The area of a triangle formed by the sides of vector `vec(A)and vec(B)` is

Find the area of the triangle formed by the tips of the vectors vec(a) = hati - hatj - 3hatk, vec(b) = 4hati - 3hatj +hatk and vec(c) = 3 hati - hatj +2 hatk .

Find the area of the triangle formed by the tips of the vectors vec(a) = hati - hatj - 3hatk, vec(b) = 4hati - 3hatj +hatk and vec(c) = 3 hati - hatj +2 hatk .

If vec(a)=2hati+hatj+x hatk and vec(b)=hati+hatj-hatk then the minimum area of a parallelogram formed by the vectors vec(a) and vec(b) is ………….

The vector area of the triangle formed by the points vec(i) -vec(j) + vec(k), 2vec(i) + vec(j) -2vec(k) and 3vec(i) + vec(j) + 2vec(k) is

If vec(a) = hat(i) + 2hat(j) +2hat(k) , |vec(b)| = 5 and the angle between vec(a) and vec(b) is pi/6 , then the area of the triangle formed by these two vectors as two sides is

Let vec a , vec b and vec c be unit vectors such that vec a+ vec b- vec c=0. If the area of triangle formed by vectors vec a and vec b is A , then what is the value of 4A^2?

Let vec a , vec b and vec c be unit vectors such that vec a+ vec b- vec c=0. If the area of triangle formed by vectors vec a and vec b is A , then what is the value of 4A^2?

Let vec a,vec b and vec c be unit vectors such that vec a+vec b-vec c=0. If the area of triangle formed by vectors vec a and vec b is A, then what is the value of 4A^(2)?

Let vec a , vec b and vec c be unit vectors such that vec a+ vec b- vec c=0. If the area of triangle formed by vectors vec a and vec b is A , then what is the value of 4A^2?

Let vec a , vec b and vec c be unit vectors such that vec a+ vec b- vec c=0. If the area of triangle formed by vectors vec a and vec b is A , then what is the value of 4A^2?