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

Find a unit vector orthogonal to the vectors ? = 〈1,5, −2〉 and ?⃗ = 〈−1,3,0〉.

Find a unit vector orthogonal to the vectors ? = 〈1,5, −2〉 and ?⃗ = 〈−1,3,0〉.

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 )

Find the vector in ℝ3 from point A=(x,y,z) to B=(−7,−2,−8).. AB→= The vector v⃗  in 2-space of...

Find the vector in ℝ3 from point A=(x,y,z) to B=(−7,−2,−8).. AB→= The vector v⃗  in 2-space of length 7 pointing up at an angle of π/6 measured from the positive x-axis. v⃗= (b) The vector w⃗ in 3-space of length 5 lying in the yz-plane pointing upward at an angle of π/4 measured from the positive y-axis. v⃗ = For what value(s) of tt does the equality 〈t3−6t,0.333333t2+4〉=〈0,6〉〈t3−6t,0.333333t2+4〉=〈0,6〉hold true?

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

Decompose the vector w into a sum of its vectors in its parallel and perpendicular components....

Decompose the vector w into a sum of its vectors in its parallel and perpendicular components. The vector w is described as 3 in the x direction and -4 in the y direction. The parallel component of the x vector should be in the direction of the vector u and the perpendicular component of vector w is perpendicular to vector u. The vector u is described as 1 in the x direction and 2 in the y direction.

Find numbers x and y so that w⃗ −x⋅u⃗ −y⋅v⃗ w→−x⋅u→−y⋅v→ is perpendicular to both u⃗...

Find numbers x and y so that w⃗ −x⋅u⃗ −y⋅v⃗ w→−x⋅u→−y⋅v→ is perpendicular to both u⃗ and v⃗, where w⃗ =[9,132,42], u⃗ =[6,1,1], and v⃗ =[3,3,−21](notice that u⃗ is perpendicular to v⃗)

Question 1: Let vectors: A⃗ =(2,1,−4), B⃗ =(−3,0,1), and C⃗ =(−1,−1,2). Calculate the following: (A) What...

Question 1: Let vectors: A⃗ =(2,1,−4), B⃗ =(−3,0,1), and C⃗ =(−1,−1,2). Calculate the following: (A) What is the value of  A⃗ ⋅ B⃗ ? (B) What is the angle θAB between A⃗ and B⃗ ? (C) What is the value of 2B⃗ ⋅ 3C⃗ ? (D) What is the value of 2(B⃗ ⋅ 3C⃗) ? Which of the following can be computed? (Choose only 1 of the following) A⃗ ⋅B⃗ ⋅C⃗   A⃗ ⋅(B⃗ ⋅C⃗ ) A⃗ ⋅(B⃗ +C⃗ ) 3⋅A⃗ FOR...

Displacement vectors A, B, and C add up to a total of zero. Vector A has...

Displacement vectors A, B, and C add up to a total of zero. Vector A has a magnitude of 1550 m and a direction of 22.4° north of east. Vector B has a direction of 41.0° east of south, and vector C has a direction of 34.4° north of west. Find the magnitudes of vector B and vector C.

Find numbers xx and yy so that w⃗ −x⋅u⃗ −y⋅v⃗ w→−x⋅u→−y⋅v→ is perpendicular to both u⃗...

Find numbers xx and yy so that w⃗ −x⋅u⃗ −y⋅v⃗ w→−x⋅u→−y⋅v→ is perpendicular to both u⃗ u→ and v⃗ v→, where w⃗ =[−32,130,80]w→=[−32,130,80], u⃗ =[5,2,1]u→=[5,2,1], and v⃗ =[4,2,−24]v→=[4,2,−24] (notice that u⃗ u→ is perpendicular to v⃗ v→).

(a) Find the volume of the parallelepiped determined by the vectors a =< 2, −1, 3...

(a) Find the volume of the parallelepiped determined by the vectors a =< 2, −1, 3 >, b =< −3, 0, 1 >, c =< 2, 4, 1 >. (b) Find an equation of the plane that passes through the point (2, 4, −3) and is perpendicular to the planes 3x + 2y − z = 1 and x − 2y + 3z = 4.