Consider the parallelepiped with adjacent edges u=6i+3j+k v=i+j+6k w=i+5j+4k Find the volume. V=

If u→= (9i+5j+6k), v→= (5i-3j+7k), and w→= (8i+2j+4k), what is the area of the parralelogram determined...

If u→= (9i+5j+6k), v→= (5i-3j+7k), and w→= (8i+2j+4k), what is the area of the parralelogram determined by (9i+5j+6k) and (5i−3j+7k)? What is the volume of the parallelepiped determined by \) (9i+5j+6k), , (5i-3j+7k), and (8i+2j+4k), \)?

Letu=2i−3j+k,v=i+4j−k,andw=j+k. (a) Find u × v and v × u, and show that each of those...

Letu=2i−3j+k,v=i+4j−k,andw=j+k. (a) Find u × v and v × u, and show that each of those vectors is orthogonal to both u and v. (b) Find the area of the parallelogram that has u and v as adjacent sides. (c) Use the triple scalar product to find the volume of the parallelepiped having adjacent edges u, v, and w.

u = 2i − j + k v = 3j − 4k w = −5i +...

u = 2i − j + k v = 3j − 4k w = −5i + 7k                                                                                                                                                       Find the volume of the parallel face determined by the vectors.

Find the volume of the parallelepiped with adjacent edges PQ, PR, and PS. P(−2, 1, 0),...

Find the volume of the parallelepiped with adjacent edges PQ, PR, and PS. P(−2, 1, 0), Q(3, 3, 3), R(1, 4, −1), S(3, 6, 2)

Let vector u= 5i+3j+8k and vector v= i-j+2k Find the component of v parallel to u...

Let vector u= 5i+3j+8k and vector v= i-j+2k Find the component of v parallel to u and the component of v perpendicular to u find a unit vector perpendicular to both u and v

Find the volume of the parallelepiped with adjacent edges PQ, PR, PS. P(3, 0, 3),    Q(−1, 2,...

Find the volume of the parallelepiped with adjacent edges PQ, PR, PS. P(3, 0, 3),    Q(−1, 2, 8),    R(6, 1, 1),    S(2, 6, 6)

Find the projection of u = −i + j + k onto v = 2i +...

Find the projection of u = −i + j + k onto v = 2i + j − 7k.

Find the fundamental vector product. 1. r(u, v) = (u 2 − v 2 ) i...

Find the fundamental vector product. 1. r(u, v) = (u 2 − v 2 ) i + (u 2 + v 2 ) j + 2uv k. 2. r(u, v) = u cos v i + u sin v j + k.

Find an equation of the tangent plane to the parametric surface r=(u,v)=ucosv I +usinv j +vk...

Find an equation of the tangent plane to the parametric surface r=(u,v)=ucosv I +usinv j +vk at u=1, v=pi/3 Find the surface area of the parametric surface r(u,v)=5sinucosv I + 5sinusinv j+ 5cosu k, for 0 ,<= u <=pi and o<=v<= 2pi

Find the volume of the box generated by the vectors: i, j + k,    and...

Find the volume of the box generated by the vectors: i, j + k,    and    i + 2j + k. Please show all work and do not use cursive. Thank you for your help!