The direction ratios of the diagonal of a cube which joins the origin to the opposite corner are (where the three concurrent edges of the cube are coordinate axes): a)`(2)/(sqrt(3)),(2)/(sqrt(3)),(1)/(sqrt(3))` b)`1,1,1` c)`2,-2,1` d)`1,2,3`

Simplify: 5sqrt(3)+2sqrt(27)+1/(sqrt(3))

Simplify: 2sqrt(48)-sqrt(75)-1/(sqrt(3))

Simplify : 5sqrt(3)+2sqrt(27)+1/sqrt(3)

Simplify : 2sqrt(48)-sqrt(75)-1/sqrt(3)

The direction cosines of a line which is perpendicular to both the lines whose direction ratios are 1,-1,0 and 2,-1,1 are: a) -1,-1,1 b) (-1)/(sqrt(3)),(-1)/(sqrt(3)),(1)/(sqrt(3)) c) 1,-1,-1 d) (1)/(sqrt(3)),(-1)/(sqrt(3)),(-1)/(sqrt(3))

If O is the origin, O P=3 with direction ratios -1,2,a n d-2, then find the coordinates of Pdot

Find the direction cosines of the line which is perpendicular to the lines with direction ratios 4, 1, 3 and 2, -3, 1 . a) (1)/(sqrt(3)),(1)/(5sqrt(3)),(-7)/(5sqrt(3)) b) (5)/(sqrt(3)),(1)/(sqrt(3)),(7)/(5) c) (2)/(sqrt(3)),(5)/(2sqrt(3)),(1)/(7sqrt(3)) d) (1)/(sqrt(3)),(2)/(sqrt(3)),(-1)/(sqrt(3))

Rationalize the denominator: 1/(sqrt(3)-sqrt(2))

The sum of the direction cosines of a line which makes equal angles with the positive direction of co-ordinate axes is: a) 3 b) 1 c) sqrt3 d) 3/sqrt2