The distance between the line : `vecr.=2hati-2hatj+3hatk+lambda(hati-hatj-4hatk)` and the plane `vecr.(hati+5hatj+hatk)=5` is :

Find the distance between the lines vecr=hati+2hatj-4hatk+lambda(2hati+3hatj+6hatk) and vecr=3hati+3hatj-5hatk+mu(2hati+3hattj+6hatk) .

Find the shortest distance betweenn the lines. vecr=hati+hatj+lamda(2hati-hatj+hatk) vecr=2hati+hatj-hatk+mu(3hati-5hatj+2hatk) .

Find the angle between the pair of lines given by vecr = 2hati - 5hatj + hatk + lambda (3hati +2hatj+6hatk) and vecr =7hati - 6hatk + mu(hati +2hatj + 2hatk)

If a=2hati-hatj+2hatk and b=-hati+hatj-hatk , then find a+b.

The angle between the vector hati - hatj and hatj - hatk is :

Find the angle between the pair of lines given by vecr=2hati-5hatj+hatk+lambda(3hati+2hatj+6hatk), vecr=7hati-6hatk+mu(hati+2hatj+2hatk)

Find the angle between the planes whose vector equations are vecr.(2hati+2hatj-3hatk)=5 and vecr.(3hati-3hatj+5hatk)=3

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