Let P= (-1, 0), Q = (0, 0), and R=(3, `3sqrt3`) be three points. Then the equation of the bisector of `/_PQR` is

Consider the point A (0,0), b(4,2) and C (8,0) Find the equation of the perpendicular bisector of AB.

Let P (1, 2, 3) and Q (-1, -2, -3) be the two points and let O be the origin. Then, |PQ+OP| is equal to a) sqrt(13) b) sqrt(14) c) sqrt(24) d) sqrt(12)

Consider the points A (1,2) and B (2,3) Let P and Q be the points of trisection of the segment joining A and B Find the co-ordinates of P and Q

In the parallelogram PQRS, P(-3,2) Q(2,7), S(1, 9) are three vertices. Find the length of the diagonal PR.

Consider the points P(1,3,4) &Q(-3,5,2) .Find the equation of the line passing through P and Q.

The vertices of ∆PQR are P(2, 1), Q(−2,3) and R(4,5). The equation of median through the vertex R is