Let L be the line belonging to the family of straight lines `(a+2b)x+(a-3b)y+a-8b=0 a,b in R`, which is the farthest from the point (2,2)
Area enclosed by the line L and the coordinate axes is

Let L be the line belonging to the family of straight lines (a+2b)x+(a-3b)y+a-8b=0 a,b in R , which is the farthest from the point (2,2) The equation of line L is

Let L be the line belonging to the family of straight lines (a+2b)x+(a-3b)y+a-8b=0 a,b in R , which is the farthest from the point (2,2) If L is concurrent with lines x-2y+1=0 and 3x-4y+lambda =0 , then the value of lambda is

Find the area of the Delta le formed by the straight line 2x+y=2 and the coordinate axes using integration.

The point of concurrence of the lines (2a+5b)x+(3a-2b)y-5a-3b=0 is

The point of concurrence of the lines (a+2b)x+(a-b)y+(a+5b)=0 is

A straight line L is perpendicular to the line 5x-y=1 . The area of the triangle formed by the line L and coordinate axes is 5. The equation of the line L is