Find the angle between the lines whose direction cosines are `(-(sqrt3)/(4), (1)/(4), -(sqrt3)/(2)) and (-(sqrt3)/(4), (1)/(4), (sqrt3)/(2))`.

Find the angle between the lines y- sqrt(3) x - 5 = 0 and sqrt(3) y - x+6=0 .

Find the angles of the triangle whose sides are 3+ sqrt3, 2sqrt3 and sqrt6.

Find angles between the lines sqrt(3) x +y=1 and x+ sqrt(3) y=1 .

Find angles between the lines sqrt3x + y = 1 " and " x + sqrt3y = 1 .

4^(5 log_(4sqrt(2)) (3-sqrt(6)) - 6 log_8(sqrt(3)-sqrt(2)))

Simplify : (5+sqrt3)/(7- 4sqrt3) -(5-sqrt3)/( 7+4sqrt3)

Find angle between the lines y - sqrt3x - 5 0 " and " sqrt3 y - x +6 = 0 .

Statement-1 A line L is perpendicular to the plane 3x-4y+5z=10 . Statement-2 Direction cosines of L be lt(3)/(5sqrt(2)), -(4)/(5sqrt(2)), (1)/(sqrt(2))gt

Find the values of the followings : sin^(-1)(1/sqrt2)-3"sin"^(-1)sqrt3/2

Find the values of the followings : sin^(-1)(-1/2)+cos^(-1)(-sqrt3/2)