A straight line L with negative slope passes through the point (8,2) and cuts the positive coordinate axes at points P and Q. Then the absolute minimum value of OP+OQ as L varies, [where O is the origin ] is 6n, then n=

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.

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 straight line passes through the points A(2, -3,-1) and B(8, -1,2). Find the coordinates of the points on this line at a distance of 7 units from A.

The area of the triangle formed by the line passing through the points (5, -3), (2, 6) with the coordinate axes 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

A line is drawn through the point (1,2) to meet the co-ordinate axes at P and Q such that it forms a Delta^(1e) OPQ, where O is the origin. If the area of the Delta OPQ, is least, then the slope of the line PQ is

A straight line through the point (h,k) where hgt0andkgt0 , makes positive intercepts on the coordinate axes . Then the minimum length of line intercepted between the coordinate axes is

If a line passing through the point P(1,1) makes an angle theta with the positive direction of x-axiss meets the coordinate axes at A and B such that AB=OP, O being the origin , then tantheta+cottheta =

Consider a variable line L which passes through the point of intersection P of the line 3x+4y-12=0 and x+2y-5=0 meetingt the coordinate axes at point A and B. Locus of the feet of the perpendicular from the origin on the variable line L has the equation