A line passing through (3,4) meets the axes `bar(OX) and bar(OY)` at A and B respectively. The minimum area of triangle OAB in square units is

A straight line through the point (3,4) in the first quadrant meets the axes at A and B . The minimum area of the triangle OAB is

A line passing through P(4,2) cuts the coordinate axes at A and B respectively. If O Is the origin, then the locus of the centre of the circum-circle of Delta OAB is

The line x+y=p meets the x-and y-axes at A and B, respectively. A triangle APQ is inscribed in triangle OAB, O being with right at Q.P and Q lie, respectivley, on OB and AB. If the area of triangle APQ is 3//8 th of the area of triangle OAB, then AQ/BQ is equal to

A circle of constant radius 3k passes through (0,0) and cuts the axes in A and B then the locus of centroid of triangle OAB is

The line 6x+8y=48 intersect the coodinate axes at A and B respectively. A line L bisects the area and perimeter of triangle OAB where 'O' is origin The number of possible such lines is

A ray makes angles pi//3, pi//3 with bar(OX) and bar(OY) respectively. Find the angle made by it with bar(OZ)

A circle passes through origin and meets the axes at A and B so that (2,3) lies on bar(AB) then the locus of centroid of DeltaOAB is

A straight line meets the coordinates axes at A and B, so that the centroid of the triangle OAB is (1, 2). Then the equation of the line AB is