Let 2a+2b+c=0, l(1) and l(2) are straigh...

Let `2a+2b+c=0, l_(1) and l_(2)` are straight lines of the family `ax+by+c=0` which are at 1 unit distance from the point (1, 1), then the area (in sq. units) bounded by `l_(1), l_(2)` and coordinate axes is

Similar Questions

Explore conceptually related problems

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 farthest from the point (2,2,2, then 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 farthest from the point (2, 2), then area enclosed by the line L and the coordinate axes is

Let L_(1)=0and L_(2) =0 be two intarecting straight lines. Then the number of points, whose distacne from L_(1) is 2 units and from L_(2) 2 units 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) Area enclosed by the line L and the coordinate axes is

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

Let `2a+2b+c=0, l_(1) and l_(2)` are straight lines of the family `ax+by+c=0` which are at 1 unit distance from the point (1, 1), then the area (in sq. units) bounded by `l_(1), l_(2)` and coordinate axes is

Similar Questions

Recommended Questions