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

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

A line passing through P(4,2) meet the X and Y -axes at A and B, respectively.If O is the origin,then locus of the centre of the circumference of triangle OAB is

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

The line x+y=a meets the axes of x and y at A and B respectively. A triangle AMN is inscribed in the triangle OAB , O being the origin, with right angle at N, M and N lie respectively on OB and AB. If the area of the triangle AMN is 3/8 of the area of the triangle OAB , then (AN)/(BM) is equal to:

If a straight line I passing through P(3,4) meets positive co-ordinate axes at A &B such that area of triangle OAB is minimum (where O is origin) then slope of I is

Find the equation of the line which passes through P(1,-7) and meets the axes at A and B respectively so that 4AP-3BP=0.

A straight line with negative slope passing through the point (1,4) meets the coordinate axes at A and B.The minimum value of OA+OB is equal to

A variable line through the point P(2,1) meets the axes at A and B .Find the locus of the centroid of triangle OAB (where O is the origin).

A variable line through point P(2,1) meets the axes at A and B. Find the locus of the circumcenter of triangle OAB (where O is the origin.