Let `A=(4, 0), B=(0, 12)` be two points in the plane. The locus of a point C such that the area of triangle ABC is 18 sq. units is -

In Fig.3, the area of triangle ABC( in sq.units ) is :

Let O(0, 0) and (0, 1) be two fixed points, then the locus of a point P such that the perimeter of DeltaAOP is 4, is

A (5, 3) and B (3, -2) are two fixed points. Find the equation of locus of P, so that the area of triangle PAB is 9 sq. Units.

Let O(0,0) and A(0,1) be two fixed points.Then the locus of a point P such that the perimeter of Delta AOP is 4, is

If A(-1,1) and B(2,3) are two fixed points, find the locus of a point P so that the area of PAB=8sq units.

Let A(a, 0), B(b, 2b +1) and C(0, b), b ne 0, |b| ne 1, be points such that the area of triangle ABC is 1 sq. unit, then the sum of all possible values of a is :

Let BC be a fixed line segment in the plane . The locus of a point A such that the triangle ABC is isosceles , is (with finitely many possible exceptional points )

A(0,0),B(1,2) are two points.If a point P moves such that te area of Delta PAB is 2sq . units then the locus of P is