Line passess from fixed point `(2, 3)` intersects axis of points P and Q. If O is origin and OPRQ will be rectangle then locus of point R is ..........

Find equation of line passes from point P(1,-7) which intersects axis is at points A and B such that 4AP- 3BP=0 .

Line 2x - 3y + 8 = 0 intersects parabola y^(2) = 8x of points P and Q then point of bar(PQ) is ……..

let P be the point (1, 0) and Q be a point on the locus y^2= 8x . The locus of the midpoint of PQ is

A point moves so that square of its distance from the point (3,-2) is numerically equal to its distance from the line 5x - 12y =3 . The equation of its locus is ......... .

Tangent and normal from point P(16, 16) to the parabola y^(2) = 16x intersects the axis of parabola of points A and B. If C is the centre of the circle from points P,A and B. Such that angleCPB = theta then one possible value of theta is ……….

A plane passes through a fixed point (a, b, c) and cuts the axes in A, B, C. The locus of a point equidistant from origin A, B, C must be

Find equation of line passes from point of intersection at lines 4x-3y - 1 =0 and 2x - 5y+3=0 which makes equal angle with axis.

P(vec p) and Q(vec q) are the position vectors of two fixed points and R(vec r) is the position vectorvariable point. If R moves such that (vec r-vec p)xx(vec r -vec q)=0 then the locus of R is