Find the angle theta between vectors u=(5,6) and v=(-8,7). Find a unit vector orthogonal to v.

1. Compute the angle between the vectors u = [2, -1, 1] and and v =...

1. Compute the angle between the vectors u = [2, -1, 1] and and v = [1, -2 , -1] 2. Given that : 1. u=[1, -3] and v=[6, 2], are u and v orthogonal? 3. if u=[1, -3] and v=[k2, k] are orthogonal vectors. What is the value(s) of k? 4. Find the distance between u=[root 3, 2, -2] and v=[0, 3, -3] 5. Normalize the vector u=[root 2, -1, -3]. 6. Given that: v1 = [1, - C/7]...

1) If u and v are orthogonal unit vectors, under what condition au+bv is orthogonal to...

1) If u and v are orthogonal unit vectors, under what condition au+bv is orthogonal to cu+dv (where a, b, c, d are scalars)? What are the lengths of those vectors (express them using a, b, c, d)? 2) Given two vectors u and v that are not orthogonal, prove that w=‖u‖2v−uuT v is orthogonal to u, where ‖x‖ is the L^2 norm of x.

In 3 dimensions, draw vectors u, v, w, and x such that u+v+w=x. The vectors u...

In 3 dimensions, draw vectors u, v, w, and x such that u+v+w=x. The vectors u and x share an initium. You may pick the size of your vectors. Make sure the math works. Find the angle between vector x and vector u.

Find the following for the vectors u= -10+9j+√3k and v= 10i-9j-√3k. a) v*u, |v|, and |u|....

Find the following for the vectors u= -10+9j+√3k and v= 10i-9j-√3k. a) v*u, |v|, and |u|. b) the cosine of the angle between v and u. c) the scalar component of u in the direction of v d) the vector projvu

PLEASE SHOW WORK FOR ALL :) 1) Given the vectors a = <17,-5,6>, b = <1,0,4>,...

PLEASE SHOW WORK FOR ALL :) 1) Given the vectors a = <17,-5,6>, b = <1,0,4>, and c = <2,1,5> find the following: a) 3a+2b b) |5b-c| c) a unit vector in the direction of 2b 2) given the vectors r = <3,3,-4>, w = <9,0,6> and q = <-4,1,10> find the following: a) the angle, in rads, between r and w b) the vector projection of w onto q c) are r and q orthogonal?

u = <-3,3,5> and v = <2,5,1> find: v*u = || u*v || find the angle...

u = <-3,3,5> and v = <2,5,1> find: v*u = || u*v || find the angle of v and u find the unit vector of v

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).

(uxv) is orthogonal to (u+v) and (u-v) u and v are nonzero vectors not sure where...

(uxv) is orthogonal to (u+v) and (u-v) u and v are nonzero vectors not sure where to go from this I do the cross product of uxv...what do i do for u+v and u-v?? is it a dot product?

I know of two ways to compute the angle between two vectors 1.) cos theta =...

I know of two ways to compute the angle between two vectors 1.) cos theta = (u· v)/(||u||· ||v||) 2.) sin theta = ||u x v||/(||u||· ||v||) The problem I need help with requires that I show that the two methods produce the same theta value. The vectors I have to work with are u = <-2,2,-2> and v = <4,6,3>. Theoretically, the two theta values should be the same. However, when I did it both ways, the first method...

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