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

A variable line passing through a fixed point (alpha,beta) intersects the coordinate axes at A and B. If O is the origin, then the locus of the centroid of the DeltaOAB is

A strainght line L with negative slope passes through the point (1,1) and cuts the positve coordinates axes at the points A and B . If O is the origin , thene the minimum value of OA+OB as L varies , is

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 vertical line passing through (a,4) cuts the curve y^2=4ax at A,B. If the angle subteded by AB at origin is theta, " then " tan theta =

A line is at a constant distance c from the origin and meets the coordinate axes at A and B. The locus of the centre of the circle passing through, A, B, is

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 line is drawn through the point (1,2) to meet the coordinate axes at P and Q such that it forms a triangle OPQ, where O is the origin . If the area of the triangle OPQ is least, then the slope of the line PQ is