The coordinates of the point P on the line `vecr =(hati +hatj +hatk)+lambda (-hati +hatj -hatk)` which is nearest to the origin is

Find the position vector of the point where the line vec r = hati - hatj +hatk + t (hati + hatj -hatk ) meets the plane vecr. (hati + hatj + hatk ) =5

Show that the vectors 2 hati-3 hatj+4 hatk and -4 hati + 6 hatj-8 hatk are collinear.

The distance of the point (4, 2, 3) from the plane vecr.(6hati+2hatj-9hatk)=46 is

Find the angle between the vectors hati-2 hatj+3 hatk and 3 hati-2 hatj+hatk

Find the distance of the point (-1,-5,-10) from the point of intersecțion of the line vecr=(2 hati-hatj+2 hatk)+lambda(3 hati+4 hatj+ 2 hatk) and the plane vecr .(hati-hatj+hatk)=5

Find the equation of the plane which contains the line of intersection of the planes vecr .(hati+2 hatj+3 hatk)-4 =0 , vecr .(2 hati+hatj-hatk)+5=0 and which is perpendicular to the plane vecr .(5 hati+3 hatj-6 hatk)+8=0

The values of a so that the vectors a hati +(a-1) hatj + 3hatk and (a+2) hati +a hatj -2hatk are perpendicular are