Consider the points A(0, 0, 0), B(5, 0, 0), C(3, 0, 4) and D(0, 4, 3).
The points A, B, C and D are-

Consider the points A(0, 0, 0), B(5, 0, 0), C(3, 0, 4) and D(0, 4, 3). The line AC and BD are-

Consider the points A(0, 0, 0), B(5, 0, 0), C(3, 0, 4) and D(0, 4, 3). Area of triangle ABC (in square units) is -

Given four points A(2, 1, 0), B(1, 0, 1), C(3, 0, 1) and D(0, 0, 2) . Point D lies on a line L orthogonal to the plane determined by the points A, B and C. The equation of the plane ABC is

Consider the points A(0, 0, 0), B(2, 0, 0), C(1, sqrt(3), 0) and D(1, 1/sqrt(3), (2sqrt(2))/sqrt(3)) Statement - I : ABCD is a square. Statement - II : |AB|=|BC|=|CD|=|DA| .

Let A(-2, 0, 3), B(0, 3, -3), C(3, 3, 5) and D(5, 4, 3) be four given points, find the acute angle between the lines AB and CD.

Consider the points O(0,0), A(0,1) , and B(1,1) in the x-y plane. Suppose that points C(x,1) and D(1,y) are chosen such that 0ltxlt1 . And such that O,C, and D are collinear. Let the sum of the area of triangles OAC and BCD be denoted by S. Then which of the following is/are correct?.

The z-coordinate of a point equidistant from the points ( 0 , 0 ,0) , ( 2 , 0 , 0) , ( 0 , 4 , 0) and ( 0 , 0, 6) is _

Show that the points A(6,-7,0),B(16 ,-19 ,-4),C(0,3,-6) and D(2,-5,10) are such that AB and CD intersect at the point P(1,-1,2) .

Determine the coordinates of the point which is equiistant from the points ( 0 , 0 0) , ( a , 0 ,0) and ( 0 , b , 0) and ( 0 , 0 , c) .

Consider a triangular pyramid ABCD the position vectors of whose agular points are A(3,0,1),B(-1,4,1),C(5,3, 2) and D(0,-5,4) Let G be the point of intersection of the medians of the triangle BCD. The length of the vector bar(AG) is