Two adjacent sides of a parallelogram are respectively by the two vectors `hat(i)+2hat(j)+3hat(k)` and `3hat(i)-2hat(j)+hat(k)`. What is the area of parallelogram?

Two adjacent sides of a parallelogram are represented by the two vectors hat(i) + 2hat(j) + 3hat(k) and 3hat(i) - 2hat(j) + hat(k). What is the area of parallelogram?

The two vectors A=2hat(i)+hat(j)+3hat(k) and B=7hat(i)-5hat(j)-3hat(k) are :-

The sides of a parallelogram represented by vectors p = 5hat(i) - 4hat(j) + 3hat(k) and q = 3hat(i) + 2hat(j) - hat(k) . Then the area of the parallelogram is :

The sides of a parallelogram represented by vectors p = 5hat(i) - 4hat(j) + 3hat(k) and q = 3hat(i) + 2hat(j) - hat(k) . Then the area of the parallelogram is :

The diagonals of a parallelogram are given by the vectors (3 hat(i) + hat(j) + 2hat(k)) and ( hat(i) - 3hat(j) + 4hat(k)) in m . Find the area of the parallelogram .

The area of the parallelogram whose sides are represented by the vector hat(j)+3hat(k) and hat(i)+2hat(j)-hat(k) is

The Area of the Parallelogram determined by the vectors hat(i) + 2hat(j) + 3hat(k), -3hat(i) -2hat(j) + hat(k) (in sq. unit) is

The adjacent sides of a parallelogram is represented by vectors 2hat(i)+3 hat(j) and hat(i) +4 hat(j) . The area of the parallelogram is :