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

The line joining the points A(2,1),a n dB(3,2) is perpendicular to the line (a^2)x+(a+2)y+2=0. Find the values of adot

Let (x,y) be any point on the parabola y^(2)=4x. Let P be the point that divides the line segment from (0,0) and (x,y) n the ratio 1:3. Then the locus of P is :

Let m and n bwe positive integers and x,y gt 0 and x+y =k, where k is constnat. Let f (x,y) = x ^(m)y ^(n), then:

Consider the set A_(n) of point (x,y) such that 0 le x le n, 0 le y le n where n,x,y are integers. Let S_(n) be the set of all lines passing through at least two distinct points from A_(n) . Suppose we choose a line l at random from S_(n) . Let P_(n) be the probability that l is tangent to the circle x^(2)+y^(2)=n^(2)(1+(1-(1)/(sqrt(n)))^(2)) . Then the limit lim_(n to oo)P_(n) is

Two straight lines u=0a n dv=0 pass through the origin and the angle between them is tan^(-1)(7/9) . If the ratio of the slope of v=0 and u=0 is 9/2 , then their equations are (a) y+3x=0a n d3y+2x=0 (b)2y+3x=0a n d3y+2x=0 (c)2y=3xa n d3y=x (d) y=3xa n d3y=2x

If the coordinates (x, y, z) of the point S which is equidistant from the points O(0, 0, 0), A(n^(5), 0, 0), B(0, n^(4), 0), C(0, 0, n) obey the relation 2(x+y+z)+1=0 . If ninZ , then |n|= _____( |*| is the mudulus function).