Find all the vectors in R^4 that are perpendicular to (4,4,3,-17) and (8,8,5,-31)

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?

Vectors u1= [1,1,1] and u2=[8,-7,-1] are perpendicular. Find the orthogonal projection of u3=[65,-19,-31] onto the plane...

Vectors u1= [1,1,1] and u2=[8,-7,-1] are perpendicular. Find the orthogonal projection of u3=[65,-19,-31] onto the plane spanned by u1 and u2.

Find two vectors of length 15 that are perpendicular to <5,6> in an xy-plane.

Find two vectors of length 15 that are perpendicular to <5,6> in an xy-plane.

Homework #2 a) Find a vector perpendicular to the vectors 2i + 3j-k and 3i +...

Homework #2 a) Find a vector perpendicular to the vectors 2i + 3j-k and 3i + k b)Find the area of the triangle whose vertices are (2, -1,1), (3,2,1) and (0, -1,3) c)Find the volume of the parallelepiped with adjacent axes PQ, PR, and PS with P (1, -2.2), Q (1, -1.3), R (1,1,0), S (1,2,3 )

2. Find a basis for R 4 that contains the vectors X = (1, 0, 0,...

2. Find a basis for R 4 that contains the vectors X = (1, 0, 0, 1) and Y = (1, 1, 0, 1). Note: I'm not looking for the orthogonal basis, im looking for a basis that contains those 2 vectors.

find a value of x other than 0 such that the vectors <-3x, 2x> and <4,...

find a value of x other than 0 such that the vectors <-3x, 2x> and <4, x> are perpendicular.

1.1. Let R be the counterclockwise rotation by 90 degrees. Vectors r1=[3,3] and r2=[−2,3] are not...

1.1. Let R be the counterclockwise rotation by 90 degrees. Vectors r1=[3,3] and r2=[−2,3] are not perpendicular. The inverse U of the matrix M=[r1,r2] has columns perpendicular to r2 and r1, so it must be of the form U=[x⋅R(r2),y⋅R(r1)]^T for some scalars x and y. Find y^−1. 1.2. Vectors r1=[1,1] and r2=[−5,5] are perpendicular. The inverse U of the matrix M=[r1,r2] has columns perpendicular to r2 and r1, so it must be of the form U=[x⋅r1,y⋅r2]^T for some scalars x...

(1 point) Find a non-zero vector x⃗ perpendicular to the vectors v⃗ =[1,5,−2] and u⃗ =[1,4,3]....

(1 point) Find a non-zero vector x⃗ perpendicular to the vectors v⃗ =[1,5,−2] and u⃗ =[1,4,3]. x⃗ = [ , , ]

A) Find the angle between the vectors 8i-j + 4k and 4j + 2k B) Find...

A) Find the angle between the vectors 8i-j + 4k and 4j + 2k B) Find c so that the vectors 2i-3j + ck and 2i-j + 4k are perpendicular C) Find the scalar projection and the vector projection of 2i + 4j-4 on 3i-3j + k

The cross product of 2 vectors, A and B, gives a vector C that is perpendicular...

The cross product of 2 vectors, A and B, gives a vector C that is perpendicular to the plane AB. But we can't always contain two vectors in a plane (so we can't always find a plane AB) right? Would the cross product be valid in this case? What would be the result of the cross product? Thanks in advance