The angle between the line `r = (i + 2j + 3k) + lambda (2i + 3j + 4k)` and the plane `r.(i + 2j -2k) = 0` is a)`0^(@)` b)`60^(@)` c)`30^(@)` d)`90^(@)`

The angle between the vectors i+j and j+k is

Find the distance between the line barr=i+j+lambda(2i+j+4k) and the plane barr.(-2i+k)=5 .

The distance between the planes r. (i+ 2j - 2k ) + 5 =0 and r. (2i + 4j - 4k ) - 16 =0 is

The lines r = i + j - k + lambda (3i - j) and r = 4i - k + mu (2i + 3k) intersect at the point

The distance between the line vec(r) = (2hat(i) + 2hat(j) - hat(k)) + lambda(2hat(i) + hat(j) - 2hat(k)) and the plane vec(r).(hat(i) + 2hat(j) + 2hat(k)) = 10 is equal to

Find the angle between the vectors veca=3i+4j+k and vecb=2i+3j-k .

Show that the line barr=i+j+lambda(2i+j+4k) is parallel to the plane barr.(-2i+k)=5 .

Find the angle between the pair lines barr=2i-5j+k+lambda(3i+2j+6k) and barr=7i-6k+mu(i+2j+2k)

Find the shortest distance between the lines barr=(2i-j-k)+lambda(3i-5j+2k) and barr=(i+2j+k)+mu(i-j+k)

Find the shortest distance between the lines barr=i+2j+3k+lambda(i+j+k) and barr=i+j+k+mu(i+j+k)