If the projection of a triangle formed by the points `A(-1,1,1),B(1,-1,1)` and `C(1,1,-1)` on the xy plane then the area of projected triangle on xy plane is

Find the area of the triangle whose vertices are the points (1,2,3) (2,3,1) and (1,1,1)

Find the ortho -centre of the triangle formed by joining the points A(-2,-3),B(6,1)andC(1,6) .

Find the value of cos B for the triangle formed by joining the points A(6,11,2),B(1,-1,2)and C(1,2,6).

The triangle formed by joining the points (3, -11, 5)-, (-1, -3, 4) and (-2, 1, -4) is-

All points lying inside the triangle formed by the points (1,3),(5,0) and (-1,2) satisfy

The centroid of the triangle formed by the points (1,a), (2,b) and (c^2,-3) by which condition the points lies on the x-axis

Calculating the angle of the triangle, prove that the points A(3, 4, -1) , B(1, 5, 1) and C(1, 2, -2) are the vertices of an isosceles triangle.

Statement 1 : The area of the triangle formed by the points A(1000 ,1002),B(1001 ,1004),C(1002 ,1003) is the same as the area formed by the point A^(prime)(0,0),B^(prime)(1,2),C^(prime)(2,1) Statement 2 : The area of the triangle is constant with respect to the translation of axes. (a) Statement 1 and Statement 2, both are correct. Statement 2 is the correct explanation for Statement 1. (b) Statement 1 and Statement 2, both are correct. Statement 2 is not the correct explanation for Statement 1. (c) Statement 1 is correct but Statement 2 is not correct. (d) Statement 2 is correct but Statement 1 is not correct.

Consider the parabola y^2 = 8x. Let Delta_1 be the area of the triangle formed by the end points of its latus rectum and the point P( 1/2 ,2) on the parabola and Delta_2 be the area of the triangle formed by drawing tangents at P and at the end points of latus rectum. Delta_1/Delta_2 is :

The centroid of the triangle with vertices (-1,1,1), (-1,4,1), (-1,-2,1) is