A line is drawn passing through point P(1,2) to cut positive coordinate axes at A and B . Find minimum area of `DeltaPAB`.

A straight line L with negative slope passes through the point (8,2) and cuts positive co-ordinate axes at the points P and Q. Find the minimum value of OP+OQ as L varies where O is the origin.

Let (h,k) be a fixed point,where h>0,k>0. A straight line passing through this point cuts the positive direction of the coordinate axes at the point P and Q. Find the minimum area of triangle OPQ,O being the origin.

Let (h , k) be a fixed point, where h >0,k > 0. A straight line passing through this point cuts the positive direction of the coordinate axes at the point Pa n dQ . Find the minimum area of triangle O P Q ,O being the origin.

Let (h,k) be a fixed point where hgt0,kgt0 . A straight line passing through this point cuts the positive directions of the coordinate axes at the points P and Q . Find the minimum area of the triangle OPQ , O being the origin.

Let (h , k) be a fixed point, where h >0,k > 0. A straight line passing through this point cuts the positive direction of the coordinate axes at the point Pa n dQ . Find the minimum area of triangle O P Q ,O being the origin.

Let (h , k) be a fixed point, where h >0,k > 0. A straight line passing through this point cuts the positive direction of the coordinate axes at the point Pa n dQ . Find the minimum area of triangle O P Q ,O being the origin.

Let (h , k) be a fixed point, where h >0,k > 0. A straight line passing through this point cuts the positive direction of the coordinate axes at the point Pa n dQ . Find the minimum area of triangle O P Q ,O being the origin.

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