If the line `(x+1)/(2) = (y+1)/(3) = (z+1)/(4)` meets the plane `x + 2y + 3z = 14` at P, then the distance between P and the origin is
a)`sqrt(14)` b)`sqrt(15)`c)`sqrt(13)`d)`sqrt(12)`

Let P (1, 2, 3) and Q (-1, -2, -3) be the two points and let O be the origin. Then, |PQ+OP| is equal to a) sqrt(13) b) sqrt(14) c) sqrt(24) d) sqrt(12)

If the angle theta between the line (x+1)/(1) = (y-1)/(2) = (z-2)/(2) and the plane 2x -y + sqrt(p)z + 4=0 is such that sin theta = (1)/(3) , then the value of p is a)0 b)1/3 c)2/3 d)5/3

The angle between the line (x-3)/2=(y-1)/1=(z+4)/(-2) and the plane, x+y+z+5=0 is :

The area bounded by the curves y = - x^(2) + 3 and y = 0 is a) sqrt(3)+1 b) sqrt(3) c) 4sqrt(3) d) 5sqrt(3)

The distance between the directrices of the hyperbola x^(2)-y^(2)=9 is a) 9/(sqrt(2)) b) 5/(sqrt(3)) c) 3/(sqrt(2)) d) 3sqrt(2)

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