Let vector be the `2hat(i)+hat(j)-hat(k)` then find the unit vector in the direction of a vector

For given vectors , a=2hat(i)-j+2hat(k) and b=-hat(i)+j-hat(k) , find the unit vector in the direction of the vector vec(a)+vec(b) .

let vec a= ( hat i+ hat j+ hat k) then find the unit vector along this vector

If vec a=6hat(i)+7hat(j)+7hat(k) , find the unit vector along with this vector

If vec(p)=hat(i)+hat(j), vec(q)=4hat(k)-hat(j) and vec(r )=hat(i)+hat(k) then the unit vector in the direction of 3vec(p)+vec(q)-2vec(r ) is

The scalar product of the vector vec(a) = hat(i) + hat(j) + hat(k) with a unit vector along the sum of vectors vec(b) = 2hat(i) + 4hat(j) - 5hat(k) and vec(c ) = lambda hat(i) + 2hat(j) + 3hat(k) is equal to one. Find the value of lambda and hence find the unit vector along vec(b) + vec(c ) .

Find the unit vector in the direction of vector vec(a)=2hat(i)+3hat(j)+hat(k)

Let vec(a) =hat(i) +2hat(j) +hat(k),vec(b) =hat(i) -hat(j) +hat(k) and vec(c ) =hat(i) +hat(j) -hat(k) , vector in the plane of vec(a) and vec(b) whose projection on vec(c ) is 1/(sqrt(3)) is ______.

Given two vectors hat i-hatj and hat i +2 hatj the unit vector coplanar with the two given vectors and perpendicular to (hati-hatj) is