2. a. Given u = (9,7) and v = (2,3), find the projection of u onto...

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

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

U= [2,-5,-1] V=[3,2,-3] Find the orthogonal projection of u onto v. Then write u as the...

U= [2,-5,-1] V=[3,2,-3] Find the orthogonal projection of u onto v. Then write u as the sum of two orthogonal vectors, one in span{U} and one orthogonal to U

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.

1) For vectors a and b find the projection of a on b. a =< 4,...

1) For vectors a and b find the projection of a on b. a =< 4, −3 >,b =< 3, 2 > 2) Find the area of the parallelogram with adjacent sides a = i + j and b = i + k 3) Find the unit tangent T for the following curve r =< 2 cos t^2 , 2 sin t^2 >

Find the orthogonal projection of u onto the subspace of R4 spanned by the vectors v1,...

Find the orthogonal projection of u onto the subspace of R4 spanned by the vectors v1, v2 and v3. u = (3, 4, 2, 4) ; v1 = (3, 2, 3, 0), v2 = (-8, 3, 6, 3), v3 = (6, 3, -8, 3) Let (x, y, z, w) denote the orthogonal projection of u onto the given subspace. Then, the components of the target orthogonal projection are

1. Find the area of the parallelogram that has the given vectors as adjacent sides. Use...

1. Find the area of the parallelogram that has the given vectors as adjacent sides. Use a computer algebra system or a graphing utility to verify your result. u = 3, 2, −1 v = 1, 2, 3 3. Find the area of the triangle with the given vertices. Hint: 1 2 ||u ✕ v|| is the area of the triangle having u and v as adjacent sides. A(4, −5, 6), B(0, 1, 2), C(−1, 2, 0)

Let u = ⟨1,3⟩ and v = ⟨4,1⟩. (a) Find an exact expression and a numerical...

Let u = ⟨1,3⟩ and v = ⟨4,1⟩. (a) Find an exact expression and a numerical approximation for the angle between u and v. (b) Find both the projection of u onto v and the vector component of u orthogonal to v. (c) Sketch u, v, and the two vectors you found in part (b).

True or False If A is the matrix of a projection onto a line L in...

True or False If A is the matrix of a projection onto a line L in R 2 and the vector x in R 2 is not the zero vector, then the vector x − Ax is perpendicular to the vector x. If vectors u, v, x and y are vectors in R 7 such that u = 2v + 0x − 3y, then a basis for span(u, v, x, y) is {u, v, y}.

Consider the following. u = −6, −4, −7 ,    v = 3, 5, 2 (a) Find the...

Consider the following. u = −6, −4, −7 ,    v = 3, 5, 2 (a) Find the projection of u onto v. (b) Find the vector component of u orthogonal to v.

For parts ( a ) − ( c ) , let u = 〈 2 ,...

For parts ( a ) − ( c ) , let u = 〈 2 , 4 , − 1 〉 and v = 〈 4 , − 2 , 1 〉 . ( a ) Find a unit vector which is orthogonal to both u and v . ( b ) Find the vector projection of u onto v . ( c ) Find the scalar projection of u onto v . For parts ( a ) − (...