The radius of the circle touching the straight lines `x-2y-1=0 and 3x-6y+7=0` is (A) `1/sqrt(2)` (B) `sqrt(5)/3` (C) `sqrt(3)` (D) `sqrt(5)`

The angle between the straight lines x -y sqrt3=5 and sqrt3x +y =7 is

The distance between the parallel lnes y=2x+4 and 6x-3y-5 is (A) 1 (B) 17/sqrt(3) (C) 7sqrt(5)/15 (D) 3sqrt(5)/15

sqrt(2)x + sqrt(3)y=0 sqrt(5)x - sqrt(2)y=0

The shortest distance between the line yx=1 and the curve x=y^(2) is (A)(3sqrt(2))/(8) (B) (2sqrt(3))/(8) (C) (3sqrt(2))/(5) (D) (sqrt(3))/(4)

If the area of the triangle formed by the lines x=0,y=0,3x+4y-a(a>0) is 1, then a=(A)sqrt(6)(B)2sqrt(6)(C)4sqrt(6)(D)6sqrt(2)

The angle between the lines sqrt(3)x-y-2=0 and x-sqrt(3)y+1=0 is

sqrt (2x) -sqrt (3y) = 0sqrt (3x) -sqrt (3y) = 0

The equaiton of the line which bisects the obtuse angle between the lines x-2y+4=0 and 4x-3y+2=0 (A) (4-sqrt(5))x-(3-2(sqrt(5)) y+ (2-4sqrt(5))=0 (B) (3-2sqrt(5)) x- (4-sqrt(5))y+ (2+4(sqrt(5))=0 (C) (4+sqrt(5)x-(3+2(sqrt(5))y+ (2+4(sqrt(5))=0 (D) none of these

(2)/(sqrt(3)+sqrt(5))+(5)/(sqrt(3)-sqrt(5))=x sqrt(3)+y sqrt(5)