A line with direction ratio `(2,1,2)` intersects the lines `vecr=-hatj+lambda(hati+hatj+hatk)` and `vecr=-hati+mu(2hati+hatj+hatk)` at A and B, respectively then length of AB is equal to

The lines vecr=(hati+hatj)+lamda(hati+hatk)andvecr=(hati+hatj)+mu(-hati+hatj-hatk) are

Find the shrotest distance between the lines vecr = hati+hatj+ lambda(2hati-hatj+hatk) and vecr= 2hati+hatj-hatk+mu(2hati-hatj+hatk) .

Find the angle between the lines vecr = (hati+hatj)+lambda (hati+hatj+hatk)and vecr=(2hati-hatj)+t(2hati+3hatj+hatk)

Find the angle between the line: vecr=4hati-hatj+lamda(hati+2hatj-2hatk) and vevr=hati-hatj+2hatk-mu(2hati+4hatj-4hatk)

Find the angle between the line vecr = (hati +2hatj -hatk ) +lambda (hati - hatj +hatk) and vecr cdot (2hati - hatj +hatk) = 4.

Find the vector equation of the plane in which the lines vecr=hati+hatj+lambda(hati+2hatj-hatk) and vecr=(hati+hatj)+mu(-hati+hatj-2hatk) lie.

From a point A with positon vector p(hati+hatj+hatk),AB and AC are drawn perpendicular to the lines vecr=hatk+lamda(hati+hatj) an vecr=-hatk+mu(hati-hatj) , respectively. A value of p is equal to

which of the following point lies on plane contaning lines vecr=hati+lambda(hati+hatj+hatk) and vecr = -hatj+mu(-hati-2hatj+hatk)