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`

Direction cosines of the line (x+3)/(-2)=(y-5)/(4)=(z+6)/(-2) are :

Direction cosines of the line (x+2)/2=(y-5)/4=(z+6)/2 are

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 direction cosines of the line : (2x+5)/2=(3-2y)/3=(3z+1)/4

A tangent PT is drawn to the circle x^2 + y^2= 4 at the point P(sqrt3,1) . A straight line L is perpendicular to PT is a tangent to the circle (x-3)^2 + y^2 = 1 Common tangent of two circle is: (A) x=4 (B) y=2 (C) x+(sqrt3)y=4 (D) x+2(sqrt2)y=6

Find the direction cosine of a line parallel to the line (2x-5)/(4)=(y+4)/(3)=(6-z)/(6)

Rationalise: (5sqrt3-4sqrt2)/(4sqrt3+3sqrt2)

If the line 2x+sqrt(6)y=2 touches the hyperbola x^2-2y^2=4 , then the point of contact is (-2,sqrt(6)) (b) (-5,2sqrt(6)) (1/2,1/(sqrt(6))) (d) (4,-sqrt(6))

The distance of the point (1,-5,""9) from the plane x-y+z=5 measured along the line x=y=z is : (1) 3sqrt(10) (2) 10sqrt(3) (3) (10)/(sqrt(3)) (4) (20)/3

Simplify the following 1/(2+sqrt3)+2/(sqrt5-sqrt3)+1/(2-sqrt5)