[" 196.The straight line "x+2y=1" meets the coordinate axes at "A],[" and "B" .A circle is drawn through "A,B" and the origin.Then "],[" the sum of perpendicular distances from "A" and "B" on the "],[" tangent to the circle at the origin is "]

A straight line x+2y=1 cuts the x and y axis at A and B.A circle passes through point A and B and origin.Then the sum of length of perpendicular from A and B on tangent of the circle at the origin is

The line 3x+4y-12=0 meets the coordinate axes at A and B. find the equation of the circle drawn on AB as diameter.

The line 5x+3y-15=0 meets the coordinate axes at A and B. Find the equation of the circle drawn on AB as diameter.

A line 2x + y = 1 intersect co-ordinate axis at points A and B . A circle is drawn passing through origin and point A & B . If perpendicular from point A and B are drawn on tangent to the circle at origin then sum of perpendicular distance is (A) 5/sqrt2 (B) sqrt5/2 (C) sqrt5/4 (D) 5/2

A line 2x + y = 1 intersect co-ordinate axis at points A and B . A circle is drawn passing through origin and point A & B . If perpendicular from point A and B are drawn on tangent to the circle at origin then sum of perpendicular distance is (A) 5/sqrt2 (B) sqrt5/2 (C) sqrt5/4 (D) 5/2

A line 2x + y = 1 intersect co-ordinate axis at points A and B . A circle is drawn passing through origin and point A & B . If perpendicular from point A and B are drawn on tangent to the circle at origin then sum of perpendicular distance is (A) 5/sqrt2 (B) sqrt5/2 (C) sqrt5/4 (D) 5/2

The straight line (x)/(a)+(y)/(b)=1 cuts the coordinate axes at A and B .Find the equation of the circle passing through O(0,0),A and B.

A line 2x+y=1 intersect co-ordinate axis at points A and B. A circle is drawn passing through origin and point A o* B. If perpendicular from point A and B are drawn on tangent to the circle at origin then sum of perpendicular distance is (A) (5)/(sqrt(2))(B)(sqrt(5))/(2) (C) (sqrt(5))/(4) (D) (5)/(2)

A circle with centre (a,b) passes through the origin. The equation of the tangent to the circle at the origin is