Let O be the origin, and let A (1, 0), B (0, 1) be two points. If P (x, y) is a point such that `xygt0` and `x+ylt1` then:

A(1, 0), B(0, 1) are two points. If P(x, y) is a point such that xy gt 0 and x+y lt 1 then

A(-9, 0) and B(-1, 0) are two points. If P(x, y) is a point such that 3PB = PA , then the locus of P is

Let O be the origin. If A(1,0)a n dB(0,1)a n dP(x , y) are points such that x y >0a n dx+y<1, then (a) P lies either inside the triangle O A B or in the third quadrant. (b) P cannot lie inside the triangle O A B (c) P lies inside the triangle O A B (d) P lies in the first quadrant only

Let O be the origin. If A(1,0)a n dB(0,1)a n dP(x , y) are points such that x y >0a n dx+y<1, then (a) P lies either inside the triangle O A B or in the third quadrant. (b) P cannot lie inside the triangle O A B (c) P lies inside the triangle O A B (d) P lies in the first quadrant only

Let O be the origin. If A(1,0)a n dB(0,1)a n dP(x , y) are points such that x y >0a n dx+y<1, then P

Let O be the origin. If A(1,0)a n dB(0,1)a n dP(x , y) are points such that x y >0a n dx+y<1, then P

A=(-9,0) and B=(-1,0) are two points. If P(x, y) is a point such that 3 P B=P A , then the locus of P is

Let O be the origin. If A(1,0) and B(0,1) and P(x , y) are points such that x y >0 and x+y P lies either inside the triangle O A B or in the third quadrant. P cannot lie inside the triangle O A B P lies inside the triangle O A B P lies in the first quadrant only

Let O be the origin. If A(1,0)a n dB(0,1)a n dP(x , y) are points such that x y >0a n dx+y<1, then (a) P lies either inside the triangle O A B or in the third quadrant. (b) P cannot lie inside the triangle O A B (c) P lies inside the triangle O A B (d) P lies in the first quadrant only

Let O be the origin and A be the point (64,0). If P, Q divide OA in the ratio 1:2:3, then the point P is