Home
Class 12
MATHS
The angle between lines joining the orig...

The angle between lines joining the origin to the points of intersection of the line `sqrt3 x + y =2` and the curve `y^2 -x^2 = 4` is equal to (A) `tan^-1(2/sqrt3)` (B) `pi/6` (C) `tan^-1(sqrt3/2)` (D) `pi/2`

Promotional Banner

Similar Questions

Explore conceptually related problems

The angle between the lines joining the origin to the points of intersection of the line sqrt3x+y=2 and the curve y^(2)-x^(2)=4 is

The angle between the lines joining the origin to the points of intersection of the line sqrt3x+y=2 and the curve y^(2)-x^(2)=4 is

The angle between the lines joining the origin to the points of intersection of the line sqrt3x+y=2 and the curve y^(2)-x^(2)=4 is

The angle between lines joining the origin to the points of intersection of the line sqrt(3)x+y=2 and the curve y^(2)-x^(2)=4 is equal to (A)tan^(-1)((2)/(sqrt(3)))(B)(pi)/(6)(C)tan^(-1)((sqrt(3))/(2))(D)(pi)/(2)

The angle between the lines joining origin to the points of intersection of the line sqrt(3)x+y=2 and the curve y^2-x^2=4 is (A) tan^(-1)(2/(sqrt(3))) (B) pi/6 (C) tan^(-1)((sqrt(3))/2) (D) pi/2

The angle between the lines joining origin to the points of intersection of the line sqrt(3)x+y=2 and the curve y^2-x^2=4 is (A) tan^(-1)(2/(sqrt(3))) (B) pi/6 (C) tan^(-1)((sqrt(3))/2) (D) pi/2