wih respect to translation.

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

The vertices of a triangle an A(1,2), B(-1,3) and C(3, 4). Let D, E, F divide BC, CA, AB respectively in the same ratio. Statement I : The centroid of triangle DEF is (1, 3). Statement II : The triangle ABC and DEF have the same centroid.

Statement 1 : Let the vertices of a A B C be A(-5,-2),B(7,6), and C(5,-4) . Then the coordinates of the circumcenter are (1,2) Statement 2 : In a right-angled triangle, the midpoint of the hypotenuse is the circumcenter of the triangle.

Statement 1 :If the point (2a-5,a^2) is on the same side of the line x+y-3=0 as that of the origin, then a in (2,4) Statement 2 : The points (x_1, y_1)a n d(x_2, y_2) lie on the same or opposite sides of the line a x+b y+c=0, as a x_1+b y_1+c and a x_2+b y_2+c have the same or opposite signs.

Let the algebraic sum of the perpendicular distance from the points (2, 0), (0,2), and (1, 1) to a variable straight line be zero. Then the line passes through a fixed point whose coordinates are___

Statement 1: Distance of point D( 1,0,-1) from the plane of points A( 1,-2,0) , B ( 3, 1,2) and C( -1,1,-1) is 8/sqrt229 Statement 2: volume of tetrahedron formed by the points A,B, C and D is sqrt229/ 2

Statement I : The lines x(a+2b) +y(a+3b)=a+b are concurrent at the point (2,-1) Statement II : The lines x+y -1 =0 and 2x + 3y -1 = 0 intersect at the point (2,-1)

If ((3)/(2),0), ((3)/(2), 6) and (-1, 6) are mid-points of the sides of a triangle, then find Centroid of the triangle