Let `A(-1,0)andB(2,0)` be two points. A point M moves in the plane in such a way that `angleMBA=2angleMAB`. Then the point M moves along

Let A (-2,2)and B (2,-2) be two points AB subtends an angle of 45^@ at any points P in the plane in such a way that area of Delta PAB is 8 square unit, then number of possibe position(s) of P is

A(1,2)and B(5,-2)are two points. P is a point moving in such a way that the area of the /_\ABP is 12 sq.units.Find the locus of P.

A and B are two fixed points on a plane and P moves on the plane in such a way that PA : PB = constant. Prove analytically that the locus of P is a circle.

S(sqrt(a^(2)-b^(2)),0)andS'(-sqrt(a^(2)-b^(2)),0) are two given points and P is a moving point in the xy - plane such that SP+S'P=2a . Find the equation to the locus of P.

A point moves in the xy - plane in such a way that its distances from the x-axes and the point (1,-2) are always equal . Find the eqution to its locus.

A(1,2) and B (5,-2) are two given point on the xy-plane, on which C is such a moving point, that the numerical value of the area of Delta CAB IS 12 square unit. Find the equation to the locus of C.

Let A(2,-3)andB(-2,1) be two angular points of DeltaABC . If the centroid of the triangle moves on the line 2x+3y=1 , then the locus of the angular point C is given by

A (3,0) and B(6,0) are two fixed points and P(x_(1),y_(1)) is a variable point of the plane. AP and BP meet the y-axis at the points C and D respectively. AD intersects OP at Q. Prove that line CQ always passes through the point (2,0).

Find the locus of a point P which moves in such a way that 2PA=3PB when A (1,-2,3) & B(2,1,4) are given points