Question

How do you find a unit vector orthogonal to both vectors (1, -3, 2) and (-1, 2, 3)?

Answer 1

`"The Reqd. Unit Vector="1/sqrt195(-13,-5,-1).`

Explanation:

We know from Vector Geometry that `vecx xx vecy` is a vector

which is orthogonal to both `vecx and vecy.`

The desired Unit Vector , then, can be obtained as

`(vecx xx vecy)/||vecx xx vecy||`

`"Now, "(1,-3,2) xx (-1,2,3)=|(i,j,k),(1,-3,2),(-1,2,3)|`

`=(-13,-5,-1)," so that, "||((-13,-5,-1))||=sqrt195`

`"Therefore, the Reqd. Unit Vector="1/sqrt195(-13,-5,-1).`