Let P(-1, 0), Q(0, 0) and `R(3, 3sqrt(3))` be three points. Then the equation of the bisector of the angle PQR is :

Let P-=(-1, Q), Q-=(0, 0) and R-=(3, 3sqrt(3)) be three points. The equation of the bisector of the angle PQR is :

Let P-=(-1,0),Q-=(0,0) and R-=(3,3sqrt(3)) be three points. The equation of the bisector of the angle PQR is

Let A(-1, 0), B(0, 0) and C(3, 3sqrt(3)) be three points. Then the bisector of angle ABC is :

A st. line through the point (2, 2) intersects the lines sqrt(3)x+y=0 and sqrt(3)x-y=0 at the points A and B. The equation to the line AB so that the triangle OAB is equilateral is :

If P=(1,0), Q=(-1,0) and R=(2,0) are three given points, then the locus of S satisfying the relation S Q^(2)+S R^(2)=2 S P^(2) is

Let O(0,0), P(3,4), Q(6,0) be the vertices of the triangle O P Q . The point R inside the triangle O P Q is such that the triangle O P R, P Q R and O Q R are of equal area. The coordinates of R are

P(0, 3, -2), Q(3, 7, -1) and R(1, -3, -1) are 3 given points. Find vec (PQ)

Let PQR be a right-angled isosceles triangle right-angled at P(2, 1). If the equation of the line QR is 2x+y=3 , then the equation representing the pair of lines PQ and PR is :

Find the equation of the bisectors of the angle between the lines represented by 3x^2-5xy+4y^2=0

Let 'C' be the circle with centre (0,0 ) and radius 3 units. The equation of the locus of the mid points of chords of the circle 'C' that subtend an angle of 2pi//3 at its centre is: