Find the magnitude of projection of vect...

Find the magnitude of projection of vector `2i+3j+k`, on a vactor which is perpendicular to the plane containing vectors `i+j+k` and `i+2j+3k` (A) `(sqrt(3))/(sqrt(2))` (B) `(sqrt(2))/(sqrt(3))` (C) `(4)/(sqrt(3))` (D) `(2sqrt(2))/(sqrt(3))`

Similar Questions

Explore conceptually related problems

Find vectors perpendicular to the plane of vectors a=2i-6j+3k" and "b=4i+3j+k .

A unit vector perpendicular to the plane of a = 2i - 6j -3k, b = 4i + 3j - k is

What is the magnitude of the vector 2 hat i -3 hat j + sqrt3 hat k ?

Find all vectors of magnitude 10 sqrt 3 that are perpendicular to the plane of vectors vec a=hat i+2 hat j+hat k and vec b=-hat i+3 hat j+4 hat k .

The vectors 2i - 3j + k, I - 2j + 3k, 3i + j - 2k

Distance between line r=i+j+k+lambda(2i+j+4k) and plane ri+2j-k=3 is (1)(4)/(sqrt(6))(2)(5)/(sqrt(6))(3)(1)/(sqrt(6))(4) 0(5) (2)/(sqrt(6))

The projection of the vector 2i + aj - k on the vector i - 2j + k is (-5)/(sqrt(6)) . Then, the value of a is equal to

A vector perpendicular to the vector (i + 2j) and having magnitude 3 sqrt5 units is